notebook/notes/geometry/area.md

12 KiB

title TARGET DECK FILE TAGS tags
Area Obsidian::STEM geometry::area
calculus
geometry

Overview

Area is a set function mapping from a class of so-called measurable sets \mathscr{M} into the real numbers.

%%ANKI Basic What is a set function? Back: A function mapping a collection of sets to real numbers. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic What is the first set function Apostol introduces? Back: Area. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic What kind of mathematical entity is area? Back: A function. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic What is the domain of the area function? Back: The class of measurable sets. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic What is the codomain of the area function? Back: The real numbers. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic What is the "function signature" of the area function a? Back: a \colon \mathscr{M} \rightarrow \mathbb{R} where \mathscr{M} is the class of measurable sets. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic What does Apostol mean by a measurable set? Back: A set that can be ascribed an area. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

Axioms

We assume there exists a class \mathscr{M} of measurable sets in the plane and a set function a, whose domain is \mathscr{M}, with the following six properties:

Nonnegative Property

For each S \in \mathscr{M}, a(S) \geq 0.

%%ANKI Basic What does the nonnegative property of area state? Back: For every set S \in \mathscr{M}, a(S) \geq 0. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic State the nonnegative property of area in FOL. Back: \forall S \in \mathscr{M}, a(S) \geq 0 Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic Suppose a is an area function and S \in \mathscr{M}. Why can't a(S) = -1? Back: This violates the nonnegative property of a. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

Additive Property

If S, T \in \mathscr{M}, then S \cup T and S \cap T are in \mathscr{M}. Also $a(S \cup T) = a(S) + a(T) - a(S \cap T).$

Notice this last formulation is a special case of inclusion-exclusion.

%%ANKI Basic Suppose S, T \in \mathscr{M}. What set(s) does the additive property of area state are also in \mathscr{M}? Back: S \cup T and S \cap T. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic Suppose a is an area function and S, T \in \mathscr{M}. Why is S \cup T \in \mathscr{M}? Back: The additive property of a states it is. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic Suppose a is an area function and S, T \in \mathscr{M}. Why is S \cap T \in \mathscr{M}? Back: The additive property of a states it is. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic Suppose a is an area function and S, T \in \mathscr{M}. What does a(S \cup T) evaluate to? Back: a(S) + a(T) - a(S \cap T) Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic The additive property of area uses what combinatorial concept? Back: The principle of inclusion/exclusion. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

Difference Property

If S, T \in \mathscr{M} such that S \subseteq T, then T - S \in \mathscr{M} and $a(T - S) = a(T) - a(S).$

%%ANKI Basic Suppose S, T \in \mathscr{M}. What set(s) does the difference property of area state are also in \mathscr{M}? Back: N/A. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic Suppose S, T \in \mathscr{M} such that S \subseteq T. What set(s) does the difference property of area state are also in \mathscr{M}? Back: T - S Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic Suppose S, T \in \mathscr{M} such that T \subseteq S. What set(s) does the difference property of area state are also in \mathscr{M}? Back: S - T Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic Suppose a is an area function and S, T \in \mathscr{M} s.t. S \subseteq T. Why is T - S \in \mathscr{M}? Back: The difference property of a states it is. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic Suppose a is an area function and S, T \in \mathscr{M} s.t. S \subseteq T. What does a(T - S) evaluate to? Back: a(T) - a(S) Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

Invariance Under Congruence

If S \in \mathscr{M} and T is congruent to S, then T \in \mathscr{M} and a(S) = a(T).

%%ANKI Basic What does the invariance of congruence property of area state? Back: If S \in \mathscr{M} and T is congruent to S, then T \in \mathscr{M} and a(S) = a(T). Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic Suppose S \in \mathscr{M} and T is congruent to S. What set(s) does the invariance of congruence property of area state are also in \mathscr{M}? Back: T Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic Suppose S \in \mathscr{M} and T is congruent to S. What does a(T) evaluate to? Back: a(S) Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

Choice of Scale

Every rectangle R is in \mathscr{M}. If the edges of R have lengths h and k, then a(R) = hk.

%%ANKI Basic What shape is the choice of scale property of area concerned with? Back: Rectangles. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic What sets does the choice of scale property of area state are also in \mathscr{M}? Back: All rectangles. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic Suppose R is a rectangle. What property of area claims R is measurable? Back: Choice of scale. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic Suppose R is a rectangle. What does a(R) evaluate to? Back: If R has edges of length h and k, a(R) = hk. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic What is the area of a line segment? Back: 0 Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic The line segment is considered a special case of what other shape? Back: A rectangle. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic How does a rectangle relate to a line segment? Back: A line segment is a rectangle with one dimension equal to zero. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic What is the area of a point? Back: 0 Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic The point is considered a special case of what other shape? Back: A rectangle. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic How does a rectangle relate to a point? Back: A point is a rectangle with both dimensions equal to zero. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

Exhaustion Property

Let Q be a set. If there exists exactly one c such that a(S) \leq c \leq a(T) for all step regions S and T satisfying S \subseteq Q \subseteq T, then Q \in \mathscr{M} and a(Q) = c.

%%ANKI Cloze Let Q be a set. The {exhaustion} property of area states that if there exists {exactly one} c such that {a(S) \leq c \leq a(T)} for all {step regions} S and T satisfying {S \subseteq Q \subseteq T}, then {Q \in \mathscr{M}} and {a(Q) = c}. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic The exhaustion property of area considers sets bounded by what? Back: Step regions. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic Why does the exhaustion property of area require existence of exactly one satisfying real number? Back: Area is a function, i.e. single-valued. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

%%ANKI Basic Which axiom of area is typically used to prove ordinate sets are measurable? Back: The exhaustion property. Reference: Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).

END%%

Bibliography

  • Tom M. Apostol, Calculus, Vol. 1: One-Variable Calculus, with an Introduction to Linear Algebra, 2nd ed. (New York: Wiley, 1980).