How do we differentiate #f(x)=sin^4(4x^2-6x+1)# using chain rule? Calculus Basic Differentiation Rules Summary of Differentiation Rules 1 Answer Shwetank Mauria Apr 19, 2017 Please see below. Explanation: For #y=f(x)=sin^4(4x^2-6x+1)#, we can follow the order, #f(x)=g(x)^4#, #g(x)=sin(h(x))# and #h(x)=4x^2-6x+1# Hence #(dy)/(dx)=(df)/(dx)# = #(df)/(dg)×(dg)/(dh)×(dh)/(dx)# = #4(g(x)^3)×cos(h(x))×(8x-6)# = #4sin^3(4x^2-6x+1)cos(4x^2-6x+1)(8x-6)# = #8(4x-3)sin^3(4x^2-6x+1)cos(4x^2-6x+1)# Answer link Related questions What is a summary of Differentiation Rules? What are the first three derivatives of #(xcos(x)-sin(x))/(x^2)#? How do you find the derivative of #(e^(2x) - e^(-2x))/(e^(2x) + e^(-2x))#? How do I find the derivative of #y= x arctan (2x) - (ln (1+4x^2))/4#? How do you find the derivative of #y = s/3 + 5s#? What is the second derivative of #(f * g)(x)# if f and g are functions such that #f'(x)=g(x)#... How do you calculate the derivative for #g(t)= 7/sqrtt#? Can you use a calculator to differentiate #f(x) = 3x^2 + 12#? What is the derivative of #ln(x)+ 3 ln(x) + 5/7x +(2/x)#? How do you find the formula for the derivative of #1/x#? See all questions in Summary of Differentiation Rules Impact of this question 1231 views around the world You can reuse this answer Creative Commons License