The value of `(yz)^(logy-logz)xx(zx)^(logz-logx)xx(xy)^(logx-logy)` is

prove that x^(logy-logz).y^(logz-logx).z^(logx-logy)=1

Suppose x;y;zgt0 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 z^(1/logx+1/logy) (base 10)

The value of inte^(5logx)dx is

Suppose x , y ,z=0 and are not equal to 1 and logx+logy+logz=0. Find the value of 1/(x^(logy))+1/(^(logz))1/(y^(logz))+1/(^(logx))1/(z^(logx))+1/(^(logy))

The value of x satisfying 5^logx-3^(logx-1)=3^(logx+1)-5^(logx - 1) , where the base of logarithm is 10

The value of int_(0)^(oo) (logx)/(1+x^(2))dx , is

x(dy)/(dx)=y(logy-logx+1)

The value of the integral int(e^(5logx)-e^(4logx))/(e^(3logx)-e^(2logx))dx is equal to (A) x^2+c (B) x^3/3+c (C) x^2/2+c (D) none of these

The value of the integral int(e^(5logx)-e^(4logx))/(e^(3logx)-e^(2logx))dx is equal to (A) x^2+c (B) x^3/3+c (C) x^2/2+c (D) none of these

The value of int_(0)^(oo)(logx)/(a^(2)+x^(2))dx is