What is the polar form of (16,-4?

1 Answer
Somebody N.
Nov 30, 2017

( 4sqrt(17) , -0,245 )

Explanation:

The quickest method is to use the formula:

(x , y ) = ( sqrt(x^2+y^2), arctan(y/x))

Below is an alternative method.

x=rcostheta

y=rsintheta

:.

16=rcostheta [ 1 ]

-4=rsintheta [ 2 ]

Squaring both equations:

256=r^2cos^2(theta)

16=r^2sin^2(theta)

Adding both equations:

272=r^2cos^2(theta)+r^2sin^2(theta)

272=r^2(cos^2(theta)+sin^2(theta))

272=r^2(1)=>r=+-sqrt(272)=+-4sqrt(17)

We only need the positive root, negative radii can exist, and a point can be represented by many different polar coordinates, unlike Cartesian coordinates which are unique.

theta=arctan(y/x)=arctan(-4/16)=arctan(-1/4)=-0.24498

Polar coordinate:

( 4sqrt(17) , -0,245 )

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