Figure shows path of two projectiles A and B choose the correct options(s):
Given `U_(x)`=Initial velocity along horizontal `U_(y)`=Initial velocity along y-axis.

An aeroplane moves along horizontal line AB as shown in figure Choose correct option about wind velocity.

At the start of a motion along a line the initial velocity is u and acceleration is at. The final velocity vafter time t, is

Three particles A,B and C start from the origin at the same time, A with a velocity a along x -axis, B with a velocity b along y -axis and C with velocity c in XY plane along the line x=y .The magnitude of c so that the three always remain collinear is:

What will be the equation for the path of a projectile if it is fired with initial velocity of (2hati+3hatj) . Here hatu and hatj are unit vectors along X-axis and Y-axis (g=10ms^(-2)) .

The velocity of a projectile at the initial point A is (2 i+3 j)m/s .Its velocity (in m/s ) at point B is

Given that u_(x) = horizontal component of initial velocity of a projectile, u_(y) = vertical component of initial velocity, R = horizontal range, T = time of flight and H = maximum height of projectile. Now match the following two columns.

A particle starts with some initial velocity with an acceleration along the direction of motion. Draw a graph depicting the variation of velocity (v) along y-axis with the variation of displacement(s) along x-axis.

Three particles start from the origin at the same time, one with velocity u_1 along the x-axis, the second with velocity u_2 along the y-axis . Find the velocity of the third particles, along the x=y line so that the three particles may always lie on the same straight line.