Below you can find the full step by step solution for you problem. We hope it will be very helpful for you and it will help you to understand the solving process.
(log(x^2)(1/x))'The calculation above is a derivative of the function f (x)
(((1/x)'/(1/x))*ln(x^2)-(((x^2)'/(x^2))*ln(1/x)))/((ln(x^2))^2)
(((((1)'*x-(1*(x)'))/(x^2))/(1/x))*ln(x^2)-(((x^2)'/(x^2))*ln(1/x)))/((ln(x^2))^2)
((((0*x-(1*(x)'))/(x^2))/(1/x))*ln(x^2)-(((x^2)'/(x^2))*ln(1/x)))/((ln(x^2))^2)
((((0*x-(1*1))/(x^2))/(1/x))*ln(x^2)-(((x^2)'/(x^2))*ln(1/x)))/((ln(x^2))^2)
(((-1/(x^2))/(1/x))*ln(x^2)-(((x^2)'/(x^2))*ln(1/x)))/((ln(x^2))^2)
(((-1/(x^2))/(1/x))*ln(x^2)-(((2*x^(2-1))/(x^2))*ln(1/x)))/((ln(x^2))^2)
(((-1/(x^2))/(1/x))*ln(x^2)-(((2*x)/(x^2))*ln(1/x)))/((ln(x^2))^2)
(2*(-x)^-1*ln(x)-(2*x^-1*ln(1/x)))/(4*(ln(x))^2)
| Derivative of (9000)/x | | Derivative of 4444 | | Derivative of 800(1.03)^x | | Derivative of 26x^5 | | Derivative of 15ln(8x-2) | | Derivative of 0.0241*cos(397*x) | | Derivative of (x^2-2*x)/(2^(x)) | | Derivative of (x-1)^0,5 | | Derivative of (e^(-0.75*x))*(sin(2.645*x)) | | Derivative of (e^(-0.75*x))*(cos(2.645*x)) | | Derivative of (3sin(7x))/x | | Derivative of 3x^7sin(8x) | | Derivative of (-3sin(4x))/x | | Derivative of 3x^5sin(6x) | | Derivative of 10-10^-2t | | Derivative of (-6sin(2x))/x | | Derivative of 5x^7sin(6x) | | Derivative of -4e^6x | | Derivative of 6t-5 | | Derivative of ln(7(x^2)) | | Derivative of 3e^(y^2) | | Derivative of (e^(-0.5*x))*(sin(0.866*x)) | | Derivative of (e^(-0.5*x))*(cos(0.866*x)) | | Derivative of e^(-2.5*x)*cos(5.45*x) | | Derivative of (e^(-2.5*x))*(sin(5.45*x)) | | Derivative of (e^(-4*x))*(cos(5*x)) | | Derivative of (e^(-4*x))*(sin(5*x)) | | Derivative of e^(-2.5*x)*sin(5.45*x) | | Derivative of e^(1-1000t) | | Derivative of e^1-1000t | | Derivative of e^(-2.479*x) | | Derivative of (e^x)-x-1 |