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A formula for computing the trigonometric identities for the one-third angle exists, but it requires finding the zeroes of the cubic equation 4x 3 − 3x + d = 0, where is the value of the cosine function at the one-third angle and d is the known value of the cosine function at the full angle.
Exponentiating this equation yields Euler's formula. Note that the logarithmic statement is not universally correct for complex numbers, since a complex logarithm can have infinitely many values, differing by multiples of 2πi. Visualization of Euler's formula as a helix in three-dimensional space.
Define the Hadamard canonical factors ():= = / Entire functions of finite order have Hadamard's canonical representation: [1] = = (/) where are those roots of that are not zero (), is the order of the zero of at = (the case = being taken to mean ()), a polynomial (whose degree we shall call ), and is the smallest non-negative integer such that ...
where all elements having a factor of 3 or 2 (or both) are removed. It can be seen that the right side is being sieved. Repeating infinitely for 1 p s {\displaystyle {\frac {1}{p^{s}}}} where p {\displaystyle p} is prime, we get:
If s is a negative even integer, then ζ(s) = 0, because the factor sin(π s/2) vanishes; these are the zeta function's trivial zeros. (If s is a positive even integer this argument does not apply because the zeros of the sine function are canceled by the poles of the gamma function as it takes negative integer arguments.)
The equation relates values of the Riemann zeta function at the points s and 1 − s, in particular relating even positive integers with odd negative integers. Owing to the zeros of the sine function, the functional equation implies that ζ(s) has a simple zero at each even negative integer s = −2n, known as the trivial zeros of ζ(s).
Since for even values of s the Riemann zeta function ζ(s) has an analytic expression in terms of a rational multiple of π s, then for even exponents, this infinite product evaluates to a rational number. For example, since ζ(2) = π 2 / 6 , ζ(4) = π 4 / 90 , and ζ(8) = π 8 / 9450 , then
It is clear that any finite set {} of points in the complex plane has an associated polynomial = whose zeroes are precisely at the points of that set. The converse is a consequence of the fundamental theorem of algebra: any polynomial function () in the complex plane has a factorization = (), where a is a non-zero constant and {} is the set of zeroes of ().