ABC is a triangle in a plane with vertices A(2, 3, 5), B(-1, 3, 2) and `C(lambda, 5, mu)`. If the median through A is equally inclined to the coordinate axes, then the value of `(lambda^(3)+mu^(3)+5)` is:

A=(2,3,5), B(-1,3,2), C=(lambda,5,mu) are the vertices of a triangle. If the median AM is equally inclined to the coordinate axes, then (lambda,mu) =

Let A (2,3,5) , B ( -1,3,2) and C( lambda ,5, mu ) be the vertices of a Delta ABC , If the median through A is equally inclined to the coodinate axes, then

Let ABC be a triangle with vertices at points A( 2,3,5 ), B ( -1,3,2) and ( lambda , 5, mu ) in three dimensional space. If the median through A is equally inclined with the axes , then (lambda , mu ) is equal to

Let ABC be a triangle with A(alpha, 5, beta), B(-2,1,6) and C(1, 0, -3) as its vertices. If the median through B is equally inclined to the coordinate axes, then alpha+beta=

Find the area of the tirangle with vertices A (1,1,2),B (2,3,5) and C(1,5,5).

In Delta ABC, if the median AD drawn through A is perpendicular to the side AC, then 3ca cos A cos C + 2a^(2) =

A plane passing through (1, 2, 3) and whose normal makes equal angles with the coordinate axes is