What is the polar form of ( -51,6 )?

1 Answer
Shwetank Mauria
Aug 7, 2016

Polar form coordinates are (3sqrt293,173.29^o)

Explanation:

A rectangular coordinate (x,y) can be written as polar coordinate (r,theta), where x=rcostheta, y=rsintheta, theta=tan^(-1)(y/x) and r=sqrt(x^2+y^2).

As we have rectangular coordinate (-51,6)

r=sqrt((-51)^2+6^2)=sqrt(2601+36)sqr2637=3sqrt293

and theta=tan^(-1)(-6/51)=tan^(-1)(-0.11765)=(180-6.71)^o=173.29^o

Note - As tantheta is negative and while costheta is negative and sintheta is positive, we have taken theta in second quadrant.

Hence polar form coordinates are (3sqrt293,173.29^o)

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