How do you find the derivative of #arcsin(3-x^2)#? Calculus Differentiating Trigonometric Functions Differentiating Inverse Trigonometric Functions 1 Answer Narad T. Dec 24, 2016 The answer is #=-(2x)/(sqrt(1-(3-x^2)^2))# Explanation: We need #cos^2theta+sin^2theta=1# #(sinx)'=cosx# and #(x^n)'=nx^(n-1)# So, Let #y=arcsin(3-x^2)# #siny=3-x^2# #(siny)'=(3-x^2)'# #cosydy/dx=-2x# #dy/dx=-(2x)/cosy# But, #cos^2y=1-sin^2y=1-(3-x^2)^2# #cosy=sqrt(1-(3-x^2)^2)# So, #dy/dx=-(2x)/(sqrt(1-(3-x^2)^2))# Answer link Related questions What is the derivative of #f(x)=sin^-1(x)# ? What is the derivative of #f(x)=cos^-1(x)# ? What is the derivative of #f(x)=tan^-1(x)# ? What is the derivative of #f(x)=sec^-1(x)# ? What is the derivative of #f(x)=csc^-1(x)# ? What is the derivative of #f(x)=cot^-1(x)# ? What is the derivative of #f(x)=(cos^-1(x))/x# ? What is the derivative of #f(x)=tan^-1(e^x)# ? What is the derivative of #f(x)=cos^-1(x^3)# ? What is the derivative of #f(x)=ln(sin^-1(x))# ? See all questions in Differentiating Inverse Trigonometric Functions Impact of this question 1063 views around the world You can reuse this answer Creative Commons License