The value of x satisfying the inequation `x^(1/(log10^x)).log_10xlt1` , is

The value of x satisfying the equation 2log_(10)x - log_(10) (2x-75) = 2 is

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

The set of all real numbers satisfying the inequation x^((log_(10) x)^(2)-3(log10 x)+1) gt 1000 , is

The value of x, satisfying the inequality log_(0.3)(x^(2)+8)>log_(0.3)9x, lies in

The sum of all possible values of x satisfying the equation 6log_(x-1)10+log_(10)(x-1)=5

The total number of integral value of x satisfying the equation x ^(log_(3)x ^(2))-10=1 //x ^(2) is

The number of real values of x satisfying the equation log_(10) sqrt(1+x)+3log_(10) sqrt(1-x)=2+log_(10) sqrt(1-x^(2)) is :

Absolute value of the difference between the greatest and smallest integral value of x ,satisfying the inequality ((log_(10)x-1))/((e^(x)-3))<=0 ,is equal to

The value of ' x 'satisfying the equation,4^(log_(9)3)+9^(log_(2)4)=10^(log_(x)83) is

The set of real values of x satisfying the inequality log _(x+(1)/(x))(log_(2)((x-1)/(x+2)))>0, is equal to