In Lang's Algebra, pg 95 (3rd Revised Ed.), he concludes a proof on the Chinese Remainder Theorem with:
In the same vein as above, we observe that if $\mathfrak{a_1},\dots,\mathfrak{a_n}$ are ideals of a ring $A$ such that $$ \mathfrak{a_1}+ \dots + \mathfrak{a_n}=A,$$ and if $\mathit{v_1},\dots,\mathit{v_n}$ are positive integers, then $$\mathfrak{a_1}^\mathit{v_1}+\dots+\mathfrak{a_n}^\mathit{v_n}=A.$$
He states the proof is a trivial consequence of the CRT. However, I have been unable to find one that is satisfactory. I can see that there is a set of elements, one from each ideal which sum to 1. I am at a loss to see how we can find such a set that satisfies the above claim.
