2183 lines
80 KiB
Markdown
2183 lines
80 KiB
Markdown
---
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title: Integers
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TARGET DECK: Obsidian::STEM
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FILE TAGS: binary::integer
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tags:
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- binary
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- integer
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---
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## Overview
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Integers are typically encoded using either **unsigned encoding** or **two's-complement**. The following table highlights how the min and max of these encodings behave:
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Value | $w = 8$ | $w = 16$ | $w = 32$
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-------- | ------- | -------- | ------------
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$UMin_w$ | `0x00` | `0x0000` | `0x00000000`
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$UMax_w$ | `0xFF` | `0xFFFF` | `0xFFFFFFFF`
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$TMin_w$ | `0x80` | `0x8000` | `0x80000000`
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$TMax_w$ | `0x7F` | `0x7FFF` | `0x7FFFFFFF`
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%%ANKI
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Basic
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What is a C integral type?
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Back: A type representing finite ranges of integers.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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Tags: c17
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<!--ID: 1708177246087-->
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END%%
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%%ANKI
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Basic
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In what two ways are C integral types usually encoded?
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Back: Unsigned encoding or two's-complement.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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Tags: c17
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<!--ID: 1708177246093-->
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END%%
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%%ANKI
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Basic
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An integral value of $0_{10}$ likely has what encoding?
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Back: Either unsigned or two's-complement.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708177246105-->
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END%%
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%%ANKI
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Basic
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An integral value of $100_{10}$ likely has what encoding?
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Back: Either unsigned or two's-complement.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708177246109-->
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END%%
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%%ANKI
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Basic
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An integral value of $-100_{10}$ likely has what encoding?
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Back: Two's-complement.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708177246114-->
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END%%
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%%ANKI
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Basic
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Which of unsigned encoding or two's-complement exhibit asymmetry in their range?
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Back: Two's-complement.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708453398379-->
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END%%
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%%ANKI
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Basic
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What integral values share the same binary representation in unsigned encoding and two's-complement?
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Back: Nonnegative values $\leq TMax$.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708454709515-->
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END%%
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%%ANKI
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Basic
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According to the C standard, how are `unsigned` integral types encoded?
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Back: Using unsigned encoding.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708455064691-->
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END%%
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%%ANKI
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Basic
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According to the C standard, how are `signed` integral types encoded?
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Back: The C standard leaves this unspecified.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708455064696-->
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END%%
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%%ANKI
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Basic
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According to the C standard, Is `unsigned` overflow well-defined?
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Back: Yes.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708551236389-->
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END%%
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%%ANKI
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Basic
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According to the C standard, Is `signed` overflow well-defined?
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Back: No.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708551236392-->
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END%%
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%%ANKI
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Basic
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Why is `signed` underflow/overflow considered UB?
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Back: Because there is no requirement on how `signed` integers are encoded.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708551236395-->
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END%%
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%%ANKI
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Basic
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How does $UMax$ relate to $TMax$?
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Back: $UMax = 2 \cdot TMax + 1$
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708453398445-->
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END%%
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%%ANKI
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Basic
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Provide a combinatorial explanation on why $UMax$ equals $2 \cdot TMax + 1$.
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Back: There is one more negative number than positive numbers represented in two's-complement.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708613447880-->
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END%%
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%%ANKI
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Basic
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What are the binary encodings of $UMax_4$ and $TMax_4$?
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Back: $1111_2$ and $0111_2$
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708453398449-->
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END%%
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%%ANKI
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Basic
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Reinterpret $TMax$ in unsigned encoding. What arithmetic operations yield $UMax$?
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Back: Multiply by two and add one.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708453398454-->
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END%%
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%%ANKI
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Basic
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Reinterpret $TMax$ in unsigned encoding. What bitwise operations yield $UMax$?
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Back: One-bit left shift and add one.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708453398459-->
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END%%
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%%ANKI
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Basic
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Reinterpret $UMax$ in two's-complement. What decimal value do you have?
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Back: $-1$
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708453398469-->
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END%%
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### Unsigned Encoding
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Always represents nonnegative numbers. Given an integral type $\vec{x}$ of $w$ bits, we convert binary to its unsigned encoding with: $$B2U_w(\vec{x}) = 2^{w-1}x_{w-1} + \sum_{i=0}^{w-2} 2^ix_i$$
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Note we unfold the summation on the RHS by one term to make it's relationship to $T2U_w$ clearer.
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%%ANKI
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Basic
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What does $UMin_w$ evaluate to?
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Back: $0$
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708545383256-->
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END%%
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%%ANKI
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Basic
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What does $UMax_w$ evaluate to?
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Back: $2^w - 1$
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708545383258-->
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END%%
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%%ANKI
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Basic
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What half-open interval represents the possible $w$-bit unsigned decimal values?
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Back: $[0, 2^w)$
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708177246128-->
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END%%
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%%ANKI
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Basic
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What is the binary representation of the smallest $4$-bit unsigned number?
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Back: $0000_2$
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708177246133-->
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END%%
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%%ANKI
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Basic
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What is the binary representation of the largest $4$-bit unsigned number?
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Back: $1111_2$
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708177246138-->
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END%%
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%%ANKI
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Basic
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What is the decimal expansion of unsigned integer $1010_2$?
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Back: $2^3 + 2^1 = 10$
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708177246143-->
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END%%
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%%ANKI
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Basic
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What does the "uniqueness" of unsigned encoding refer to?
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Back: The function used to convert integral types to their unsigned encoding is a bijection.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708177246148-->
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END%%
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%%ANKI
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Basic
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How does Bryant et al. define $B2U_w$?
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Back: $B2U_w(\vec{x}) = 2^{w-1}x_{w-1} + \sum_{k=0}^{w-2} 2^kx_k$
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708179147785-->
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END%%
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%%ANKI
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Basic
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What is $B2U_w$ an acronym for?
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Back: **B**inary to **u**nsigned, width $w$.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708179147791-->
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END%%
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%%ANKI
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Basic
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What is $U2B_w$ an acronym for?
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Back: **U**nsigned to **b**inary, width $w$.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708613447885-->
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END%%
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%%ANKI
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Basic
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What does $w$ in $B2U_w$ represent?
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Back: The number of bits in the integral type being interpreted.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708179147795-->
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END%%
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%%ANKI
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Basic
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What is the domain of $B2U_w$?
