Euclid's algorithm makes it possible to find a representation (or expansion) of any rational number as a continued fraction. As elements of the continued fraction obtained by the partial quotients of successive divisions in the system of equations (1), so that the elements of the continued fraction are also called partial quotients. Furthermore, the equality of (2) show that the decomposition into a continued fraction is sequential allocation of the integer part and the fractional part of the overturning. The latter view is more general than the first, as it applies to the continued fraction expansion is not only rational, but also any real number. If you get more information, visit our site: BEST ESSAY CHEAP
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