Find the values of `lamda and mu` if both the roots of the equation `(3lamda+1)x^(2)=(2lamda+3mu)x-3` are infinite.

Roots of the equation (x^2-4x+3)+lamda(x^2-6x+8)=0 , lamda in R will be

The values of lamda for which one root of the equation x^2+(1-2lamda)x+(lamda^2-lamda-2)=0 is greater than 3 and the other smaller than 2 are given by

Find the value of lamda so that the equations x^(2)-x-12=0 and lamdax^(2)+10x+3=0 may have one root in common. Also, find the common root.

Let S be the set of real values of parameter lamda for which the equation f(x) = 2x^(3)-3(2+lamda)x^(2)+12lamda x has exactly one local maximum and exactly one local minimum. Then S is a subset of

Let S be the set of real values of parameter lamda for which the equation f(x) = 2x^(3)-3(2+lamda)x^(2)+12lamda x has exactly one local maximum and exactly one local minimum. Then S is a subset of

The set of the all values of lamda for which the system of linear equations 2x_(1) - 2x_(2) + x_(3) = lamdax_(1) 2x_(1) - 3x_(2) + 2x_(3) = lamda x_(2) -x_(1) + 2x_(2) = lamda x_(3) has a non-trivial solution,

Draw the graph of f(x) =y= |x-1|+3|x-2|-5|x-4| and find the values of lamda for which the equation f(x) = lamda has roots of opposite sign.

The value of lamda or which the straighat line (x-lamda)/3=(y-1)/(2+lamda)=(z-3)/(-1) may lie on the plane x-2y=0 (A) 2 (B) 0 (C) -1/2 (D) there is no such lamda

Find the value of lamda so that the straight lines: (1-x)/(3)= (7y -14)/(2 lamda)= (z-3)/(2) and (7-7x)/(3 lamda)= (y-5)/(1)= (6-z)/(5) are at right angles.

Find the locus of the point of intersection of the lines x+y=3+lamda and 5x-y=7+3lamda , where lamda is a variable.