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Back: Bit strings of size $w$.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708179147798-->
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END%%
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%%ANKI
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Basic
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What is the domain of $U2B_w$?
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Back: $[0, 2^w)$
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708613447888-->
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END%%
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%%ANKI
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Basic
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What is the range of $B2U_w$?
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Back: $[0, 2^w)$
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708179147801-->
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END%%
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%%ANKI
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Basic
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What is the range of $U2B_w$?
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Back: Bit strings of length $w$.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708613447891-->
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END%%
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%%ANKI
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Basic
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How is the smallest unsigned integer formatted in hexadecimal?
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Back: As all `0`s.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708453398392-->
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END%%
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%%ANKI
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Basic
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How is the largest unsigned integer formatted in hexadecimal?
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Back: As all `F`s.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708453398403-->
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END%%
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%%ANKI
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Basic
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How does $n$ relate to $\textasciitilde n$ in unsigned encoding?
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Back: $n + \textasciitilde n = UMax$
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Reference: “Two’s-Complement.” In *Wikipedia*, January 9, 2024. [https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561](https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561).
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<!--ID: 1708545383259-->
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END%%
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%%ANKI
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Basic
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Using unsigned encoding, *why* does $n + \textasciitilde n = UMax$?
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Back: Because the sum always yields a bit string of all `1`s.
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Reference: “Two’s-Complement.” In *Wikipedia*, January 9, 2024. [https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561](https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561).
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<!--ID: 1708545574154-->
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END%%
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%%ANKI
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Basic
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Regardless of word size, what bitwise operations yield $UMax$?
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Back: `~0`
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Reference: “Two’s-Complement.” In *Wikipedia*, January 9, 2024. [https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561](https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561).
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<!--ID: 1708545383261-->
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END%%
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### Two's-Complement
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Represents negative numbers along with nonnegative ones. Given an integral type $\vec{x}$ of $w$ bits, we convert binary to its twos'-complement encoding with: $$B2T_w(\vec{x}) = -2^{w-1}x_{w-1} + \sum_{i=0}^{w-2} 2^ix_i$$
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%%ANKI
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Basic
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What does $TMin_w$ evaluate to?
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Back: $-2^{w-1}$
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708545383252-->
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END%%
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%%ANKI
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Basic
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What does $TMax_w$ evaluate to?
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Back: $2^{w-1} - 1$
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708545383255-->
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END%%
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%%ANKI
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Basic
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How do $TMin$ and $TMax$ relate to one another?
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Back: $TMin = -TMax - 1$
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<!--ID: 1708609869518-->
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END%%
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%%ANKI
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Basic
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What half-open interval represents the possible $w$-bit two's-complement decimal values?
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Back: $[-2^{w-1}, 2^{w-1})$
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708177246128-->
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END%%
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%%ANKI
|
||
Cloze
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$[${1:$0$}, {2:$2^w$}$)$ is to unsigned as $[${1:$-2^{w-1}$}, {2:$2^{w-1}$}$)$ is to two's-complement.
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708179147813-->
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END%%
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%%ANKI
|
||
Basic
|
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What is the binary representation of the smallest $4$-bit two's-complement number?
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Back: $1000_2$
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708179649872-->
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END%%
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||
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||
%%ANKI
|
||
Basic
|
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What is the binary representation of the largest $4$-bit two's-complement number?
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Back: $0111_2$
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
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<!--ID: 1708179649876-->
|
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END%%
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%%ANKI
|
||
Cloze
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The {sign bit} refers to the {most significant bit} in two's-complement.
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||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708179649881-->
|
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END%%
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||
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%%ANKI
|
||
Basic
|
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What is the weight of the sign bit in $w$-bit two's-complement?
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Back: $-2^{w-1}$
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708179649887-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What does the "uniqueness" of two's-complement refer to?
|
||
Back: The function used to convert integral types to two's-complement is a bijection.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708179649894-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How does Bryant et al. define $B2T_w$?
|
||
Back: $B2T_w(\vec{x}) = -2^{w-1}x_{w-1} + \sum_{k=0}^{w-2} 2^kx_k$
|
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708179649901-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is $B2T_w$ an acronym for?
|
||
Back: **B**inary to **t**wo's-complement, width $w$.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708179649907-->
|
||
END%%
|
||
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||
%%ANKI
|
||
Basic
|
||
What is $T2B_w$ an acronym for?
|
||
Back: **T**wo's-complement to **b**inary, width $w$.
|
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Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708613447895-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What does $w$ in $B2T_w$ represent?
|
||
Back: The number of bits in the integral type being interpreted.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708179649913-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is the domain of $B2T_w$?
|
||
Back: Bit strings of size $w$.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708179649921-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is the domain of $T2B_w$?
|
||
Back: $[-2^{w-1}, 2^{w-1})$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708613447899-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is the range of $B2T_w$?
|
||
Back: $[-2^{w-1}, 2^{w-1})$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708179649928-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is the range of $T2B_w$?
|
||
Back: Bit strings of length $w$.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708613447903-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How is the smallest two's-complement integer formatted in hexadecimal?
|
||
Back: With a leading `8` followed by `0`s.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708453398413-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How is the largest two's-complement integer formatted in hexadecimal?
|
||
Back: With a leading `7` followed by `F`s.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708453398425-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How is equality $|TMin| = |TMax|$ modified so that both sides actually balance?
|
||
Back: $|TMin| = |TMax| + 1$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708453398430-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Which of negative and positive numbers can two's-complement encoding express more of?
|
||
Back: Negative.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708453398435-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Why is two's-complement's encoding range asymmetric?
|
||
Back: Leading `1`s correspond to negatives but leading `0`s corerspond to nonnegative numbers (which include $0$).
