Polar Area and Integration Techniques

r = 1 + sin(θ)

r = 2 + cos(θ)

r = 1 + cos(2θ)

r = 1 + sin(2θ)

To determine the limits of integration

To find the maximum radius

To identify the center of the curve

To calculate the circumference

π/2 radians

3π/2 radians

2π radians

π radians

Integrate over the entire curve

Approximate using rectangles

Calculate the area of one section and multiply by 4

Use the midpoint rule

A compass

A graphing calculator

A ruler

A protractor

∫ from 0 to π/4 of (r^2) dθ

∫ from 0 to 2π of (r^2) dθ

∫ from 0 to π/2 of (r^2) dθ

∫ from 0 to π of (r^2) dθ

Partial fraction decomposition

Power-reducing formula

Integration by parts

Trigonometric substitution

4π square units

2π square units

3π/2 square units

π square units

V-substitution

U-substitution

W-substitution

T-substitution

Simplifying the expression

Evaluating at the upper and lower limits

Graphing the result

Finding the derivative