The characteristic equation of a matrix A is `lambda^(3) - 5 lambda^(2) - 3 lambda + 2 = 0` , then |adj(A)| =

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

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

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

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

If 2 x-3 y=0 is the equation of the common chord of the circleS x^(2)+y^(2)+4 x=0 and x^(2)+y^(2)+2 lambda y=0 then lambda=

The vectors lambda i + j +2k, i + lambda j - k, 2i-j+ lambda k are coplanar if

The number of distinct real values of lambda for which the vectors -lambda^(2)i + j+ k , i- lambda^(2)j + k and i+j- lambda^(2)k are coplanar is

If tan^(-1) 4 + tan ^(-1) 5 = cot^(-1) lambda " , then find " 'lambda'

If i-2j, 3j+k and lambda i + 3j are coplanar then lambda =