Cantor–Dedekind axiom
In mathematical logic, the Cantor–Dedekind axiom is the thesis that the real numbers are order-isomorphic to the linear continuum of geometry. In other words, the axiom states that there is a one-to-one correspondence between real numbers and points on a line. This axiom is the cornerstone of analytic geometry. The Cartesian coordinate system developed by René Descartes implicitly assumes this axiom by blending the distinct concepts of real number system with the geometric line or plane into a conceptual metaphor. This is sometimes referred to as the real number line blend.
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Cantor–Dedekind axiom
In mathematical logic, the Cantor–Dedekind axiom is the thesis that the real numbers are order-isomorphic to the linear continuum of geometry. In other words, the axiom states that there is a one-to-one correspondence between real numbers and points on a line. This axiom is the cornerstone of analytic geometry. The Cartesian coordinate system developed by René Descartes implicitly assumes this axiom by blending the distinct concepts of real number system with the geometric line or plane into a conceptual metaphor. This is sometimes referred to as the real number line blend.
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Em lógica matemática, a frase ...... blema em geometria euclidiana.
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In mathematical logic, the Can ...... "axiom" is actually a theorem.
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في المنطق الرياضياتي، تنص بديه ...... جورج كانتور وريتشارد ديدكايند.
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Em lógica matemática, a frase ...... blema em geometria euclidiana.
@pt
In mathematical logic, the Can ...... as the real number line blend.
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في المنطق الرياضياتي، تنص بديه ...... جورج كانتور وريتشارد ديدكايند.
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Aksiomo de Cantor-Dedekind
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Axioma de Cantor-Dedekind
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Axioma van Cantor-Dedekind
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Cantor-Dedekinds axiom
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Cantor–Dedekind axiom
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بديهية كانتور - ديديكند
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