What is the Cartesian form of (100,(-17pi)/16))?

1 Answer
Jim G.
Jan 27, 2016

(- 98.1 , 19.5 )

Explanation:

Using the formulae that links Polar to Cartesian coordinates.

• x = r costheta

• y = r sintheta

Here r = 100 and theta = -17/16 pi

Note : (100 , -17/16 pi )

denotes a point in the 2nd quadrant hence check that the

Cartesian coordinates are in the 2nd quadrant.

hence : x = 100 xx cos (-17/16 pi ) = - 98 . 1

and y = 100 xx sin(-17/16 pi ) = 19.5

and ( - 98.1 , 19.5 ) is a point in the 2nd quadrant,

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