Polar Coordinates Polar and Rectangular Coordinates 9 3

Polar vs. Rectangular Coordinates n For some real-world phenomena, it is useful to be

Polar vs. Rectangular Coordinates n Suppose a rectangular coordinate system is superimposed on a

Polar to Rectangular Coordinates Trigonometric functions can be used to convert polar coordinates to

Rectangular to Polar Coordinates n If a point is named by the rectangular coordinates

Rectangular to Polar Coordinates n Since the Arctangent function only determines angles in quadrants

Rectangular to Polar Coordinates n When x > 0, θ = n When x

Rectangular to Polar Coordinates n n When x is zero, . Why? The polar

Converting Equations n The conversion equations can also be used to convert equations from

Example 1 Find the rectangular coordinates of each point. a. b. C(3, 270°)

Example 2 Find the polar coordinates of a) E(2, -4) b) F(-8, -12)

Example 3 Write the polar equation r = -3 in rectangular form. Write the

Example 4 Write the rectangular equation x² + (y – 1)² = 1 in

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Polar Coordinates Polar and Rectangular Coordinates 9. 3

Polar vs. Rectangular Coordinates n For some real-world phenomena, it is useful to be able to convert between polar coordinates and rectangular coordinates.

Polar vs. Rectangular Coordinates n Suppose a rectangular coordinate system is superimposed on a polar coordinate system so that the origins coincide and the x-axis aligns with the polar axis, as shown at the right. Let P be any point in the plane. n n Polar Coordinates: P(r, θ) Rectangular Coordinates: P(x, y)

Polar to Rectangular Coordinates Trigonometric functions can be used to convert polar coordinates to rectangular coordinates. n The rectangular coordinates (x, y) of a point named by the polar coordinates (r, θ) can be found by using the following formulas: x = r cos θ y = r sin θ n

Rectangular to Polar Coordinates n If a point is named by the rectangular coordinates (x, y), you can find the corresponding polar coordinates by using the Pythagorean Theorem and the Arctangent function (Arctangent is also known as the inverse tangent function).

Rectangular to Polar Coordinates n Since the Arctangent function only determines angles in quadrants 1 and 4 (because tangent has an inverse in quadrants 1 and 4) you must add π radians to the value of θ for points with coordinates (x, y) that are in quadrants 2 or 3.

Rectangular to Polar Coordinates n When x > 0, θ = n When x < 0, θ =

Rectangular to Polar Coordinates n n When x is zero, . Why? The polar coordinates (r, θ) of a point named by the rectangular coordinates (x, y) can be found by the following formulas: r= When x > 0 When x < 0

Converting Equations n The conversion equations can also be used to convert equations from one coordinate system to the other.

Example 1 Find the rectangular coordinates of each point. a. b. C(3, 270°)

Example 2 Find the polar coordinates of a) E(2, -4) b) F(-8, -12)

Example 3 Write the polar equation r = -3 in rectangular form. Write the polar equation r = 5 cosθ in rectangular form.

Example 4 Write the rectangular equation x² + (y – 1)² = 1 in polar form.