Is there a real value of `lambda` for which the image of the point `(lambda,lambda-1)` by the line mirror `3 x + y = 6 lambda` is the point `(lambda^2 + 1, lambda)` If so find `lambda`. ,

Is there a real value of lambda for which the image of the point (lambda,lambda-1) by the line mirror 3x+y=6 lambda is the point (lambda^(2)+1,lambda) If so find lambda_(.)

The value of lambda for which the points (-2,4,lambda),(3,-6,-8),(1,-2,-2) are collinear is

Find the locus of image of the veriable point (lambda^(2), 2 lambda) in the line mirror x-y+1=0, where lambda is a peremeter.

If the image of the point M(lambda,lambda^(2)) on the line x+y = lambda^(2) is N(0, 2), then the sum of the square of all the possible values of lambda is equal to

Find the range of values of lambda for which the point (lambda,-1) is exterior to both the parabolas y^(2)=|x|

Locus of the image of the point (1,1) in the line (5x-2y-7)+lambda(2x-3y+6)=0 (lambda in R'), is

Locus of the image of the point (1,1) in the line (5x-2y-7)+lambda(2x-3y+6)=0lambda in R, is

The sum of distinct value of lambda for which the system of equations (lambda -1 )x + (3lambda + 1) y + 2 lambda x= 0 (lambda -1) x + (4lambda - 2) y + (lambda + 3) x= 0 2x + (2lambda + 1) y + 3(lambda - 1) z=0 has non - zeor solutions is ______.

Find values of lambda for which line y=x+1,y=2x+2 and y=(lambda^(2)+lambda-1)x+3 are con-current.

Find the value of lambda so that the points (1, -5), (-4, 5) and (lambda,\ 7) are collinear.