If a, b and c are positive numbers in a GP, then the roots of the quadratic equation `(log_e a)^2-(2log_e b)x+(log_ec)=0` are

If a,b and c are positive numbers in a GP,then the roots of the quadratic equation (log_(e)a)^(2)-(2log_(e)b)x+(log_(e)c)=0 are

The equation log_e x+ log_e (1+x)=0 can be written as

Let a,b" and "c are distinct positive numbers,none of them is equal to unity such that log _(b)a .log_(c)a+log_(a)b*log_(c)b+log_(a)c*log_(b)c-log_(b)a sqrt(a)*log_(sqrt(c))b^(1/3)*log_(a)c^(3)=0, then the value of abc is -

The number of real solution(s) of the equation 9^(log_(3)(log_(e )x))=log_(e )x-(log_(e )x)^(2)+1 is equal to

The pth, qth and rth terms of a GP are the positive numbers a,b and c respectively. Show that the vectors vec i log_e a + vec j log _e b + vec k log _e c and vec i (q-r) + vec j (r-p) + vec k (p-q) are mutually perpendicular.

If a, b, c, are positive real numbers and log_(4) a=log_(6)b=log_(9) (a+b) , then b/a equals

Find the range of f(x)=log_(e)x-((log_(e)x)^(2))/(|log_(e)x|)

The number of real roots of equation log_(e )x + ex = 0 is