8.2 Polar Equations and Graphs

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Presentation transcript:

8.2 Polar Equations and Graphs

An equation whose variables are polar coordinates is called a polar equation. The graph of a polar equation consists of all points whose polar coordinates satisfy the equation.

Identify and graph the equation: r = 2 Circle with center at the pole and radius 2.

Theorem Let a be a nonzero real number, the graph of the equation is a horizontal line a units above the pole if a > 0 and |a| units below the pole if a < 0.

Theorem Let a be a nonzero real number, the graph of the equation is a vertical line a units to the right of the pole if a > 0 and |a| units to the left of the pole if a < 0.

Theorem Let a be a positive real number. Then, Circle: radius a; center at (0, a) in rectangular coordinates. Circle: radius a; center at (0, -a) in rectangular coordinates.

Theorem Let a be a positive real number. Then, Circle: radius a; center at (a, 0) in rectangular coordinates. Circle: radius a; center at (-a, 0) in rectangular coordinates.

Theorem Tests for Symmetry Symmetry with Respect to the Polar Axis (x-axis):

Theorem Tests for Symmetry

Theorem Tests for Symmetry Symmetry with Respect to the Pole (Origin):

The tests for symmetry just presented are sufficient conditions for symmetry, but not necessary. In class, an instructor might say a student will pass provided he/she has perfect attendance. Thus, perfect attendance is sufficient for passing, but not necessary.

Symmetry: Polar axis: Symmetric with respect to the polar axis.

The test fails so the graph may or may not be symmetric with respect to the above line.

The pole: The test fails, so the graph may or may not be symmetric with respect to the pole.

Identify points on the graph:

Cardioids (a heart-shaped curves) are given by an equation of the form where a > 0. The graph of cardioid passes through the pole.

Limacons without the inner loop are given by equations of the form where a > 0, b > 0, and a > b. The graph of limacon without an inner loop does not pass through the pole.

Limacons with an inner loop are given by equations of the form where a > 0, b > 0, and a < b. The graph of limacon with an inner loop will pass through the pole twice.

Rose curves are given by equations of the form and have graphs that are rose shaped. If n is even and not equal to zero, the rose has 2n petals; if n is odd not equal to +1, the rose has n petals.

Lemniscates are given by equations of the form and have graphs that are propeller shaped.