Solve for x, logx(8x-3)-logx(4)=2...

Solve for x, `log_x(8x-3)-log_x(4)=2`

Verified by Experts

`log_x(8x-3)-log_x4=2rArrlog_x((8x-3)/4)=2rArrx^2=(8x-3)/4rArr4x^2-8x+3=0rArrx=3/2or1/2`

Similar Questions

Explore conceptually related problems

Solve for x: log_(4) log_(3) log_(2) x = 0 .

Solve for x, (a) (log_(10)(x-3))/(log_(10)(x^(2)-21))=(1)/(2),(b)log(log x)+log(log x^(3)-2)=0; where base of log is 10 everywhere.

Solve for x:(lg)_(4)(log)_(3)(log)_(2)x=0

solve for x if log_(4)log_(3)log_(2)x=0 and log_(e)log_(5)(sqrt(2x+2)-3)=0

Find the value of x,log_(4)(x+3)-log_(4)(x-1)=log_(4)8-2

Solve for x:(log)_(4)(x^(2)-1)-(log)_(4)(x-1)^(2)=(log)_(4)sqrt((4-x)^(2))

Solve log_(x)2log_(2x)2=log_(4x)2

Solve : log_4 8+ log_4(x+3)-log_4(x-1)=2

Solve log_(4)(8)+log_(4)(x+3)-log_(4)(x-1)=2