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

The equation (log_(10)x+2)^(3)+(log_(10)x-1)^(3)=(2log_(10)x+1)3

The equation (log_(x) 10)^(3) -(log_(x) 10)^(2) - 6 log_(x) 10 = 0 is satisfied by a value of x given by

What is the solution of the equation x log _(10) ((10)/(3)) + log _(10) 3 = log _(10) (2 + 3 ^(x)) + x ?

Find 'x' satisfying the equation 4^(log_(10) x + 1) - 6^(log_(10)x) - 2.3 ^(log_(10)x^(2) + 2) = 0 .

FInd 'x' satisfying the equation 4^(log_(10)x+1)-6^(log_(10)x)-2.3^(log10)x^(2)+2=0

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

The value of x satisfying the equation 2^(log_2e^(In^5log 7^(log_10^(log_10(8x-3)))

Find the value of x which satisfies the relation log_(10)3+log_(10)(4x+1)=log_(10)(x+1)+1

(log_(10)x)^(2)+log_(10)x^(2)=(log_(10)2)^(2)-1

If x_1and \ x_2 are the solution of the equation x^(3log_10^3x-2/3log_(10)x)=100 root(3)10 then- a. x1x2=1 b. x1*x2=x1+x2 c. log_(x2)x1=-1 d. log(x_1*x_2)=0