Catégories : Tous - area - method - triangle

par David Kedrowski Il y a 14 années

283

MAT.126 4.1 & 4.2

Sigma notation provides a concise way to express the sum of a series of terms, where the sum of n terms is represented with specific upper and lower bounds and an index of summation.

MAT.126 4.1 & 4.2

MAT.126 4.1 & 4.2

4.2 Area

Find the area of a plane region using limits
Regions bounded by the y-axis
Definition of the Area of a Region in the Plane

Let f be continuous and nonnegative on the interval [a,b]. The area of the region bounded by the graph of f, the x-axis, and the vertical lines x=a and x=b is

Area = lim_{n --> infinity} E_{i=1}^n f(c_i) * delta x

where x_{i-1} <= c_i <= x_i and delta x = (b - a) / n.

Theorem 4.3 Limits of the Lower and Upper Sums

Let f be continuous and nonnegative on the interval [a,b]. The limits as n approaches infinity of both the lower and upper sums exist and are equal to each other.

Approximate the area of a plane region
More formally

Subdivide the interval [a,b] into n subintervals each of width delta x = (b - a) / n.

The endpoints of the intervals can be defined as x_i = a + i * delta x, where i is the sequence of integers from 0 to n.

We take f to be continuous on [a,b]. Therefore the Extreme Value Theorem applies on the interval [a,b] as well as any subinterval of [a,b].

From the Extreme Value Theorem we know each subinterval has a minimum, f(m_i), and a maximum, f(M_i).

Define an inscribed rectangle inside each subregion of height f(m_i). The sum of these rectangles is called a lower sum, which we write as s(n)=E_{i=1}^n f(m_i) * delta x.

Define a circumscribed rectangle extending outside each subregion of height f(M_i). The sum of these rectangles is called an upper sum, which we write as S(n)=E_{i=1}^n f(M_i) * delta x.

Since we know the area of the region is bounded by the lower sum and the upper sum, we can write

s(n) <= area of region <= S(n)

Rectangles

Subdivide the interval [a,b] into n subintervals of equal size.

Define an inscribed rectangle inside each subregion. The sum of these rectangles is called a lower sum.

Define a circumscribed rectangle extending outside each subregion. The sum of these rectangles is called an upper sum.

The area of the region lies somewhere between the lower sum and the upper sum. That is, the area has been bounded.

A limiting process can be used to "squeeze" the value of the area exactly.

The Area Problem

The second of the two classic problems from the origins of calculus.

Understand the concept of area
Method of Exhaustion

Limiting process by which the area is "squeezed" between an upper bound and a lower bound.

Area of Polygons

Break them up into triangles.

Area of a Triangle

Can be found by creating a rectangle whose area is twice that of the triangle.

Area of a Rectangle

Defined to be A = bh.

Use sigma notation to write and evaluate a sum
Theorem 4.2 Summation Formulas

See page 260 in the text.

Sigma notation is a concise mathematical notation for sums.

The sum of n terms a_1, a_2, a_3, . . ., a_n is written as

E_{i=1}^n a_i = a_1 + a_2 + a_3 +...+ a_n

where i is the index of summation, a_i is the ith term of the sum, and the upper and lower bounds of summation are n and 1.

4.1 Antiderivatives and Indefinite Integration

Find a particular solution of a differential equation.

A particular solution for a differential equation is one in which the constant of integration can be specifically determined.

To find a particular solution, one must have both the general solution and the value of F(x) for one given value of x, sometimes called an initial condition (assuming you're dealing with a first order differential equation).

Use basic integration rules to find antiderivatives.
Rewrite before integrating
Rules

See the list on page 250 in the text.

Use indefinite integral notation for antiderivatives.
Definitions

The operation of finding all solutions to an equation in differential form is called antidifferentiation.

Given the differential equation

dy/dx = f(x),

multiplying both sides by dx gives the differential form of the equation,

dy = f(x) dx.

A synonym for antidifferentiation is indefinite integration.

The notation y = S f(x) dx = F(x) + C, reads "y equals the antiderivative of f with respect to x, which is equal to the antiderivative of f(x) plus a constant of integration, C."

Write the general solution of a differential equation
More definitions

The constant C is called the constant of integration.

The family of functions represented by G is the general antiderivative of f.

G(x) = x^2 + C is the general solution of the differential equation G'(x) = 2x, where a differential equation in x and y is an equation that involves x, y, and derivatives of y.

Families of Antiderivatives

Given f(x) = 2x, the family of all antiderivatives of f is given by G(x) = x^2 + C.

Theorem 4.1 Representation of Antiderivatives

If F is an antiderivative of f on an interval I, then G is an antiderivative of f on the interval I if and only if G is of the form G(x) = F(x) + C, for all x in I where C is a constant.

Definition

A function F is an antiderivative of f on an interval I if F'(x) = f(x) for all x in I.

Note the use of the word "an" instead of "the".