The equation `e^x = m(m +1), m<0` has

If three lines whose equations are y = m_(1) x + c_(1) , y = m_(2) x + c_(2) " and " y = m_(3) x + c_(3) are concurrent, then show that m_(1) (c_(2) - c_(3)) + m_(2) (c_(3) - c_(1)) + m_(3) (c_(1) - c_(2)) = 0 .

The value of m for which the equation x^(3) + x + 1 = 0 . Has two roots equal in magnitude but opposite in sign, is :

The product of the roots of the equation x^(2) - 4 mx + 3e^(2 " log m") - 4 = 0 , then its roots will be real when m equals :

If 'm' and 'n' are the roots of the equation x^(2) - 6x +2=0 , find the value of m^(3)n^(2)+n^(3)m^(2) :

If m and n are the roots of the equations 2x^(2)- 4x + 1=0 Find the value of (m+n) ^(2) +4mn.

In the equation (x(x-1)-(m+1))/((x-1)(m-1))=x/m , the roots are equal when m=

If m and n are the roots of the equations x^(2) - 6x+ 2 =0 then the value of (1)/(m) + (1)/( n) is :

If both roots of the equation x^(2)-(m-3)x+m=0(m epsilonR) are positive, then

Solve the following linear equations. m-(m-1)/2=1-(m-2)/3