The equation `x^((3)/4 (log_2x)^2+log_2 x -(5)/(4))=sqrt(2)` has :

The equation x^3/4((log)_2x)^(2+(log)_2x-5/4)=sqrt(2) has at least one real solution exactly three solutions exactly one irrational solution complex roots

For the equation x^(3/4(logx)^(2)+log_(2)x-5/4)=sqrt2 , which one of the following is true ?

If x^({(3)/(4)("log"_(3)x)^(2) + ("log"_(3)x)-(5)/(4)}) = sqrt(3) , then x has

Solve for x :: x^(3/4(log_2(x))-(5/4))=sqrt(2) .

Solve the following inequation . (xii) (log_2x)^2+3log_2xge5/2log_(4sqrt2)16

Solve the equation: log_2x+log_4(x+2)=2

Find the number of real values of x satisfying the equation. log_(2)(4^(x+1)+4)*log_(2)(4^(x)+1)=log_(1//sqrt(2)) sqrt((1)/(8))

Match the column Column I, Column II If x=3,t h e n(log)_4(2(log)_3(1+(log)_2(1+3Log_3x))) is equal to, p. 3 If x=100 , then 3^((log)_3logsqrt(x))-logx+log^2x is equal to, q. 1 If one of the root of the equation 2((log)_xsqrt(5))^2-3(log)_x(a)+1=0 is sqrt(5) , then the other root is, r. 1/2 If (log)_2(4. 3^x-6)-(log)_2(9^x-6)=1, then x is equal to, s. 5

Solve the equation: log_(2x+3)x^(2) lt log_(2x)(2x+3)

Solve the equation 2x^(log_(4)^(3))+3^(log_(4)^(x))=27