i) F = Au^3 + B/u
You wish to find the value of u that minimises F (the fuel used in a given amount of time), which is equivalent to maximising the time taken given a fixed amount of fuel.
dF/du = 3Au^2 - B/u^2
setting dF/du = 0,
3Au^4 = B,
u = (B/3A)^(1/4) km/h
ii) In this case, you wish to maximise u/F. The quantity u/F is proportional to the distance travelled (it's the distance travelled, multiplied by the amount of fuel used which you take as a fixed constant in this part).
d(u/F)/du = du/du * 1/F + u*d(1/F)/du (using chain rule)
= 1/(Au^3 + B/u) + u * d/du (1/(Au^3 + B/u))
= 1/(Au^3 + B/u) + u*(-1/(Au^3 + B/u)^2 * (3Au^2 - B/u^2))
setting d(u/F)/du = 0,
1/(Au^3 + B/u) = u * (1/(Au^3 + B/u)^2) * (3Au^2 - B/u^2))
Au^2 + B/u^2 = 3Au^2 - B/u^2
2Au^2 = 2B/u^2
u^4 = B/A
u = (B/A)^(1/4)
= (B/3A)^(1/4) * 3^(1/4)
~ 1.32 (B/3A)^(1/4)
So the plane should fly ~ 1.32 times as fast as the answer given in i), so that the distance is maximised.
