Polar Curves and Their Intersections

Set the curves equal to each other

Convert polar coordinates to Cartesian coordinates

Graph the curves on a Cartesian plane

Find the derivative of each curve

Ignore the R^2 term

Convert both equations to R^2

Use a different method to find intersections

Convert both equations to R

To find multiple solutions for theta

To convert the equation to Cartesian form

To simplify the equation

To eliminate complex numbers

Convert theta to Cartesian coordinates

Use the original polar equations

Use a calculator to find R

Graph the theta values

Negative values are easier to calculate

Negative values are not allowed in polar coordinates

Negative values can represent the same point as positive values

Negative values simplify the graphing process

It is easier to visualize the curves

It simplifies the equations

It eliminates the need for polar coordinates

It provides more accurate results

By finding where the curves overlap

By calculating the derivative

By converting to Cartesian coordinates

By using a graphing calculator