Cross slope

In mathematics and statistics, sums of powers occur in a number of contexts:

Sums of squares arise in many contexts.
Faulhaber's formula expresses $1^{k} + 2^{k} + 3^{k} + \dots + n^{k}$ as a polynomial in n.
Fermat's Last Theorem states that $x^{k} + y^{k} = z^{k}$ is impossible in positive integers with k>2.
Euler's sum of powers conjecture (disproved) concerns situations in which the sum of n integers, each a k^th power of an integer, equals another k^th power.
The Fermat-Catalan conjecture asks whether there are an infinitude of examples in which the sum of two coprime integers, each a power of an integer, with the powers not necessarily equal, can equal another integer that is a power, with the reciprocals of the three powers summing to less than 1.
Beal's conjecture concerns the question of whether the sum of two coprime integers, each a power greater than 2 of an integer, with the powers not necessarily equal, can equal another integer that is a power greater than 2.
The Jacobi–Madden equation is $a^{4} + b^{4} + c^{4} + d^{4} = (a + b + c + d)^{4}$ in integers.
The Prouhet–Tarry–Escott problem considers sums of two sets of k^th powers of integers that are equal for multiple values of k.
A taxicab number is the smallest integer that can be expressed as a sum of two positive third powers in n distinct ways.
The Riemann zeta function is the sum of the reciprocals of the positive integers each raised to the power s, where s is a complex number whose real part is greater than 1.
The Lander, Parkin, and Selfridge conjecture concerns the minimal value of m + n in $\sum_{i = 1}^{n} a_{i}^{k} = \sum_{j = 1}^{m} b_{j}^{k} .$
Waring's problem asks whether for every natural number k there exists an associated positive integer s such that every natural number is the sum of at most s k^th powers of natural numbers.
The successive powers of the golden ratio φ obey the Fibonacci recurrence:

φ^{n + 1} = φ^{n} + φ^{n - 1} .

Cross slope

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