Two particles start from the point (2,-1), one moves 2 units along the line x+y = 1 and the other moves 5 units along the line x-2y = 4. If the particles move upward w.r.t coordinates axes, then find their new positions.

Two particles start from point (2, -1), one moving two units along the line x+ y = 1 and the other 5 units along the line x - 2y = 4, If the particle move towards increasing y, then their new positions are:

Two particles start from point (2, -1), one moving two units along the line x+ y = 1 and the other 5 units along the line x - 2y = 4, If the particle move towards increasing y, then their new positions are:

Find the distance of the line 4x+7y+5=0 from the point (1,""""2) along the line 2x-y=0 .

The point (2,1) , translated parallel to the line x-y=3 by the distance of 4 units. If this new position A' is in the third quadrant, then the coordinates of A' are-

A particle from the point P(sqrt3,1) moves on the circle x^2 +y^2=4 and after covering a quarter of the circle leaves it tangentially. The equation of a line along with the point moves after leaving the circle is

A particle moves along the cirve x^(2)+4=y . The points on the curve at which the y coordinates changes twice as fast as the x coordinate, is

Three particles start from the origin at the same time, one with a velocity v_(1) along the x-axis, second along the y-axis with a velocity v_(2) and third particle moves along the line x = y. The velocity of third particle, so that three may always lie on the same line is:

A particle starts from point A , moves along a straight line path with an accleration given by a = 2 (4 - x) where x is distance from point A . The particle stops at point B for a moment. Find the distance AB (in m ). (All values are in S.I. units)

A particle of mass m is moving along the line y-b with constant acceleration a. The areal velocity of the position vector of the particle at time t is (u=0)

The centre of a circle (1, 1) and its radius is 5 units. If the centre is shifted along the line y-x = 0 through a dis-tance sqrt2 units. Find the equation(s) of the circle(s) in the new position.