Solve the system of equations `log_2y=log_4(xy-2),log_9x^2+log_3(x-y)=1`.

The solution set of the system of equations log_12 x(1/(log_x 2)+log_2 y)=log_2 x and log_2 x.(log_3(x+y))=3 log_3 x is : (i) x=6, y=2 (ii) x=4, y=3 (iii) x=2, y=6 (iv) x=3, y=4

The solution set of the system of equations log_12 x(1/(log_x 2)+log_2 y)=log_2 x and log_2 x.(log_3(x+y))=3 log_3 x is : (i) x=6, y=2 (ii) x=4, y=3 (iii) x=2, y=6 (iv) x=3, y=4

The solution set of the system of equations log_(12)x((1)/(log_(x)2)+log_(2)y)=log_(2)x and log_(2)x*(log_(3)(x+y))=3log_(3)x is :(i)x=6,y=2(ii)x=4,y=3(iii)x=3,y=4(ii)x=2,y=6

Consider the system of equations log_(3)(log_(2)x)+log_(1//3)(log_(1//2)y) =1 and xy^(2) = 9 . The value of 1/y lies in the interval

Consider the system of equations log_(3)(log_(2)x)+log_(1//3)(log_(1//2)y) =1 and xy^(2) = 9 . The value of 1/y lies in the interval

Consider the system of equations log_(3)(log_(2)x)+log_(1//3)(log_(1//2)y) =1 and xy^(2) = 9 . The value of 1/y lies in the interval

Consider the system of equations log_(3)(log_(2)x)+log_(1//3)(log_(1//2)y) =1 and xy^(2) = 9 . The value of x in the interval

Consider the system of equations log_(3)(log_(2)x)+log_(1//3)(log_(1//2)y) =1 and xy^(2) = 9 . The value of x in the interval

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

The solutions to the system of equations log_(5)x+log_(27)y=4 and log_(x)5-log_(y)(27)=1 are (x_(1),y_(1)) and (x_(2),y_(2)) then log_(15)(x_(1)x_(2)y_(1)y2) is