What is the polar form of #(-2,10)#?

1 Answer
Bdub
Mar 3, 2016

#r=sqrt(x^2+y^2 ) =sqrt(4+100)=sqrt 104=2 sqrt 26#
#theta=tan^-1 (y/x)=tan^-1 (10/-2) = (tan^-1 -5) =-1.373...->pi-1.373...or -1.373...+pi->theta ~~1.768 -> (2 sqrt 26 , 1.768)#

Explanation:

Use the formulas #r^2=x^2+y^2 and tan theta = y/x #to change the point from rectangular to polar. Note that the point (-2,10) is in quadrant 2 hence to find #theta# we have to add #pi# or 180 to the negative answer we got or ignore the negative sign and subtract from #pi#

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