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708453398440-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What are the median values of two's-complement's encoding range?
|
||
Back: `-1` and `0`
|
||
Reference: “Two’s-Complement.” In *Wikipedia*, January 9, 2024. [https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561](https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561).
|
||
<!--ID: 1708545383262-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Cloze
|
||
In two's-complement, the {sign bit} partitions the encoding range into two sets.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708545383265-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Why is it "two's-complement" instead of "twos'-complement"?
|
||
Back: Because there is only one $2$ in $2^w - x$.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709060837130-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Given two's-complement $x \geq 0$, what is the significance of $2^w - x$?
|
||
Back: The result is the binary representation of $-x$.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709060849456-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Let $x$ be a $w$-bit two's-complement number. What is it's complement?
|
||
Back: $2^w - x$
|
||
Reference: “Two’s-Complement.” In *Wikipedia*, January 9, 2024. [https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561](https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561).
|
||
<!--ID: 1709060837141-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is the precise definition of the two's-complement of a $w$-bit number $x$?
|
||
Back: The complement of $x$ with respect to $2^w$.
|
||
Reference: “Two’s-Complement.” In *Wikipedia*, January 9, 2024. [https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561](https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561).
|
||
<!--ID: 1709060837145-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
With respect to two's-complement encoding, what is the "weird number"?
|
||
Back: $TMin$
|
||
Reference: “Two’s-Complement.” In *Wikipedia*, January 9, 2024. [https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561](https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561).
|
||
<!--ID: 1709060837149-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Why is $TMin$ called the "weird number"?
|
||
Back: It is the only number that is it's own complement.
|
||
Reference: “Two’s-Complement.” In *Wikipedia*, January 9, 2024. [https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561](https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561).
|
||
<!--ID: 1709060837151-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How is $2^w - x$ written schematically, fixed to $w = 8$ bits?
|
||
Back:
|
||
```
|
||
00000000
|
||
- x
|
||
----------
|
||
...
|
||
```
|
||
Reference: Finley, Thomas. “Two’s Complement,” April 2000. [https://www.cs.cornell.edu/~tomf/notes/cps104/twoscomp.html](https://www.cs.cornell.edu/~tomf/notes/cps104/twoscomp.html).
|
||
<!--ID: 1709060837154-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How is the following rewritten to emphasize why "two's-complement" is named the way it is?
|
||
```
|
||
00000000
|
||
- 01010101
|
||
----------
|
||
...
|
||
```
|
||
Back:
|
||
```
|
||
100000000
|
||
- 01010101
|
||
-----------
|
||
...
|
||
```
|
||
Reference: Finley, Thomas. “Two’s Complement,” April 2000. [https://www.cs.cornell.edu/~tomf/notes/cps104/twoscomp.html](https://www.cs.cornell.edu/~tomf/notes/cps104/twoscomp.html).
|
||
<!--ID: 1709060837156-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How is the following rewritten to emphasize two's-complement's idea of "invert and add one"?
|
||
```
|
||
100000000
|
||
- 01010101
|
||
-----------
|
||
...
|
||
```
|
||
Back:
|
||
```
|
||
1
|
||
+ 11111111
|
||
- 01010101
|
||
----------
|
||
...
|
||
```
|
||
Reference: Finley, Thomas. “Two’s Complement,” April 2000. [https://www.cs.cornell.edu/~tomf/notes/cps104/twoscomp.html](https://www.cs.cornell.edu/~tomf/notes/cps104/twoscomp.html).
|
||
<!--ID: 1709060837160-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Subtracting `x` from all `1` bits is equivalent to what bitwise operation?.
|
||
Back: `~x`
|
||
Reference: Finley, Thomas. “Two’s Complement,” April 2000. [https://www.cs.cornell.edu/~tomf/notes/cps104/twoscomp.html](https://www.cs.cornell.edu/~tomf/notes/cps104/twoscomp.html).
|
||
<!--ID: 1709750498315-->
|
||
END%%
|
||
|
||
## Casting
|
||
|
||
Most implementations of C cast an object of `signed` type to `unsigned` type and vice versa, most implementations simply re-interpret the object's binary representation. This casting may happen implicitly if comparing or operating on `signed` and `unsigned` objects in the same expression. $T2U$ and $U2T$ reflect this method of casting:
|
||
|
||
$$T2U_w(x) = \begin{cases}
|
||
x + 2^w & x < 0 \\
|
||
x & x \geq 0
|
||
\end{cases}$$
|
||
|
||
$$U2T_w(x) = \begin{cases}
|
||
x & x \leq TMax_w \\
|
||
x - 2^w & x > TMax_w
|
||
\end{cases}$$
|
||
|
||
%%ANKI
|
||
Basic
|
||
How do most implementations of C perform casting of `signed` and `unsigned` types?
|
||
Back: As a reinterpretation of the same byte pattern of the object being casted.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1708615249879-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is $T2U_w$ an acronym for?
|
||
Back: **T**wo's-complement to **u**nsigned, width $w$.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708615249883-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
For what values $x$ does $T2U_w(x) = U2T_w(x) = x$?
|
||
Back: $0 \leq x \leq TMax_w$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708696117167-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What values $x$ are unaffected when casting from `signed` to `unsigned`?
|
||
Back: $0 \leq x \leq TMax_w$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1708615249891-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What values $x$ are unaffected when casting from `unsigned` to `signed`?
|
||
Back: $0 \leq x \leq TMax_w$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1708615249897-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How are casts implicitly performed in operations containing `signed` and `unsigned` objects?
|
||
Back: `signed` objects are cast to `unsigned` objects.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1708615249903-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Cloze
|
||
For {$x < 0$}, $T2U_w(x) =$ {$x + 2^w$}.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708615249908-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Cloze
|
||
For {$x \geq 0$}, $T2U_w(x) =$ {$x$}.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708615249914-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Cloze
|
||
For all $x$, $T2U_w(x)=$ {$x + x_{w-1}2^w$} where $x_{w-1}$ is the most significant bit of $x$.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709492205954-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How is $T2U_w$ written as a function composition?
|
||
Back: $T2U_w = B2U_w \circ T2B_w$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708615249920-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is $U2T_w$ an acronym for?
|
||
Back: **U**nsigned to **t**wo's-complement, width $w$.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708615249925-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How is $U2T_w$ written as a function composition?
|
||
Back: $U2T_w = B2T_w \circ U2B_w$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708615249930-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Cloze
|
||
For {$x > TMax_w$}, $U2T_w(x) =$ {$x - 2^w$}.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708615249935-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Cloze
|
||
For {$x \leq TMax_w$}, $U2T_w(x) =$ {$x$}.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708615249939-->
|
||
END%%
|
||
|
||
### Expansion
|
||
|
||
For unsigned encoding, use **zero extension** to convert numbers to larger types. For example, $1010_2$ can be expanded to 8-bit $00001010_2$.
