Were there numbers which could be expressed as sums of greater powers?
Note that any number can be decomposed into a sum of powers of 2.
God is redefined as the sum of natural powers or processes that allows mankind to gain self-fulfillment and moral improvement.
(1 and 144 share this property) and the other is as the sum of consecutive powers of its digits:
There is an alternative possibility for computing the sum of eigenvalue powers, which is faster for small .
Bernoulli's formula for sums of powers is the most useful and generalizable formulation to date.
Faulhaber's major contribution involved calculating the sums of powers of integers.
Faulhaber's most major contribution, however, was in studying sums of powers of integers.
Academia Algebra contains a generalisation of sums of powers.
Faulhaber gave formulae for m-fold sums of powers defined as follows.