How do you find the exact value of #cot(arcsin(-12/13))#?

1 Answer
Alan P.
Dec 29, 2016

#cot(arcsin(-12/13))=color(green)(-5/12)#

Explanation:

Remember that the #arcsin# function is defined as having a range #(-pi/2,+pi/2]#

The #arcsin(-12/13)# can be represented by a triangle in the standard position with opposite side (i.e. #y# coordinate): #(-12)#
and hypotenuse #(13)#

Based on the Pythagorean Theorem, this triangle would have an adjacent side with the length #sqrt(13^2-(-12)^2) =5#

Since #cot="adjacent"/"opposite"#

#cot(arcsin(-12/13))=5/(-12)=-5/12#

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