|
||
|
||
%%ANKI
|
||
Cloze
|
||
Use {zero} extension to convert {unsigned} numbers to larger types.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708697867799-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Zero extension is generally used for what type of integer encoding?
|
||
Back: Unsigned.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708697867807-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
*Why* does zero extension of unsigned numbers work?
|
||
Back: The weights of additional bits are zeroed out.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708697867810-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
*Why* does zero extension of two's-complement numbers generally not work?
|
||
Back: A negative value would have its new sign bit be positive.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708697867814-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How is $\langle x_3, x_2, x_1, x_0 \rangle$ zero extended to 8 bits?
|
||
Back: As $\langle 0, 0, 0, 0, x_3, x_2, x_1, x_0 \rangle$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708697867818-->
|
||
END%%
|
||
|
||
For two's-complement, use **sign extension** to convert numbers to larger types. This means the additional leftmost bits are set to match the sign bit of the original number. For example, $1010_2$ can be expanded to 8-bit $11111010_2$.
|
||
|
||
%%ANKI
|
||
Cloze
|
||
Use {sign} extension to convert {two's-complement} numbers to larger types.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708697867821-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Sign extension is generally used for what type of integer encoding?
|
||
Back: Two's-complement.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708697867825-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
*Why* does sign extension of two's-complement numbers work?
|
||
Back: The new sign bit weight is equal to the swing in the previous sign bit weight.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708697867829-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
*Why* does sign extension of unsigned numbers generally not work?
|
||
Back: If new bits have value `1`, we're adding powers of $2$ to the interpreted value.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708697867833-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How is $\langle x_3, x_2, x_1, x_0 \rangle$ sign extended to 8 bits?
|
||
Back: As $\langle x_3, x_3, x_3, x_3, x_3, x_2, x_1, x_0 \rangle$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708697867839-->
|
||
END%%
|
||
|
||
### Truncation
|
||
|
||
Let $$\begin{align*}
|
||
x & = \langle x_{w-1}, \ldots, x_1, x_0 \rangle \\
|
||
x' & = \langle x_{k-1}, \ldots, x_1, x_0 \rangle
|
||
\end{align*}$$
|
||
|
||
Then in unsigned encoding, truncating $x$ to $k$ bits is equal to $x \bmod 2^k$. This is because $x_i \bmod 2^k = 0$ for all $i \geq k$ meaning $$B2U_k(x') = B2U_w(x) \bmod 2^k$$
|
||
|
||
%%ANKI
|
||
Basic
|
||
What bit string results from truncating $\langle x_{w-1}, \ldots, x_1, x_0 \rangle$ to $k$ bits?
|
||
Back: $\langle x_{k-1}, \ldots, x_1, x_0 \rangle$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708700130849-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is the decimal value of truncating unsigned $x$ to $k$ bits?
|
||
Back: $x \bmod 2^k$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708700130856-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
*Why* does truncating unsigned $x$ to $k$ bits yield $x \bmod 2^k$?
|
||
Back: $\bmod 2^k$ is a convenient way of "zero-ing" out bits $x_{w-1}, \ldots, x_k$.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708700130859-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How is the following equality balanced for $k \leq w$? $$B2U_w(\langle x_{w-1}, \ldots, x_1, x_0 \rangle) = B2U_k(\langle x_{k-1}, \ldots, x_1, x_0 \rangle)$$
|
||
Back: $$B2U_w(\langle x_{w-1}, \ldots, x_1, x_0 \rangle) \bmod 2^k = B2U_k(\langle x_{k-1}, \ldots, x_1, x_0 \rangle)$$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708700225123-->
|
||
END%%
|
||
|
||
In two's-complement encoding, truncating $x$ to $k$ bits is equal to $U2T_k(T2U_w(x) \bmod 2^k)$. Like with unsigned truncation, $B2U_k(x') = B2U_w(x) \bmod 2^k$. Therefore $$U2T_k(B2U_k(x')) = U2T_k(B2U_w(x) \bmod 2^k)$$
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is the $k$-truncation of $w$-bit two's-complement $x$?
|
||
Back: $U2T_k(x \bmod 2^k)$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708701087974-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Cloze
|
||
Two's-complement $k$-truncation of $w$-bit $x$ is {$U2T_k$}$(${$x \bmod 2^k$}$)$.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708701087985-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is the purpose of $U2T_k$ in two's-complement truncation expression $U2T_k(x \bmod 2^k)$?
|
||
Back: To reinterpret the sign bit correctly.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708702794304-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Why isn't $T2U_w$ in two's-complement truncation $U2T_k(T2U_w(x) \bmod 2^k)$ strictly necessary?
|
||
Back: $x \bmod 2^k$ will always yield an integer in range $[0, 2^k)$.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708702794313-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What additional steps does calculating two's-complement truncation have?
|
||
Back: Casting to and from unsigned encoding.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708701087982-->
|
||
END%%
|
||
|
||
## Arithmetic
|
||
|
||
### Addition
|
||
|
||
Addition of two unsigned or two two's-complement numbers operate in much the same way as grade-school arithmetic. Digits are added one-by-one and overflows "carried" to the next summation. Overflows are truncated; the final carry bit is discarded in the underlying bit adder.
|
||
|
||
%%ANKI
|
||
Basic
|
||
*Why* is addition overflow of $w$-bit integral types equivalent to $w$-bit truncation?
|
||
Back: The underlying bit adder discards any final carry bit.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708799678721-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Why should you generally prefer `x < y` over `x - y < 0`?
|
||
Back: The former avoids possible overflows.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708799678725-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How is `x - y < 0` rewritten more safely?
|
||
Back: `x < y`
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708799678728-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What hardware-level advantage does two's-complement introduce over other signed encodings?
|
||
Back: The same circuits can be used for unsigned and two's-complement arithmetic.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708799678732-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What representational-level advantage does two's-complement introduce over other signed encodings?
|
||
Back: `0` is encoded in only one way.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708799678736-->
|
||
END%%
|
||
|
||
Unsigned addition of $w$-bit integral types, denoted $+_w^u$, behaves like so:
|
||
|
||
$$x +_w^u y = \begin{cases}
|
||
x + y - 2^w & \text{if } x + y \geq 2^w \\
|
||
x + y & \text{otherwise}
|
||
\end{cases}$$
|
||
|
||
This is more simply expressed as $x +_w^u y = (x + y) \bmod 2^w$.
