The values of `lambda` for which the system of equations ` x + y - 3 = 0` `(1+lambda)x+(2+lambda)y-8=0` `x-(1 +lambda) y + (2 + lambda) = 0` is consistent are a)`-5//3,1` b)`2//3,-3` c)`-1//3,-3` d)0,1

Let lambda and alpha be real. Let S denote the set of all values of lambda for which the system of linear equations lambda x+ (sin alpha) y + (cos alpha)z = 0 , x + (cos alpha) y + (sin alpha) z = 0 , -x + (sin alpha) y - (cos alpha) z = 0 has a non trivial solution then S contains a) (-1,1) b) [-sqrt2,-1] c) [1,sqrt2] d) [-sqrt2,sqrt2]

Solve the following system of linear equations. x+y+z=3 , y-z=0 , 2x-y=1

If the roots alpha, beta of the equations (x^(2)-bx)/(ax-c) = (lambda-1)/(lambda+1) are such that alpha +beta =0 , then the value of lambda is :

Find the complete set of values of lambda , for which the function f(x) = {{:(x + 1, x lt 1),(lambda,x = 1),(x^(2) - x + 3,x gt 1):} is strictly increasing at x = 1.

The values of lambda so that the line 3x-4y=lambda touches x^(2)+y^(2)-4x-8y-5=0 are :a) -35, 15 b) 3, -5 c) 35, -15 d) -3, 5