How do you simplify the expression cos[arcsin(x)] * sin[arccos(x)]?

1 Answer
sente
Oct 10, 2016

cos(arcsin(x))*sin(arccos(x))=1-x^2

Explanation:

Let's draw a right triangle.

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In this triangle, we've chosen a leg of length x and a hypotenuse of length 1, meaning sin(a) = cos(b) = x/1 = x. Because of that, we know that a = arcsin(x) and b = arccos(x). Additionally, we can use the Pythagorean theorem to find the length of the remaining leg as sqrt(1-x^2)

We can now use this triangle to find the product.

cos(arcsin(x))*sin(arccos(x)) = cos(a)*sin(b)

=sqrt(1-x^2)/1 * sqrt(1-x^2)/1

=1-x^2

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