b)
Assuming u, v, w are functions of x.
(w) = (uv)'w + (uv) w' )
 + w'(uv) )
ii) Simply let u = x^5, v = (x-1)^4, w=(x-2)^3
Then substitute it in the above equation.
c)
 = x^r (1-x)^s )
We can simply differentiate and find the point where there is a horizontal tangent, which happens to be r/(s+r)
However we can simply notice that f is a polynomial with roots 0 and 1. Depending whether r and s are even or odd, they will either be roots where the polynomial goes through them or a turning point exists on them.
Simply draw out the different cases for f and make note that there must exist some point x within 0 and 1 that a horizontal tangent exists. This is the proof.
Or you can just differentiate etc etc.
d)
So its clear that for the previous question that they expect differentiation.
So we know that
The distance from (p,0) to (0,0) is r/(s+r)
And the distance from (p,0) to (1,0) is 1-r/(s+r) = s/(s+r)
If we divide the distances then we arrive at r/s that means the distances are in ratio r : s, that means p divides interval r : s
dii)
