(log x+7)/(x)=10^(log x+1)

Solve following log equation x^((log x+7)/(4))=10^(log x+1)

x^((log_(10)x+7)/(4))=10^(log_(10)x+1)

3^(log x)-2^(log x)=2^(log x+1)-3^(log x-1), where base is 10,

int_(1)^(e )(1)/(6x(log x)^(2)+7x log x + 2x)dx=

Differentiate (log)_(10)x+(log)_(x)10+(log)_(xx)+(log)_(10)10 with respect to x.

Differentiate the following functions with respect to x:(log)_(10)x+(log)_(x)10+(log)_(x)+(log)_(10)10

The value of int(1)/(x+x log x)dx is 1+log x(b)x+log x(c)x log(1+log x)(d)log(1+log x)

Suppose x;y;z>0 and are not equal to 1 and log x+log y+log z=0. Find the value of x(1)/(log y)+(1)/(log z)xx y^((1)/(log z)+(1)/(log x))xx(1)/(log x)+(1)/(log y) (base 10)

Solve the following equations (i) (log_(2)(9-2^(x)))/(3-x)=1 (ii) x^((log_(10)x+7)/(4))=10^((log_(10)x+1)