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How do you find the cartesian graph of #r cos(θ) = 9#?

1 Answer

Dec 7, 2015

#x=9#

Explanation:

#cos(theta) = (x_theta)/(sqrt((x_theta)^2+(y_theta)^2))#

#r= sqrt((x_theta)^2+(y_theta)^2))#

Therefore
#color(white)("XXX")rcos(theta) = cancel(sqrt((x_theta)^2+(y_theta)^2))xx (x_theta)/(cancel(sqrt((x_theta)^2+(y_theta)^2))#

and since #r*cos(theta) = 9#

#color(white)("XXX")x_theta = 9#

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