|
||
|
||
%%ANKI
|
||
Basic
|
||
What kind of overflow does unsigned addition potentially exhibit?
|
||
Back: Positive overflow.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708799678739-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Why is unsigned addition overflow *not* UB?
|
||
Back: Because the C standard enforces unsigned encoding of `unsigned` data types.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1708799678742-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What does $+_w^u$ denote?
|
||
Back: Unsigned addition of $w$-bit integral types.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708799678745-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Unsigned addition overflow is equivalent to what bit-level manipulation tactic?
|
||
Back: Truncation.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708799678748-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is the result of $x +_w^u y$?
|
||
Back: $(x + y) \bmod 2^w$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708799678751-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
*Why* does $x +_w^u y = (x + y) \bmod 2^w$?
|
||
Back: Because discarding any carry bit is equivalent to truncating the sum to $w$ bits.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708799678755-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Cloze
|
||
Without using modular arithmetic, $x +_w^u y =$ {$x + y$} if {$x + y < 2^w$}.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708799678758-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Cloze
|
||
Without using modular arithmetic, $x +_w^u y =$ {$x + y - 2^w$} if {$x + y \geq 2^w$}.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708799678761-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How do you detect whether unsigned addition $s \coloneqq x +_w^u y$ overflowed?
|
||
Back: Overflow occurs if and only if $s < x$ (or $s < y$).
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708799678765-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How would you complete the body of this function?
|
||
```c
|
||
/* Determine whether arguments can be added without overflow */
|
||
int uadd_ok(unsigned x, unsigned y);
|
||
```
|
||
Back:
|
||
```c
|
||
return (x + y) >= x;
|
||
```
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708799678769-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Does unsigned overflow detection depend on the left or right operand of $s \coloneqq x +_w^u y$?
|
||
Back: Either.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708799678772-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Why can we choose to compare $s$ to either $x$ or $y$ when detecting overflow of $s \coloneqq x +_w^u y$?
|
||
Back: Because unsigned addition is commutative.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708799678776-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Given integer $0 < x < 2^w$, what is $x$'s unsigned additive inverse?
|
||
Back: $2^w - x$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708808252010-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Which unsigned integer is its own additive inverse?
|
||
Back: $0$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708808252017-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What bitwise operations yield the additive inverse of an unsigned number $x$?
|
||
Back: `~x + 1`
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709042784783-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Given unsigned integer `x`, what is the value of `x + ~x`?
|
||
Back: $UMax$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709042784788-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Ignoring overflow, what is the width of the largest possible value of $x +_w^u y$?
|
||
Back: $w + 1$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709492205961-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Ignoring overflow, what is the width of the smallest possible value of $x +_w^u y$?
|
||
Back: $w$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709492205964-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Is $+_w^u$ commutative?
|
||
Back: Yes.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1710680824725-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Is $+_w^u$ associative?
|
||
Back: Yes.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1710680824728-->
|
||
END%%
|
||
|
||
Two's-complement addition, denoted $+_w^t$ operates similarly:
|
||
|
||
$$x +_w^u y = \begin{cases}
|
||
x + y - 2^w & \text{if } x + y \geq 2^{w-1} \\
|
||
x + y + 2^w & \text{if } x + y < -2^{w-1} \\
|
||
x + y & \text{otherwise}
|
||
\end{cases}$$
|
||
|
||
Unlike with unsigned addition, there is no simpler modulus operation that can be applied.
|
||
|
||
%%ANKI
|
||
Basic
|
||
What kind of overflows does two's-complement addition potentially exhibit?
|
||
Back: Positive and negative overflow.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708964376220-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Why is signed addition overflow UB?
|
||
Back: Because the C standard does not mandate any particular signed integer encoding.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1708964376225-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What does $+_w^t$ denote?
|
||
Back: Two's-complement addition of $w$-bit integral types.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708964376228-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
*Why* doesn't two's-complement addition perform modular arithmetic?
|
||
Back: Because negative values are representable.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708964376231-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Cloze
|
||
$x +_w^t y =$ {$x + y - 2^w$} if {$x + y \geq 2^{w-1}$}.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708964376235-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Cloze
|
||
$x +_w^t y =$ {$x + y + 2^w$} if {$x + y < -2^{w-1}$}.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708964376238-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Cloze
|
||
$x +_w^t y =$ {$x + y$} if {$-2^{w-1} \leq x + y < 2^{w-1}$}.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708964376242-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How do we detect $x +_w^t y$ positive overflowed?
|
||
Back: This happens iff $x > 0$, $y > 0$, and $x +_w^t y \leq 0$.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708964376246-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How do we detect $x +_w^t y$ negative overflowed?
|
||
Back: This happens iff $x < 0$, $y < 0$, and $x +_w^t y \geq 0$.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708964376250-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How can we write $x +_w^t y$ in terms of unsigned addition?
|
||
Back: $x +_w^t y = U2T_w(T2U_w(x) +_w^u T2U_w(y))$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708964376254-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How is the following expressed more simply (i.e. using more standard algebra)? $$x +_w^t y = U2T_w(T2U_w(x) +_w^u T2U_w(y))$$
|
||
Back: $x +_w^t y = U2T_w((x + y) \bmod 2^w)$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709492205967-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
*Why* are we able to characterize $+_w^t$ in terms of $+_w^u$?
|
||
Back: Because two's-complement addition has the same bit-level representation as unsigned addition.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How would you complete the body of this function?
|
||
```c
|
||
/* Determine whether arguments can be added without overflow */
|
||
int tadd_ok(int x, int y);
|
||
```
|
||
Back:
|
||
```c
|
||
int pos_over = x > 0 && y > 0 && (x + y) <= 0;
|
||
int neg_over = x < 0 && y < 0 && (x + y) >= 0;
|
||
return !pos_over && !neg_over;
|
||
```
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708964376259-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Given integer $-2^{w-1} < x < 2^{w-1}$, what is $x$'s two's-complement additive inverse?
|
||
Back: $-x$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709040965774-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is the additive inverse of $TMin$?
|
||
Back: $TMin$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709040965804-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is the additive inverse of $TMax$?
|
||
Back: $-TMax$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709040965810-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Which two's-complement integers are their own additive inverse?
|
||
Back: $TMin$ and $0$.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709040965815-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What bitwise operations yield the additive inverse of two's-complement number $x$?
