18.022 EIGHTH HOMEWORK

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1. (10 pts) (4.2.1)
2. (5 pts) (4.2.6)
3. (5 pts) (4.2.8)
4. (10 pts) (4.2.22)
5. (10 pts) (4.2.23)
6. (5 pts) (4.2.33)
7. (5 pts) (4.2.46(b))
8. (20 pts) We will show in this problem that amongst all boxes with
surface area a, the volume is a maximum if and only if the box is a
cube. Let
V : R3 −→ R,
be the function V (x, y, z) = xyz. Then we want to maximise V on the
set A of all points where x > 0, y > 0, z > 0 and 2(xy + yz + zx) = a.
(i) Show that there is a unique point P ∈ A where V has a constrained
critical point.
Let K ⊂ A be the subset of points (x, y, z) where
√a √a √a
x ≥ 3
√6 y ≥ 3
√6
and z ≥ 3
√6
.
(ii) Show that if Q ∈ A − K (so that Q is in A but not K) then
V (Q) < V (P).
(iii) Show that K is compact.
(iv) Show that V has a maximum on K at P.
(v) Show that V has a maximum on A at P.
8. (10 pts) (4.3.2)
9. (10 pts) (4.3.8)
10. (10 pts) (4.3.18)
Just for fun: What is the value of the limit:
sin(tan x) − tan(sin x) lim . x 0 sin−1
(tan−1(x)) − tan−1(sin−1 → (x))
1
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18.022 Calculus of Several Variables