Question

If a, b, c are positive such that `ab^2c^3 = 64` then the least value of `(1/a + 2/b + 3/c)` is?

A) `6`
B) `2`
C) `3`
D) `32`

Answer 1

I got C

Explanation:

Note that `64 = (2^3)(2^2)(2)`, but this would mean that `a = b = c` which is not stated in the question.

`a/2 + b/2 + c/2 = 1/2 + 2/2 + 3/2 = 2 +1 = 3`

Please let me know if this is the desired answer.

Hopefully this helps!

Answer 2

See below.

Explanation:

Using inequalities

`1/n sum_(k=1)^n x_k ge (prod_(k=1)^n x_k)^(1/n)` now making

`x_k=cdots=x_j=u`, `m` times,
`x_(j+1)=cdots=x_xi = v`, `p` times,
`x_(xi+1)=cdots=x_n = w`, `q` times,

we get to a particular case

`1/(m+p+q)(m u+pv+qw) ge (u^m v^p w^q)^(1/(m+p+q))`

now making

`u=1/a, v=1/b,w=1/c` we have

`1/6(1/a+2/b+3/c) ge (1/(a b^2 c^3))^(1/6)= (1/64)^(1/6)=1/2` and finally

`1/a+2/b+3/c ge 3`