|
||
Back: `~x + 1`
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709042784791-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Given two's-complement integer `x`, what is the value of `x + ~x`?
|
||
Back: $-1$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709042784794-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What "splitting" approach to $x$'s two's-complement negation does Bryant et al. describe?
|
||
Back: Find the rightmost $1$ in $x$'s bit string representation and complement the bits to its left.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709042784797-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Where do we "split" $x$'s binary representation to perform two's-complement negation?
|
||
Back: At the rightmost $1$ in $x$'s binary representation.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709042784800-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Using *just* `~`, what is the two's-complement negation of $\langle x_{w-1}, \ldots, x_{k+1}, 1, 0, \ldots, 0\rangle$?
|
||
Back: $\langle \textasciitilde x_{w-1}, \ldots, \textasciitilde x_{k+1}, 1, 0, \ldots, 0 \rangle$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709042784803-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
*Why* does complementing and adding one yield integer $x$'s additive inverse?
|
||
Back: `x + ~x` yields a bit string of all `1`s. Adding `1` to this overflows.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709042784806-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What decimal value does two's-complement `~x` evaluate to?
|
||
Back: `-x - 1`
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709044103781-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Ignoring overflow, what is the width of the largest possible value of $x +_w^t y$?
|
||
Back: $w + 1$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709492205970-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Ignoring overflow, what is the width of the smallest possible value of $x +_w^t y$?
|
||
Back: $w + 1$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709492205974-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Is $+_w^t$ commutative?
|
||
Back: Yes.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1710680824730-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Is $+_w^t$ associative?
|
||
Back: Yes.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1710680824733-->
|
||
END%%
|
||
|
||
### Shifting
|
||
|
||
Left shift operations (`<<`) drop the `k` most significant bits and fills the right end of the result with `k` zeros. Right shift operations (`>>`) are classified in two ways:
|
||
|
||
* **Logical**
|
||
* Drops the `k` least significant bits and fills the left end of the result with `k` zeros.
|
||
* This mode is always used when calling `>>` on unsigned data.
|
||
* Sometimes denoted as `>>>` to disambiguate from arithmetic right shifts.
|
||
* **Arithmetic**
|
||
* Drops the `k` least significant bits and fills the left end of the result with `k` copies of the most significant bit.
|
||
* This mode is usually used when calling `>>` on signed data.
|
||
|
||
%%ANKI
|
||
Basic
|
||
How is decimal value $2^n$ written in binary?
|
||
Back: As `1` followed by $n$ zeros.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1707432641574-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What kinds of left shift operations are there?
|
||
Back: Just logical.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1707854589773-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How many significant bits are dropped on a left shift by `k`?
|
||
Back: `k`
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708784904518-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How many `0`s exist in the result of a left shift by `k`?
|
||
Back: At least `k`.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1708784904521-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What kinds of right shift operations are there?
|
||
Back: Logical and arithmetic.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1707854589784-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is a logical right shift operation?
|
||
Back: One that fills the left end of the result with zeros.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1707854589786-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is an arithmetic right shift operation?
|
||
Back: One that fills the left end of the result with copies of the most significant bit.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1707854589789-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What kind of right shift operation is *usually* applied to signed numbers?
|
||
Back: Arithmetic.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1707854589801-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What kind of right shift operation is applied to unsigned numbers?
|
||
Back: Logical.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1707854589804-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What portability issue do shift operations introduce?
|
||
Back: There is no standard on whether right shifts of signed numbers are logical or arithmetic.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1707854589808-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Cloze
|
||
{1:Arithmetic} right shifts are to {1:signed} numbers whereas {2:logical} right shifts are to {2:unsigned} numbers.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1707854589813-->
|
||
END%%
|
||
|
||
In C, it is undefined behavior to shift by more than the width $w$ of an integral type or by a negative value.
|
||
|
||
%%ANKI
|
||
Basic
|
||
Assuming two's-complement, what is the result of shifting an `int32_t` value by `32`?
|
||
Back: It is undefined behavior.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1708785613342-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Assuming two's-complement, what is the result of shifting `int32_t x = 1` left by `31`?
|
||
Back: $-2^{31}$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1708785613370-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is the result of shifting an `int32_t` value by `-1`?
|
||
Back: It is undefined behavior.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1708785613376-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is the result of shifting an `uint32_t` value by `32`?
|
||
Back: It is undefined behavior.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1708785613383-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is the result of shifting an `uint32_t` value by `31`?
|
||
Back: $2^{31}$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1708785613389-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is the result of shifting an `uint32_t` value by `-1`?
|
||
Back: It is undefined behavior.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1708785613393-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How is $2^n$ written using bitwise shift operators?
|
||
Back: `1 << n`
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1708784904524-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What decimal value does `1 << n` translate to?
|
||
Back: $2^n$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1708784904526-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How is $x \bmod 2^k$ equivalently written as a bit mask?
|
||
Back: `x & ((1 << k) - 1)`
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1707873410780-->
|
||
END%%
|
||
|
||
### Multiplication
|
||
|
||
Unsigned multiplication, denoted with the $*_w^u$ operator, is defined as follows: $$x *_w^u y = (x \cdot y) \bmod 2^w$$
|
||
%%ANKI
|
||
Basic
|
||
Given decimal integers $m$ and $n$, how many digits exist in $m \cdot n$?
|
||
Back: At most the number of digits in $m$ plus the number of digits in $n$.
|
||
Reference: “Two’s-Complement.” In *Wikipedia*, January 9, 2024. [https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561](https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561).
|
||
<!--ID: 1709563221438-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Given binary integers $m$ and $n$ of width $w$, how many bits exist in $m \cdot n$?
|
||
Back: At most $2w$.
|
||
Reference: “Two’s-Complement.” In *Wikipedia*, January 9, 2024. [https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561](https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561).
|
||
<!--ID: 1709563221442-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What does $*_w^u$ denote?
|
||
Back: Unsigned multiplication of $w$-bit integral types.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709492205977-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How do you multiply $10_2 \cdot 10_2$ to a $4$-bit unsigned result by hand?
|
||
Back:
|
||
```
|
||
10
|
||
x 10
|
||
-----
|
||
00
|
||
+ 10
|
||
-----
|
||
0100
|
||
```
|
||
Reference: “Two’s-Complement.” In *Wikipedia*, January 9, 2024. [https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561](https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561).
