The coordinates of the vertices of a triangle are [m(m+1),m+1],[(m+1)(m+2),m+2] and[(m+2)(m+3), m+3], show that the area of the triangle is independent of m

Coordinates of the vertices A,B,C of a triangle ABC are (m+3,m),(m,m-2)and (m+2,m+2) respectively Show that the area of the triangle ABC is independent of m .

Using determinant : show that the area of the triangle whose vertices are (m,m-2),(m+2,m+2) and (m+3,m) , is independent of m .

The area of the triangle with vertices (-1,m),(3,4) (m-2,m) is 1" sq.units , " then find the value of m.

Three particles, each of mass m, are placed at the vertices of an equilateral triangle. What is the force acting on a particle of mass 2m placed at the centroid D of the triangle ?

Find the value of m for which the area of the triangle having vertices at (-1,m) , (m-2,1) and (m-2,m) is 12(1)/(2) square units .

A triangle has two sides y=m_1x and y=m_2x where m_1 and m_2 are the roots of the equation b alpha^2+2h alpha +a=0 . If (a,b) be the orthocenter of the triangle, then find the equation of the third side in terms of a , b and h .

The normal to the parabola y^(2)=4ax at P(am_(1)^(2),2am_(1)) intersects it again at Q(am_(2)^(2), 2am_(2)) .If A be the vertex of the parabola then show that the area of the triangle APQ is (2a^(2))/(m_(1))(1+m_(1)^(2))(2+m_(1)^(2)) .

The ratio of the sums of m and n terms of an A.P. is m^2 : n^2. Show that the ratio of m^(th) and n^(th) term is (2m-1) : (2n -1) .

If m_(1),m_(2) be the roots of the equation x^(2)+(sqrt(3)+2)x+sqrt(3)-1 =0 , then the area of the triangle formed by the lines y = m_(1)x,y = m_(2)x and y = 2 is