| British Association for the Advancement of Science. Meeting - 1879 - 806 pages
...composite numbers, three contain each one prime, <fcc. The numbers at the foot of each column give the total number of primes in the group of numbers to which the column has reference ; thus between 3,000,000 and 3,100,000 there are 6676 primes; between 3,100,000 and 3,200,000 there are 6717 primes,... | |
| British Association for the Advancement of Science - 1879 - 804 pages
...composite numbers, three contain each one prime, <fec. The numbers at the foot of each column give the total number of primes in the group of numbers to which the column has reference ; thus between 3,000,000 and 3,100,000 there are 6676 primes ; between 3,100,000 and 3,200,000 there are 6717 primes,... | |
| British Association for the Advancement of Science - 1879 - 790 pages
...of composite numbers, three contain each one prime, &c. The numbers at the foot of each column give the total number of primes in the group of numbers to which the column has reference ; •-/jjzsbetween 3,000,000 and 3,100,000 there are 6676 primes; between 3,100,000 and 3.200,000 there... | |
| James Glaisher - 1880 - 140 pages
...contains one prime, four contain each two primes, and so on. The numbers at the foot of each column give the total number of primes in the group of numbers to which the column has reference: thus, for example, between 4,900,000 and 4,910,000 there are 651 primes. The results for the whole million... | |
| British Association for the Advancement of Science - 1882 - 1050 pages
...of composite numbers), there are three centuries which contain one prime, fourteen which contain two primes, &c., and so on. The number at the foot of...primes in the group of numbers to which the column relates ; thus, for example, there are 6,458 primes between 5,000,000 and 5,100,000. ** 0 1 2 3 4 5... | |
| British Association for the Advancement of Science. Meeting - 1879 - 808 pages
...of composite numbers, three contain each one prime, &c. The numbers at the foot of each column give the total number of primes in the group of numbers to which the column has reference ; Sins between 3,000,000 and 3,100,000 there are 6676 primes; between 3100000 and 3,200,000 there are... | |
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