Let ABC is a triangle whose vertices are `A(1, –1), B(0, 2), C(x', y')` and area of `triangleABC` is 5 and C(x', y') lie on `3x + y – 4lambda = 0`, then `lamda` =

Let two points be A(1,-1) and B(0, 2) . If a point P(x', y') be such that the area of DeltaPAB = 5 sq. units and it lies on the line, 3x + y - 4lambda =0 , then a value of lambda is:

Let two points be A(1,-1) and B(0,2) .If a point P(h,k) be such that the area of triangle PAB is 5 sq units and it lies on the line 3x+y-4 lambda =0 ,then the value of lambda is

Let two points be A(1,-1) and B(0,2) . If a point P(x',y') be such that the area of DeltaPAB = 5sq.unit and it lies on the line 3x+y-4lambda=0 then value of lambda is

Let two points be A(1,-1) and B(0,2) If a point P(x',y') be such that the area of Delta PAB=5 sq.units and it lies on the line 3x+y-4 lambda=0 then sum of all possible values of lambda is

Using integration, find the area of the triangle ABC whose vertices are A(-1,1), B(0,5) and C(3,2) .

The centroid of the triangle with vertices at A(x_(1),y_(1)),B(x_(2),y_(2)),c(x_(3),y_(3)) is

Let two points be A(1,-1) and B(0,2) . If a point P(x',y') be such that the area of Delta PAB =5sq .units and it lies on the line, 3x+y-4 lambda=0 then sum of all possible values of lambda is

Let two points be A(1,-1) and B(0,2) .If a point P(h,k) be such that the area of Delta PAB=5 sq units and it lies on the line 3x+y-4 lambda=0 then a value of lambda is

Area of triangle formed by straight lines 3x - y = 3, x - 2y + 4 =0 and y =0 is

Find the vertices of the triangle whose sides are y+2x=3, 4y+x=5 and 5y+3x=0