For positive l, m and n, if the points `x=ny+mz, y=lz+nx, z=mx+ly` intersect in a straight line, when
Q. l, m and n satisfy the equation

A man is standing at point (x=5m, y=0) . Then be walks along staight line to (x=0 , y=5m) . A second man walks from the same initial position along the x-axis to the arigin and then along the y-axis to (x=0, y=5m) . Mark the correct statement(s) :

Two parabolas C and D intersect at two different points, where C is y =x^2-3 and D is y=kx^2 . The intersection at which the x value is positive is designated Point A, and x=a at this intersection the tangent line l at A to the curve D intersects curve C at point B , other than A. IF x-value of point B is 1, then a equal to

Find the potential energy of the gravitational interation of a point mass of mass m and a thin uniform rod of mass M and length l, if they are located along a straight line such that the point mass is at a distance 'a' from one end. Also find the force of their interaction.

Find the equation to the pair of straight lines joining the origin to the intersections oi the straight line y=mx + c and the curve x^2 + y^2=a^2 . Prove that they are at right angles if 2c^2=a^2(1+m^2) .

l, m and n are three parallel lines intersected by transversals р and q such that l , m and n cut off equal intercepts AB and BC on p (see the given figure). Show that l, m and n cut off equal intercepts DE and EF on q also.

If the straight lines joining origin to the points of intersection of the line x+y=1 with the curve x^2+y^2 +x-2y -m =0 are perpendicular to each other , then the value of m should be

A continuous stream of particles, of mass m and velocity r , is emitted from a source at a rate of n per second. The particles travel along a straight line, collide with a body of mass M and get embedded in the body. If the mass M was originally at rest, its velocity when it has received N particles will be

The plane x-y-z=4 is rotated through an angle 90^(@) about its line of intersection with the plane x+y+2z=4 . Then the equation of the plane in its new position is

Two masses m_(1) and m_(2) concute a high spring of natural length l_(0) is compressed completely and tied by a string. This system while conving with a velocity v_(0) along +ve x-axis pass thorugh the origin at t = 0 , at this position the string sanps, Position of mass m_(1) at time t is given by the equation x_(1)t = v_(0)(A//1-cosomegat) . Calculate (i) position of the particle m_(2) as a funcation of time, (ii) l_(0) in terms of A.

If f^(prime)(x)=|m x m x-p m x+p nn+p n-p m x+2n m x+2n+p m x+2n-p| , then y=f(x) represents 1.a straight line parallel to x-axis 2.a straight line parallel to y-axis 3.parabola a straight line with negative slope