The equation
`(log_10x+2)^3+(log_10x-1)^3=(2log_10x+1)^3` has

Consider the quadratic equation (log_10 8)x^2-(log_10 5)x=2(log_2 10)^-1 -x. Which of the following quantities are irrational.

Solve the following equations. (vii) 4^(log_10x+1)-6^(log_10x)-2.3^(log_10x^2+2)=0

Solve the equation log_(3)(5+4log_(3)(x-1))=2

Solve the following inequation . (xv) x^((log_10x)^2-3log_10x+1)gt1000

Solve the equations log_100 |x+y| = 1/2 . log_10 y - log_10 |x| = log_100 4 for x and y

Find the value of x satisfying the equation, sqrt((log_3(3x)^(1/3)+log_x(3x)^(1/3))log_3(x^3))+sqrt((log_3(x/3)^(1/3)+log_x(3/x)^(1/3))log_3(x^3))=2

Solve the equation: log_(x)^(3)10-6log_(x)^(2)10+11log_(x)10-6=0

If x_1,x_2 & x_3 are the three real solutions of the equation x^(log_10^2 x+log_10 x^3+3)=2/((1/(sqrt(x+1)-1))-(1/(sqrt(x+1)+1))), where x_1 > x_2 > x_3, then these are in

lim_(x->1) (log_3 3x)^(log_x 3)=

The equation : x^(3//4 (log_(2) x)_(4)^(2) + log_(2) x - 5//4) = sqrt(2) has :