The inequality `sqrt(x^((log)_2sqrt(x)))geq2` is satisfied by (A) only one value of `x` (B) `x in [0,(1/4)]` `(C) x in [4,oo]` (d) `x in (1,2)`

Solve the inequality sqrt((log)_2((2x-3)/(x-1)))<1

lim_(xto oo)(sqrt(4x^(2)+2x+1)-sqrt(4x^(2)+1)) is

Solve sqrt(x-2)geq-1.

The value of x satisfying sqrt3^(-4+2log_(sqrt5)x)= 1//9 is

The solution of the inequality (log)_(1/2sin^(-1)x >(log)_(1//2)cos^(-1)x is x in [(0,1)/(sqrt(2))] (b) x in [1/(sqrt(2)),1] x in ((0,1)/(sqrt(2))) (d) none of these

Solve log_(5)sqrt(7x-4)-1/2=log_5sqrt(x+2)

The number of roots of the equation (log)_(3sqrt("x"))x+(log)_(3x)sqrt(x)=0 is 1 (b) 2 (c) 3 (d) 0

The number of solution of x^(log)x(x+3)^2=16 is a)0 (b) 1 (c) 2 (d) oo

If f(x)=sqrt(4-x^2)+sqrt(x^2-1) , then the maximum value of (f(x))^2 is ____________

If f(x)=sqrt(4-x^2)+sqrt(x^2-1) , then the maximum value of (f(x))^2 is ____________