5(log_(5)^(2)x)+x^(log_(5)x)=1250

If x_(1) and x_(2) are the solutions of the equation 5^((log_(5)x)^(2))+x^(log_(5)x)=1250, then x_(1)*x_(2) is equal to

Number of integral solution of equation 5^(log_(5)^(2)x+x^(log5)x)=1250 is

If alpha and beta are solutions of the equation 5^(log_(5)2)+x^(log_(5)x)=1250; then log_(beta)alpha equals :

If log_(5)(x^(2)+x)-log_(5)(x+1)=2, then the value of x is a.5 b.10 c.25 d.32

Lt_(x to 1)(log_(5)5x)^(log_(x)5)=

Sum of all the solutions of the equation 5^((log_(5)7)^(2x))=7^((log_(7)5)^(x)) is equal to

Value of x satisfying the equation (log_(5)(x))^(2)+log_(5x)((5)/(x))=1 are

If x, where 0,1,2 are respectively the values of x satisfying the equation ((log_(5)x))^(2)+(log_(5x)((5)/(x))), then

The value of x satisfying the equation root(3)(5)^(log_(5)5^(log_(5)5^(log_(5)5^(log_(5)((x)/(2)) = 3, is

The value of x satisfying the equation root(3)(5)^(log_(5)5^(log_(5)5^(log_(5)5^(log_(5)((x)/(2)) = 3, is