Find the value of `lambda` such that lines `x + 2y = 3, 3x-y = 1 and 2x + y = 2` can not form a triangle.

The product of all the values of |lambda| , such that the lines x+2y-3=0, 3x-y-1=0 and lambdax +y-2 =0 cannot form a triangle, is equal to

The product of all the values of |lambda| , such that the lines x+2y-3=0, 3x-y-1=0 and lambdax +y-2 =0 cannot form a triangle, is equal to

The product of all the values of |lambda| , such that the lines x+2y-3=0, 3x-y-1=0 and lambdax +y-2 =0 cannot form a triangle, is equal to

Find the value of lambda the equation is 2x+3y+lambda where x=2 and y=1

Find the area of triangle formed by lines x - 2y = 5 and 2x + 3y = 10 with y-axis.

Find the area of triangle formed by the lines : y=0,\ x=2\ a n d\ x+2y=3.

Find the value of lambda , if the line x - 3y + 4 + lambda (8x - 3y + 2) = 0 is parallel to the X-axis .

Find the area of the triangle formed by the lines x=3,y=2 and 3x+4y=29

Find the area of triangle formed by the lines: x+y-6=0,x-3y-2=0 and 5x-3y+2=0