`log_x(4x-3)=2`

If lamda_(1) is the product of values of x satisfy the equation (x)^(log_(3)x)=(x^(9))/((3)^(20)) and lamda_(2) is the number of integers in the solution set of the inequality log_(x)(4x-3)ge2 , the ((lamda_1)/2187+lamda_(2)) equals

Solve x^(log_(4) x)=2^(3(log_(4)x+3) .

Solve x^(log_(4) x)=2^(3(log_(4)x+3) .

Solve x^(log_(4) x)=2^(3(log_(4)x+3) .

Solve x^(log_(4) x)=2^(3(log_(4)x+3) .

Solve log_(x)(2x-(3)/(4))<2

If log_x (8x - 3) - log_x 4 =2 , then the value of x is

Solve log_(2x)2+log_(4)2x=-3/2

f(x) = log (7-4x-3x^(2)) decreases in