## Triangle relation

Prove that in any triangle it holds that

## Convergence of series

Let denote the greatest prime factor of . For example , . Define . Examine if the sum

converges.

## On a prime summation

Let denote the – th prime. Evaluate the sum

## Square summable

Let be a real sequence such that

If is a real sequence that is square summable; i.e the sequence converges.

Prove that is also square summable.

Solution

Let be defined as

where . We note that

Equality holds when . Hence, . From the hypothesis, it follows that is pointwise bounded. It follows from the Uniform boundedness principle ( Banach – Steinhaus ) that are bounded. Hence, is square summable.

## The integral domain is a field

Prove that an integral domain with the property that every strictly decreasing chain of ideals must be finite in length is a field.