|
||
<!--ID: 1709563221444-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is the result of $x *_w^u y$?
|
||
Back: $(x \cdot y) \bmod 2^w$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709492205981-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
*Why* does $x *_w^u y = (x \cdot y) \bmod 2^w$ (at least in C)?
|
||
Back: Because unsigned multiplication is *defined* to be the result truncated to $w$ bits.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1709492205984-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How do $+_w^u$ and $*_w^u$ behave similarly?
|
||
Back: Letting $\square$ denote either $+$ or $*$, both satisfy $x \;\square_w^u\; y = (x \;\square\; y) \bmod 2^w$.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1709492205988-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Ignoring overflow, what is the width of the largest possible value of $x *_w^u y$?
|
||
Back: $2w$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709492205991-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Ignoring overflow, what is the width of the smallest possible value of $x *_w^u y$?
|
||
Back: $w$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709492205995-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Given unsigned `x`, what arithmetic operation is equivalent to `x << k`?
|
||
Back: $x *_w^u 2^k$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709570428810-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What bitwise operation is equivalent to $x *_w^u 2^k$?
|
||
Back: `x << k`
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709570428815-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How is `unsigned x` equivalently modified using bitwise operations?
|
||
```c
|
||
x = x * pow(2, k);
|
||
```
|
||
Back:
|
||
```c
|
||
x = (x << k);
|
||
```
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1709570428818-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How is `unsigned x` equivalently modified using arithmetic operations?
|
||
```c
|
||
x = (x << k);
|
||
```
|
||
Back:
|
||
```c
|
||
x = x * pow(2, k);
|
||
```
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1709831032382-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Is $*_w^u$ commutative?
|
||
Back: Yes.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1710680824735-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Is $*_w^u$ associative?
|
||
Back: Yes.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1710680824737-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Does $*^u_w$ distribute over $+^u_w$?
|
||
Back: Yes.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1710680824740-->
|
||
END%%
|
||
|
||
Similarly, two's-complement multiplication is defined as follows: $$x *_w^t y = U2T_w((x \cdot y) \bmod 2^w)$$
|
||
|
||
%%ANKI
|
||
Basic
|
||
What does $*_w^t$ denote?
|
||
Back: Two's-complement multiplication of $w$-bit integral types.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709492205998-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is the result of $x *_w^t y$?
|
||
Back: $U2T_w((x \cdot y) \bmod 2^w)$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709492206002-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How do you multiply $10_2 \cdot 01_2$ to a $4$-bit two's-complement result by hand?
|
||
Back:
|
||
```
|
||
1110
|
||
x 0001
|
||
-------
|
||
1110
|
||
+ 0000
|
||
-------
|
||
1110
|
||
```
|
||
Reference: “Two’s-Complement.” In *Wikipedia*, January 9, 2024. [https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561](https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561).
|
||
<!--ID: 1709563221447-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What pre-processing step is done when multiplying to a $w$-bit two's-complement result by hand?
|
||
Back: Sign extend the factors to width $2w$.
|
||
Reference: “Two’s-Complement.” In *Wikipedia*, January 9, 2024. [https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561](https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561).
|
||
<!--ID: 1709563221449-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
When performing two's-complement multiplication by hand, why prefer multiplying by a positive value?
|
||
Back: Sign extension of a positive value yields `0`s.
|
||
Reference: “Two’s-Complement.” In *Wikipedia*, January 9, 2024. [https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561](https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561).
|
||
<!--ID: 1709563221452-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How do $+_w^t$ and $*_w^t$ behave similarly?
|
||
Back: Letting $\square$ denote either $+$ or $*$, both satisfy $x \;\square_w^t\; y = U2T_w((x \;\square\; y) \bmod 2^w)$.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1709492206006-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How can we write $x *_w^t y$ in terms of unsigned multiplication?
|
||
Back: $x *_w^t y = U2T_w(T2U_w(x) *_w^u T2U_w(y))$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709492206012-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How is the following expressed more simply (i.e. using more standard algebra)? $$x *_w^t y = U2T_w(T2U_w(x) *_w^u T2U_w(y))$$
|
||
Back: $x *_w^t y = U2T_w((x \cdot y) \bmod 2^w)$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709492206017-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Ignoring overflow, what is the width of the largest possible value of $x *_w^t y$?
|
||
Back: $2w$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709492206024-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Ignoring overflow, what is the width of the smallest possible value of $x *_w^t y$?
|
||
Back: $2w$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709492206031-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Given two's-complement `x`, what arithmetic operation is equivalent to `x << k`?
|
||
Back: $x *_w^t 2^k$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709570428822-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What bitwise operation is equivalent to $x *_w^t 2^k$?
|
||
Back: `x << k`
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709570428825-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
In two's-complement, how is `x` equivalently modified using bitwise operators?
|
||
```c
|
||
x = x * pow(2, k);
|
||
```
|
||
Back:
|
||
```c
|
||
x = (x << k);
|
||
```
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1709570428828-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
In two's-complement, how is `x` equivalently modified using arithmetic operations?
|
||
```c
|
||
x = (x << k);
|
||
```
|
||
Back:
|
||
```c
|
||
x = x * pow(2, k);
|
||
```
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1709831032386-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Is $*_w^t$ commutative?
|
||
Back: Yes.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1710680824742-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Is $*_w^t$ associative?
|
||
Back: Yes.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1710680824744-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Does $*^t_w$ distribute over $+^t_w$?
|
||
Back: Yes.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1710680824746-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How can we rewrite $x \cdot 1101_2$ as an expression of *only* `<<` and `+`?
|
||
Back: `(x << 3) + (x << 2) + (x << 0)`
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1709570428832-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
*Why* is $x \cdot 13$ equal to `(x << 3) + (x << 2) + (x << 0)`?
|
||
Back: Because the binary representation of $13$ is $1101_2$.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1709570428836-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
How can we rewrite $x \cdot 1100_2$ as an expression of *only* `<<` and `-`?
|
||
Back: `(x << 4) - (x << 2)`
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1709570428839-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Convert $x \cdot 11011100_2$ to an expression containing `-`. How many `-` operators are there?
|
||
Back: $2$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709570428844-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Convert $x \cdot K$ to an expression excluding `-`. The number of `+` operators correspond to what?
|
||
Back: One less than the number of `1`s in $K$'s binary representation.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709570428848-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Convert $x \cdot K$ to an expression containing `-`. The number of `-` operators correspond to what?
|
||
Back: The number of runs of `1`s in $K$'s binary representation.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709570428851-->
|
||
END%%
|
||
|
||
### Division
|
||
|
||
Integer division divides the result and discards any fractional result. This has the same effect as rounding toward zero.
