The d.r's of two parallel lines are 4, - 3, -1 and `lambda + mu, 1 + mu,2`. Then `(lambda,mu)` is

The d.r.s of two perpendicular lines are 1,-3,5 and lambda,1 + lambda,2 + lambda then lambda is

The volume of the parallelopiped whose sides ae OA = (lambda + 2) i + (lambda + 2) (lambda + 1) j + k. OB (lambda + 3) I + (lambda + 2) (lambda + 3) j + k and OC = (lambda + 4) i + (lambda + 3) (lambda + 4) j + k is

The volume of the parallelopiped whose sides are OA = (lambda + 1) i + lambda (lambda + 1) j + k , OB = (lambda + 2)i + (lambda + 1) (lambda + 2) j + k, OC = (lambda + 3) I + (lambda + 2) (lambda + 3) j + k is

The cartesian equation of the plane whose vector equation is r = (1 + lambda - mu) i + (2 - lambda) j + (3- 2 lambda + 2mu)k , where lambda, mu are scalars, is

If a = I + j + k, b = i+ j, c = I and (a xx b) xx c = lambda a + mu b , then lambda + mu =

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:

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

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) =