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Learn how to graph polar equations using point plotting and symmetry methods. Understand the use of polar grids, symmetry tests, and graphing specific shapes like circles, limaçons, rose curves, and lemniscates.
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Objectives • Use point plotting to graph polar equations. • Use symmetry to graph polar equations.
Using Polar Grids to Graph A polar equation is an equation whose variables are r and θ.The graph of a polar equation is the set of all points whose polar coordinates satisfy the equation. We use polar grids like the one in the figure to graph polar equations.
Circles in Polar Coordinates The graph of r = acos θandr = a sin θ, a > 0, are circle.
Example 1: Graphing an Equation Using the Point-Plotting Method (1 of 4) We construct a partial table of coordinates for using multiples of Then we plot the points and join them in a smooth curve.
Example 1: Graphing an Equation Using the Point-Plotting Method (2 of 4) Graph
Example 1: Graphing an Equation Using the Point-Plotting Method (3 of 4) Graph
Example 1: Graphing an Equation Using the Point-Plotting Method (4 of 4) Graph We can verify that the graph is a circle by changing from polar to rectangular form. The graph is a circle with center at (0, 2) and r = 2.
Tests for Symmetry in Polar Coordinates (1 of 3) Symmetry with Respect to the Polar Axis (x - Axis) Replace θwith −θ. If an equivalent equation results, the graph is symmetric with respect to the polar axis.
Tests for Symmetry in Polar Coordinates (2 of 3) Symmetric with Respect to the Line Replace (r, θ) with (−r, −θ). If an equivalent equation results, the graph is symmetric with respect to
Tests for Symmetry in Polar Coordinates (3 of 3) Symmetric with Respect to the Pole (Origin) Replace r with −r. If an equivalent equation results, the graph is symmetric with respect to the pole.
Example 2: Graphing a Polar Equation Using Symmetry (1 of 6) Check for symmetry and then graph the polar equation: Symmetry with respect to the polar axis (x-axis): on the graph of the function. The polar equation does not change when θ is replaced with −θ, so the graph is symmetric with respect to the polar axis.
Example 2: Graphing a Polar Equation Using Symmetry (2 of 6) Check for symmetry and then graph the polar equation: Symmetry with respect to the line (y-axis): on the graph of the function. The polar equation changes when θis replaced with −θ. The graph is not symmetric with respect to the line
Example 2: Graphing a Polar Equation Using Symmetry (3 of 6) Check for symmetry and then graph the polar equation: Symmetry with respect to the polar (origin): on the graph of the function. The polar equation changes when r is replaced with −r. The graph is not symmetric with respect to the pole.
Example 2: Graphing a Polar Equation Using Symmetry (4 of 6) Check for symmetry and then graph the polar equation: Complete a table of values for the function:
Example 2: Graphing a Polar Equation Using Symmetry (5 of 6)
Example 2: Graphing a Polar Equation Using Symmetry (6 of 6) The graph of is an example of a limaçon.
Limaçons The graph of determines a limaçon’s are called limaçon. The ratio shape.
Example 3: Graphing a Polar Equation (1 of 3) Graph the polar equation: We first check for symmetry:
Example 3: Graphing a Polar Equation (2 of 3) Graph the polar equation: Complete a table of values for the function:
Example 3: Graphing a Polar Equation (3 of 3) Graph the polar equation: is an example of a rose curve. The graph of
Rose Curves The graph of are called rose curves. If n is even, the rose has 2n petals. If n is odd, the rose has n, petals.
Example 4: Graphing a Polar Equation (1 of 3) Graph the polar equation: We first check for symmetry:
Example 4: Graphing a Polar Equation (2 of 3) Graph the polar equation: Complete a table of values for the function:
Example 4: Graphing a Polar Equation (3 of 3) Graph the polar equation: is an example of a lemniscate. The graph of the polar equation
Lemniscates The group of are called lemniscates.