The product of roots of the equation `(3)/((log_8x)^2)=3` is 1 (b) (c) 1/3 (d) `1//4`

The product of roots of the equation (log_(8)(8//x^(2)))/((log_(8)x)^(2)) = 3 is

The product of the roots of the equation 3sqrt(8+x)+3sqrt(8-x)=1 , is

If the product of the roots of the equation,x((3)/(4))(log_(2)x)^(2)+log_(2)x-(5)/(4)=sqrt(2) is (1)/((a)^((1)/(b))) (where a,b in N ) then the value of (a+b)

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 roots of the equation,x-(2)/(x-1)=1-(2)/(x-1) is 0(b)1(c)2(d)3

Number of roots of the equation 2sqrt(2x+1)=2x-1 is 0(b)1(c)2(d)3

The solution of the equation 2(m+3)=8 is (a) 1 (b) 2 (c) 3 (d) 4

If the product of the roots of the equation x^(2)-3kx+2e^(2log k)-1=0 is 17 then k=

Number of integral solutions of the equation log_(x-3)(log_(2x^(2)-2x+3)(x^(2)+2x))=0 is 4(b)2 (c) 1(d)0

If product of the roots of the equation 3x^(2)-4x+(log a^(2)-log(-a)+3)=0 is 1 then a ' equal to a.not possible b.-1 c.1 d. none of these