How do you find the derivative of #2/(x+1)#? Calculus Basic Differentiation Rules Quotient Rule 1 Answer Guilherme N. Jun 1, 2015 This expression can be rewritten as #2(x+1)^-1#, following the exponential alw that states #a^-n=1/a^n#. Naming #u=x+1#, we can rewrite the expression as #y=2u^-1# and, thus, derivate it according to the chain rule, which states that #(dy)/(dx)=(dy)/(du)(du)/(dx)# So, #(dy)/(du)=-2u^-2# #(du)/(dx)=1# Thus #(dy)/(dx)=(-2u^-2)(1)=-2(x+1)^-2=color(green)(-2/(x+1)^2)# Answer link Related questions What is the Quotient Rule for derivatives? How do I use the quotient rule to find the derivative? How do you prove the quotient rule? How do you use the quotient rule to differentiate #y=(2x^4-3x)/(4x-1)#? How do you use the quotient rule to differentiate #y=cos(x)/ln(x)#? How do you use the quotient rule to find the derivative of #y=tan(x)# ? How do you use the quotient rule to find the derivative of #y=x/(x^2+1)# ? How do you use the quotient rule to find the derivative of #y=(e^x+1)/(e^x-1)# ? How do you use the quotient rule to find the derivative of #y=(x-sqrt(x))/(x^(1/3))# ? How do you use the quotient rule to find the derivative of #y=x/(3+e^x)# ? See all questions in Quotient Rule Impact of this question 4165 views around the world You can reuse this answer Creative Commons License