| Émile Edmond Saisset - 1863 - 292 pagina’s
...xxv., p. 9. M. Havet's edition. This pensee is one of those which were not published before 1 843. to him invincibly hidden in an impenetrable secrecy....number."1 But here is the leading; idea which, in Pascal's ff adin,? , i ii -i • • iii > idea which eyes, overrules all objections more or less subtle and... | |
| Émile Saisset - 1863 - 292 pagina’s
...Art. xxv., p. 9. M. Havet's edition. This pensee is one of those which were not published before 1843. to him invincibly hidden in an impenetrable secrecy....finite number."1 But here is the leading idea which, in Pascal,s ff adin£ . i 11 i • • i 11 j ldea which eyes, overrules all objections more or less subtle... | |
| Charles William Eliot - 1910 - 468 pagina’s
...that numbers are finite, it is therefore true that there is an infinity in number. But we do not know what it is. It is false that it is even, it is false that it is odd ; for the addition of a unit can make no change in its nature. Yet it is a number, and every number... | |
| Blaise Pascal - 1910 - 468 pagina’s
...that numbers are finite, it is therefore true that there is an infinity in number. But we do not know what it is. It is false that it is even, it is false that it is odd; for the addition of a unit can make no change in its nature. Yet it is a number, and every number.... | |
| Blaise Pascal, W. F. Trotter, T. S. Eliot - 2003 - 322 pagina’s
...that numbers are finite, it is therefore true that there is an infinity in number. But we do not know what it is. It is false that it is even, it is false that it is odd ; for the addition of a unit can make no change in its nature. Yet it is a number, and every number... | |
| Timothy A. Robinson - 2002 - 452 pagina’s
...that numbers are finite, it is therefore true that there is an infinity in number. But we do not know what it is. It is false that it is even, it is false that it is odd; for the addition of a unit can make no change in its nature. Yet it is a number, and every number is... | |
| James Swindal, Harry J. Gensler - 2005 - 612 pagina’s
...that numbers are finite, it is therefore true that there is an infinity in number. But we do not know what it is. It is false that it is even, it is false that it is odd; for the addition of a unit can make no change in its nature. . . . So we may well know that there is... | |
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