If `A` satisfies the equation `x^3-5x^2+4x+lambda=0` , then `A^(-1)` exists if (a)`lambda!=1` (b) `lambda!=2` (c) `lambda!=-1` (d) `lambda!=0`

Let a,b,c be the sides of a triangle. No two of them are equal and lambda in R If the roots of the equation x^2+2(a+b+c)x+3lambda(ab+bc+ca)=0 are real, then (a) lambda 5/3 (c) lambda in (1/5,5/3) (d) lambda in (4/3,5/3)

The equation x^2/(2-lambda)+y^2/(lambda-5)+1=0 represents an ellipse if:

The equation 2 sin^(3) theta+(2 lambda-3) sin^(2) theta-(3 lambda+2) sin theta-2 lambda=0

If the equation 2 cos x + cos 2 lambda x=3 has only one solution , then lambda is

The equation (x^(2))/(10-lambda)+(y^(2))/(6-lambda)=1 represents

If (-2,7) is the highest point on the graph of y =-2x^2-4ax +lambda , then lambda equals

Find the value of lambda the equation is 5x+y+lambda=0 where x=1 and y=5

Let L_(1) -= ax+by+a root3 (b) = 0 and L_(2) -= bx - ay + b root3 (a) = 0 be two straight lines . The equations of the bisectors of the angle formed by the foci whose equations are lambda_(1)L_(1)-lambda_(2)L_(2)=0 and lambda _(1) l_(1) + lambda_(2) = 0 , lambda_(1) and lambda_(2) being non - zero real numbers ,are given by

10 different vectors are lying on a plane out of which four are parallel with respect to each other. Probability that three vectors chosen from them will satisfy the equation lambda_1a+lambda_2b+lambda_3c=0, where lambda_1, lambda_2 and lambda_3ne=0 is