The incenter of the triangle with vertices (1, `sqrt3`), (0, 0), and (2,0) is

The circumcentre of the triangle with vertices (0,30),(4,0)and(30,0) is

Find the lengths of the medians of the triangle with vertices A(0,0,6), B(0,4,0) and C(6,0,0) .

Find the lengths of the medians of the triangle with vertices A(0,0,6), B(0,4,0) and C(6,0,0)

If the medians from A and B of the triangle with vertices A(0, b), B(0,0) and C(a, 0) are mutually perpendicular then show that a=+- sqrt2 b

Find the area of the triangle with vertices at (1,0),(6,0),(4,3) using determinants.

Using integration , find the area of the region bounded by the triangle whose vertices are (-1,0),(1,3) and (3,2).

Prove that the triangle with vertexes '(0,0),(10,0)' and '(5,5 sqrt3)' is equilateral.

Consider the triangle with vertices (0,7,-10) , (1,6,-6) and (4,9,-6) Find the centroid of the triangle.

Consider the triangle ABC with vertices A(1,2,3),B(-1,0,4),C(0,1,2) Find vec(AB) and vec(AC) .

Consider the triangle with vertices (0,7,-10) , (1,6,-6) and (4,9,-6) Prove that the triangle is right triangle.