`A(-3, 0), B(10, -2) and C(12, 3)` are the vertices of `triangleABC`. Find the equation of the altitude through A and B.

A(-3,0),B(1,3),C(2,-1) are the vertices of triangleABC . Then the equation of the altitude from A to BC is :

The vertices of triangle ABC are A (-2, 3), B (2, -3) and C (4,5) i. Find the slope of BC. ii. Find the equation of the altitude of triangle ABC passing through A.

A (2, 5), B (-1, 3) and C (5, -1) are the vertices of a triangle. The image of the point (1,2) with respect to the median through A is

If A(-2, -1), B(a, 0), C(4, b) and D(1, 2) are the vertices of a parallelogram, find the values of a and b.

If A(1,-1), B(0,4), C(-5,3) are vertices of a triangle, then find the slope of each side.

The vertices of a triangleABC are (1,4)(3,5) and (-1,0) then its centroid is :

Consider the points A(2,3) and B (4,5) i. Find the slope of the line passing through the points A and B. ii. Find the equation of the line passing through A and B. iii. Find the x-intercept of the above line.

If the coordinates of the vertices of triangle A B C are (-1,6),(-3,-9) and (5,-8) , respectively, then find the equation of the median through Cdot