If a vertex of a triangle is (1, 1) and the mid-points of two side through this vertex are (-1, 2) and (3, 2), then centroid of the triangle is

If a vertex of a triangle is (1,1) , and the middle points of two sides passing through it are -2,3) and (5,2), then find the centroid of the triangle.

If a vertex of a triangle is (1,1) , and the middle points of two sides passing through it are -2,3) and (5,2), then find the centroid and the incenter of the triangle.

If a vertex of a triangle be (1,\ 1) and the middle points of the sides through it be (-2,\ 3) and (5,\ 2) , find the other vertices.

A triangle having a vertex as (1,2) has mid-point of sides passig from this vertex as (-1,1) and (2,3) thent he centroid of the triangle is

It the mid-points of the sides of triangle are (1, 2, -3), (3, 0, 1) and (2, -2, 5), then the centroid is

The area of a triangle is 3/2 square units. Two of its vertices are the points A (2, -3) and B(3,-2) , the centroid of the triangle lies on the line 3x - y -2 = 0 , then third vertex C is

Find the area of the triangle P Q R with Q(3,\ 2) and the mid-points of the sides through Q being (2,\ -1) and (1,\ 2) .

If a vertex of an equilateral triangle is the origin and the side opposite to it has the equation x+y=1, then orthocentre of the triangle is :

If the coordinates of the mid-points of the sides of a triangle are (1,\ 1),\ (2,\ -3) and (3,\ 4) , find the vertices of the triangle.

Find the area of the triangle ABC with A(1,-4) and mid-points of sides through A being (2,-1)a n d(0,-1)dot