1. The distance s metres moved by a particle travelling in a straight line in t seconds is given by
s=45t+11t²-t³. Find the acceleration when the particle comes to rest.

2. A particle is moving in a straight line and its distance s in time t seconds is given by
s=2t³-15t²+36t-70.
Find (i) the initial velcoity, (ii) time when the velcotiy is zero and (iii) time when acceleration is zero.

3. A stone thrown upwards has its equation of motion
s=490t-4.9t² where s is in metres and t in seconds. What is the maximum height reached by the stone?

4. The area of a circular metal plate expands when heated at a certain rate. When the radius is 2cm, it is increasing at 0.01cm/second. How fast is the area increasing?

5. What is the slope of the curve y²=x at the point (1,-2)?

6. Find the angle between the curves x²=4y and y²=4x at the point of intersection other than the origin.

7. Find the equations of tangents and normals to the following curves at the given points:-
(i) y=3x²-4x at (1,-1).
(ii) xy=c² at (ct, c/t).
(iii) y(x-2)(x-3) -x + 7 = 0 at the point where it cuts the X-axis.

8. Find the equation of the normal to the curve y=2x²-3x-2 which is parallel to the straight line x+9y-11 = 0.

9. Show that the curves y² = 4(x+1) and y² = 36(9-x) cut orthogonally.

10. Prove that the curves x = y² and xy=k cut at right angles if 8k²=1.