How do you differentiate #f(x)=sin(1/(2x)^3)# using the chain rule? Calculus Basic Differentiation Rules Chain Rule 1 Answer Monzur R. May 15, 2017 #f'(x) = -(3cos((2x)^(-3)))/(8x^4)# Explanation: The derivative of #f, (df)/dx,# can be found using the chain rule: #(df)/dx = (df)/(dg) xx (dg)/(dx)# Let #f(x) = sing# where #g=g(x) = 1/(2x)^3= (2x)^-3=1/8x^-3# #(df)/(dg) = cosg = cos((2x)^-3)# #(dg)/dx = -3/8x^-4= -3/(8x^4)# #(df)/dx = cosg xx -3/(8x^4)# #= -(3cos((2x^-3)))/(8x^4)# Answer link Related questions What is the Chain Rule for derivatives? How do you find the derivative of #y= 6cos(x^2)# ? How do you find the derivative of #y=6 cos(x^3+3)# ? How do you find the derivative of #y=e^(x^2)# ? How do you find the derivative of #y=ln(sin(x))# ? How do you find the derivative of #y=ln(e^x+3)# ? How do you find the derivative of #y=tan(5x)# ? How do you find the derivative of #y= (4x-x^2)^10# ? How do you find the derivative of #y= (x^2+3x+5)^(1/4)# ? How do you find the derivative of #y= ((1+x)/(1-x))^3# ? See all questions in Chain Rule Impact of this question 1762 views around the world You can reuse this answer Creative Commons License