Vertices `Ba n dC` of ` A B C` lie along the line `(x+2)/2=(y-1)/1=(z-0)/4` . Find the area of the triangle given that `A` has coordinates `(1,-1,2)` and line segment `B C` has length 5.

Find the area of the triangle with vertices A(1, 1, 2), B(2, 3, 5) and C(1, 5, 5).

Find the area of the triangle with vertices A(3,-1,2),B(1,-1,-3) and C(4,-3,1) .

Find the distance of the line 4x+7y+5=0 from the point (1,2) along the line 2x-y=0 .

Find area of triangle with verticies A (2, 3), B (-1, 4) and C (-2, -1).

Let the base of a triangle lie along the line x = a and be of length 2a. The area of this triangles is a^(2) , if the vertex lies on the line

The line (x-2)/(3)=(y+1)/(2)=(z-1)/(-1) intersects the curve xy=c^2, z=0, if c is equal to

Find the area of region bounded by the triangle whose vertices are A (-1,1) ,B ( 0,5) and C( 3,2) using integration .

Base of the equilateral triangle is along the line x + y- 2 = 0 and its one vertex is (2, -1). Find area of triangle.

The tangent to the parabola y=x^2 has been drawn so that the abscissa x_0 of the point of tangency belongs to the interval [1,2]. Find x_0 for which the triangle bounded by the tangent, the axis of ordinates, and the straight line y=x_0 ^2 has the greatest area.

Find the area of the triangle whose vertices are : (1) (2,3), (-1, 0), (2,-4) (2) (-5, -1),(3,-5), (5,2)