Can the existence of a mathematical entity be proved without defining it ?
Logic merely sanctions the conquests of the intuition. - Jacques Hadamard
Logic merely sanctions the conquests of the intuition.
- Jacques Hadamard
The shortest path between two truths in the real domain passes through the complex domain. - Jacques Hadamard
The shortest path between two truths in the real domain passes through the complex domain.
The object of mathematical rigor is to sanction and legitimize the conquests of intuition, and there was never any other object for it. - Jacques Hadamard
The object of mathematical rigor is to sanction and legitimize the conquests of intuition, and there was never any other object for it.
Practical application is found by not looking for it, and one can say that the whole progress of civilization rests on that principle. - Jacques Hadamard
Practical application is found by not looking for it, and one can say that the whole progress of civilization rests on that principle.
To parents who despair because their children are unable to master the first problems in arithmetic I can dedicate my examples. For, in arithmetic, u… - Jacques Hadamard
To parents who despair because their children are unable to master the first problems in arithmetic I can dedicate my examples. For, in arithmetic, u…
Can the existence of a mathematical entity be proved without defining it ? - Jacques Hadamard
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