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is integer division?
|
||
Back: Division of two numbers that returns the integer part of the result.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709831032392-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Cloze
|
||
Integer division $x / y$ is $\lfloor x / y \rfloor$ when $x \geq 0$ and {1:$y > 0$} or $x \leq 0$ and {1:$y < 0$}.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709831032396-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Cloze
|
||
Integer division $x / y$ is $\lceil x / y \rceil$ when $x \geq 0$ and {1:$y < 0$} or $x \leq 0$ and {1:$y > 0$}.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709831032399-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What distinguishes integer division from floor division?
|
||
Back: The latter does not round towards $0$ with negative results.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709831032402-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What distinguishes integer division from ceiling division?
|
||
Back: The latter does not round towards $0$ with positive results.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709831032406-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Cloze
|
||
Integer division is often called "truncation {toward zero}".
|
||
Reference: dirkgently, “Answer to ‘What Is the Behavior of Integer Division?,’” _Stack Overflow_, August 30, 2010, [https://stackoverflow.com/a/3602857](https://stackoverflow.com/a/3602857).
|
||
<!--ID: 1709831032412-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Cloze
|
||
Unsigned division is to {logical} right shifts. Two's-complement division is to {arithmetic} right shifts.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709831032417-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is the result of logical right-shifting unsigned $x$ by $k$ bits?
|
||
Back: $\lfloor x / 2^k \rfloor$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709831032421-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
In unsigned encoding, *why* is floor a part of expression $x \mathop{\texttt{>>}} k = \lfloor x / 2^k \rfloor$?
|
||
Back: Because the least significant bit, which may have value `1`, is dropped.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1709831032424-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
In unsigned encoding, how is `x` equivalently modified using bitwise operators?
|
||
```c
|
||
x = floor(x / pow(2, k));
|
||
```
|
||
Back:
|
||
```c
|
||
x = (x >> k);
|
||
```
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1709831032428-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
In unsigned encoding, how is `x` equivalently modified using arithmetic operations?
|
||
```c
|
||
x = (x >> k);
|
||
```
|
||
Back:
|
||
```c
|
||
x = floor(x / pow(2, k));
|
||
```
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1709831032432-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What is the result of arithmetic right-shifting two's-complement $x$ by $k$ bits?
|
||
Back: $\lfloor x / 2^k \rfloor$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1709831032435-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
In two's-complement, *why* is floor a part of expression $x \mathop{\texttt{>>}} k = \lfloor x / 2^k \rfloor$?
|
||
Back: Because the least significant bit, which may have value `1`, is dropped.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1709831032440-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
In two's-complement, what is `-1 >> 1`?
|
||
Back: `-1`
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1709831032444-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Why is division by a power of two using arithmetic right-shift `x >> k` considered incorrect?
|
||
Back: This right shift performs floor division, not integer division.
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1709831032449-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
In two's-complement, how is `x` equivalently modified using bitwise operators?
|
||
```c
|
||
x = floor(x / pow(2, k));
|
||
```
|
||
Back:
|
||
```c
|
||
x = (x >> k);
|
||
```
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1709831032455-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
In two's-complement, how is `x` equivalently modified using arithmetic operations?
|
||
```c
|
||
x = (x >> k);
|
||
```
|
||
Back:
|
||
```c
|
||
x = floor(x / pow(2, k));
|
||
```
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1709831032461-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Assuming no overflow, rewrite expression `x >> k` to instead yield $\lceil x / 2^k \rceil$.
|
||
Back: `(x + (1 << k) - 1) >> k`
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1714184300343-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
Assuming no overflow, what is the result of `(x + (1 << k) - 1) >> k`?
|
||
Back: $\lceil x / 2^k \rceil$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1714184300349-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What value of $Bias$ satisfies the following identity? $$\left\lceil \frac{x}{2^k} \right\rceil = \left\lfloor \frac{x}{2^k} + Bias \right\rfloor$$
|
||
Back: $(2^k - 1) / 2^k$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1714184300352-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What value of $Bias$ satisfies the following identity? $$\left\lceil \frac{x}{2^k} \right\rceil = \left\lfloor \frac{x + Bias}{2^k} \right\rfloor$$
|
||
Back: $2^k - 1$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
<!--ID: 1714184300355-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
What floor/ceiling identity does expression `(x + (1 << k) - 1) >> k` exploit?
|
||
Back: $$\left\lceil \frac{x}{y} \right\rceil = \left\lfloor \frac{x + y - 1}{y} \right\rfloor$$
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1714184300359-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
In two's-complement, how do we use `>>` to perform integer division of `x > 0` by $2^k$?
|
||
Back: `x >> k`
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1714184300362-->
|
||
END%%
|
||
|
||
%%ANKI
|
||
Basic
|
||
In two's-complement, how do we use `>>` to perform integer division of `x < 0` by $2^k$?
|
||
Back: `(x + (1 << k) - 1) >> k`
|
||
Reference: Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
Tags: c17
|
||
<!--ID: 1714184300364-->
|
||
END%%
|
||
|
||
## Bibliography
|
||
|
||
* Bryant, Randal E., and David O'Hallaron. *Computer Systems: A Programmer's Perspective*. Third edition, Global edition. Always Learning. Pearson, 2016.
|
||
* Finley, Thomas. “Two’s Complement,” April 2000. [https://www.cs.cornell.edu/~tomf/notes/cps104/twoscomp.html](https://www.cs.cornell.edu/~tomf/notes/cps104/twoscomp.html).
|
||
* Ronald L. Graham, Donald Ervin Knuth, and Oren Patashnik, *Concrete Mathematics: A Foundation for Computer Science*, 2nd ed (Reading, Mass: Addison-Wesley, 1994).
|
||
* “Two’s-Complement.” In *Wikipedia*, January 9, 2024. [https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561](https://en.wikipedia.org/w/index.php?title=Two%27s_complement&oldid=1194543561). |