The origin 'O' is the centroid of ABC in which `A(-4,3) B(3,k) and C(h,5).` Find h and k.

Find the value of k if the points A(2, 3), B(4,k) and C(6, -3) are collinear.

The vertices of a triangle are (1,2), (h-3), and (-4,k). If the centroid of triangle is at the points (5,-1) then find the value of sqrt((h+k)^(2)+(h+3k)^(2))

The vertices of a triangle are (1,2),(h-3) and (-4,k) . If the centroid of the triangle is at the point (5,-1) then find value of sqrt((h+k)^(2) + (h+3k)^(2))

The centroid of a triangle ABC is at the point (1,1,1) . If the coordinates of A and B are (3,-5,7) and (-1,7,-6) , respectively, find the coordinates of the point C.

Let ABC be a triangle whose centroid is G, orhtocentre is H and circumcentre is the origin 'O'. If D is any point in the plane of the triangle such that no three of O, A, C and D are collinear satisfying the relation vec(AD) + vec(BD) + vec(CH ) + 3 vec(HG)= lamda vec(HD) , then what is the value of the scalar 'lamda' ?

Prove that the straight lines joining the origin to the point of intersection of the straight line h x+k y=2h k and the curve (x-k)^2+(y-h)^2=c^2 are perpendicular to each other if h^2+k^2=c^2dot

Use the factor theorem to find the value of k for which (a+2b),w h e r ea ,b!=0 is a factor of a^4+32 b^4+a ^3b(k+3)dot

ABC is a triangle whose vertices are A(3,4) B(-2,-1) and C(5,3). If G is the centroid and BDCG is a parallelogram then find the coordinates of the vertex D.