Derivative of log(3)(4x)

Derivative of log(3)(4x). Simple step by step solution, to learn. Simple, and easy to understand, so don`t hesitate to use it as a solution of your homework.

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Derivative of log(3)(4x): 


(log(3)(4*x))'

(ln(3)*((4*x)'/(4*x))-(((3)'/3)*ln(4*x)))/((ln(3))^2)

(ln((4*x)')*((4*x)'/(4*x))-(((3)'/3)*ln(4*x)))/((ln(3))^2)

(ln((4)'*x+4*(x)')*((4*x)'/(4*x))-(((3)'/3)*ln(4*x)))/((ln(3))^2)

(ln(0*x+4*(x)')*((4*x)'/(4*x))-(((3)'/3)*ln(4*x)))/((ln(3))^2)

(ln(0*x+4*1)*((4*x)'/(4*x))-(((3)'/3)*ln(4*x)))/((ln(3))^2)

(ln(4)*((4*x)'/(4*x))-(((3)'/3)*ln(4*x)))/((ln(3))^2)

(ln(4)*((4*x)'/(4*x))-((0/3)*ln(4*x)))/((ln(3))^2)

(ln(3))^-1*x^-1

The calculation above is a derivative of the function f (x)

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