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

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

If a, b and c are positive numbers in a G.P., then the roots of the quadratic equation (log_ea)x^2-(2log_eb)x.+(log_ec)=0 are

Evaluate int(log_(e)x)^(2)dx

For a >0,!=1, the roots of the equation (log)_(a x)a+(log)_x a^2+(log)_(a^2x)a^3=0 are given

Evaluate int(1+x^(2)log_(e)x)/(x+x^(2)log_(e)x)dx

Draw the graph of y=(log_(e)x)^(2)

Find the number of solutions to the equation x+log_(e)x=0 .

If the product of the roots of the quadratic equation x^(2)-5kx+3e^(log_(e)k)-1=0 be 8, then the value of k =

If a,b,c be three such positive numbers (none of them is 1) that (log_(b)a log_(c )a-log_(a)a) + (log_(a)b log_(c )b-log_(b)b) + (log_(a)c log_(b)c-log_(c )c) = 0 , the prove that abc = 1.

If log_(e)(x^(2)-16)lelog_(e)(4x-11) ,then-