We wish everyone a good day. In this article, we will tell you the derivative of the cos(arcsinx) expression. We wish you good lessons in advance…
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| cos(arcsinx) derivative |
Derivative of cos(arcsinx)
First of all it is equal to cos(arcsinx)=cos(sinx^-1) . Here we will take the derivative.
👉 $frac{d}{dx}cos(arcsinx)=frac{d}{dx}cos(sin^{-1}x)$
👉 $frac{d}{dx}cos(sin^{-1}x)=-sin(sin^{-1}x).frac{1}{sqrt{1-x^2}}$
👉 $-sin(sin^{-1}x).frac{1}{sqrt{1-x^2}}=frac{-x}{sqrt{1-x^2}}$
Answer : $frac{-x}{sqrt{1-x^2}}$
