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Bézout's identity guarantees that for any integers a and b not both zero, there exist integers x and y such that ax + by = d, where d is their greatest common divisor.
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Bézout's identity guarantees that for any integers a and b not both zero, there exist integers x and y such that ax + by = d, where d is their greatest common divisor.
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Related words
Bézout's identity
Proper noun
Japanese Meaning
数学における定理であり、任意の整数 a, b(ただし a と b が同時に 0 でない場合)に対して、最大公約数 d を求めると、d は整数 x, y を用いた線形結合 ax + by として表されるという主張です。
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