How do you evaluate #arcsin -1/2#?

1 Answer
George C.
May 29, 2015

Consider an equilateral triangle with sides of length 2.
Each of the internal angles will be #pi/3# (i.e. #60^o#).

Now split the triangle into two mirror image right angled triangles.
The shortest side of each will have length #1#, and the smallest angle opposite it will be #pi/6# (i.e. #30^o#).

Then by definition #sin(pi/6) = 1/2# - the length of the shortest side divided by the length of the hypotenuse.

Now #sin(-theta) = -sin(theta)#, so

#sin(-pi/6) = -sin(pi/6) = -1/2#

The range of #arcsin# is #-pi/2 <= theta <= pi/2#.

#-pi/6# lies in this range so #arcsin(-1/2) = -pi/6#

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