Copyright © 2011 Pearson, Inc.

6.5

Graphs and

Polar

Equations

Copyright © 2011 Pearson, Inc. Slide 6.1 - 2

What you’ll learn about

Polar Curves and Parametric Curves

Symmetry

Analyzing Polar Curves

Rose Curves

Limaçon Curves

Other Polar Curves

… and why

Graphs that have circular or cylindrical symmetry often have simple polar equations, which is very useful in calculus.

Copyright © 2011 Pearson, Inc. Slide 6.1 - 3

Symmetry

The three types of symmetry figures to be considered will have are:

1. The x-axis (polar axis) as a line of symmetry.

2. The y-axis (the line θ = π/2) as a line of symmetry.

3. The origin (the pole) as a point of symmetry.

Copyright © 2011 Pearson, Inc. Slide 6.1 - 4

Symmetry Tests for Polar Graphs

The graph of a polar equation has the indicated symmetry

if either replacement produces an equivalent polar

equation.

To Test for Symmetry Replace By

1. about the x-axis (r,θ) (r,–θ) or (–r, π–θ)

2. about the y-axis (r,θ) (–r,–θ) or (r, π–θ)

3. about the origin (r,θ) (–r,θ) or (r, π+θ)

Copyright © 2011 Pearson, Inc. Slide 6.1 - 5

Example Testing for Symmetry

Use the symmetry tests to prove that the graph of

r 2sin2 is symmetric about the y-axis.

Copyright © 2011 Pearson, Inc. Slide 6.1 - 6

Example Testing for Symmetry

r 2sin2

r 2sin2( )

r 2sin(2 )

r 2sin2

r 2sin2

Use the symmetry tests to prove that the graph of

r 2sin2 is symmetric about the y-axis.

Because the equations of

r 2sin2() and

r 2sin2

are equivalent, there is

symmetry about the y-axis.

Copyright © 2011 Pearson, Inc. Slide 6.1 - 7

Rose Curves

The graphs of r acosn and r asin n , where n is

an integer greater than 1, are rose curves.

If n is odd there are

n petals, and

if n is even there are

2n petals.

Copyright © 2011 Pearson, Inc. Slide 6.1 - 8

Limaçon Curves

The lima�on curves are graphs of polar equations

of the form

r a bsin and r a bcos ,

where a 0 and b 0.

Copyright © 2011 Pearson, Inc. Slide 6.1 - 9

Example Analyzing a Limaçon Curve

Show the graphs of r1 4 3cos and r

2 4 3cos

are the same dimpled lima�on.

Copyright © 2011 Pearson, Inc. Slide 6.1 - 10

Example Analyzing a Limaçon Curve

r1 4 3cos

r2 4 3cos

Use a grapher's trace feature to show the following:

r1

: As increases from 0 to 2 ,

the point (r1,) begins at B and

moves counterclockwise one

time around the graph.

r2

: As increases from 0 to 2 ,

the point (r2,) begins at A and

moves counterclockwise one

time around the graph.

Copyright © 2011 Pearson, Inc. Slide 6.1 - 11

Spiral of Archimedes

The spiral of Archimedes is

r

Copyright © 2011 Pearson, Inc. Slide 6.1 - 12

Lemniscate Curves

The lemniscate curves are graphs of polar equations

of the form

r 2 a2 sin2 and r 2 a2 cos2.

Copyright © 2011 Pearson, Inc. Slide 6.1 - 13

Quick Review

Find the absolute maximum value and absolute

minimum value in [0,2 ) and where they occur.

1. y 2cos2x

2. y sin2x 2

3. Determine if the graph of y sin4x is symmetric

about the (a) x-axis, (b) y-axis, and (c) origin.

Use trig identities to simplify the expression.

4. sin( )

5. cos

Copyright © 2011 Pearson, Inc. Slide 6.1 - 14

Quick Review Solutions

Find the absolute maximum value and absolute

minimum value in [0,2 ) and where they occur.

1. y 2cos2x

max value:2 at x 0, min value: 2 at x / 2, 3 / 2

2. y sin2x 2

max value:3 at x / 4,5 / 4 min value:1 at x 3 / 4, 7 / 4

3. Determine if the graph of y sin4x is symmetric

about the (a) x-axis, no (b) y-axis, no and (c) origin. yes

Use trig identities to simplify the expression.

4. sin( ) sin

5. cos cos