Determine the distance between two points :
a. 'P' and 'Q' where 'P' is at 2 and 'Q' is at 9.
b. 'R' and 'S' where 'R' is 6 m away from point 0 towards right and 'S' is 6 m away from point 0 towards left.

Use absolute value concept to find the distance between : a. two points 'S' and 'T' such that, point 'S' is 9 m away from the origin towards right and point 'T' is 2 m away from the origin in the opposite direction. b. the points : 26 and -17.

Find the distance between the two points on a number line such that, point 'A' is 9 m away from the origin towards left and point 'B' is 2 m away, also in the same direction.

A particle is in linear S.H.M. between two points A and B, 10 cm apart. Take the direction from A to B as the positive direction and give the signs of velocity, acceleration and force on the particle when it is. (a) at the end A (b) at the end B, (c) at the mid point of AB going towards A, (d) at 2 cm away from B going towards A, (e) at 3 cm away from A goiing towards B, and (f) at 4 cm away from A going towards A.

A particle is in linear S.H.M. between two points A and B, 10 cm apart. Take the direction from A to B as the positive direction and give the signs of velocity, acceleration and force on the particle when it is. (a) at the end A (b) at the end B, (c) at the mid point of AB going towards A, (d) at 2 cm away from B going towards A, (e) at 3 cm away from A goiing towards B, and (f) at 4 cm away from A going towards A.

Find the coordinates of points P ,\ Q ,\ R\ a n d\ S in Figure.

Find potential at a point 'P' at a distance 'x' on the axis away from centre of a uniform ring of mass M and radius R .

A car moving with constant acceleration covered the distance between two points 60.0 m apart in 6.00 s. Its speed as it passes the second point was 15.0 m//s. (a) What is the speed at the first point? (b) What is the acceleration? (c) At what prior distance from the first was the car at rest?

The distance of two points P and Q on the parabola y^(2) = 4ax from the focus S are 3 and 12 respectively. The distance of the point of intersection of the tangents at P and Q from the focus S is

If the tangents at points P and Q of the parabola y^2 = 4ax intersect at R then prove that midpoint of R and M lies on the parabola where M is the midpoint of P and Q

If the tangents at points P and Q of the parabola y^2 = 4ax intersect at R then prove that midpoint of R and M lies on the parabola where M is the midpoint of P and Q