What is the Cartesian form of (36,π)?

1 Answer
Ken C.
Jun 28, 2016

(36,0)

Explanation:

The formulas used to convert between polar and Cartesian co-ordinates are:
x=rcosθ
y=rsinθ

We are given the polar co-ordinate point (r,θ)(36,π), so r=36 and θ=π. Making substitutions in the above formulas:
x=36cos(π)=36(1)=36
y=36sin(π)=36(0)=0

Therefore, the point in the Cartesian plane is (36,0).

Intuitively, this result makes sense because π is a half-circle rotation, so in the Cartesian plane an angle of π corresponds to a point on the x-axis (and therefore y=0). A radius of 36 means the point is 36 units to the left or right of the origin, and since an angle of +π is a counterclockwise rotation, it would mean the point is 36 units to the left (and therefore 36).

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