| Charles Hutton - 1812 - 620 sider
...equal to the product of the two means. Thus, in the four 2, 4, 3, 6, it is 2 X 6 = 3 x 4 = 12. And hence, if the product of the two means be divided by one of the extremes, the quotient will give the other extreme. So, of the above numbers, the product of... | |
| Charles Hutton - 1822 - 616 sider
...equal to the product of the two mean?. Thus, in the four 2, 4, 3, 6, it is 2 X fi = 3 X 4 = 12. And hence, if the product of the two means be divided by one of the extremes, the quotient will give the other extreme. So, of the above numbers, the product of... | |
| Zadock Thompson - 1826 - 176 sider
...product of the two means is equal to the product of the extremes, it is plain that if the product of the means be divided by one extreme, the quotient will be the other extreme ; thus 14x12=168, product of means, and 168-f2=84, the other extreme, which is precisely the rule.... | |
| Oliver Byrne - 1851 - 310 sider
...be equal to the product of the two means. Thus, in the four 2, 4, 3, 6 it is 2 x 6 = 3 x 4 = 12. And hence, if the product of the two means be divided by one of the extremes, the quotient will give the other extreme. So, of the above numbers, the product of... | |
| John Fair Stoddard - 1852 - 320 sider
...The product of the means is equal to the product of the extremes. Therefore. 2. If the product of the means be divided by one extreme, the quotient will be the other extreme. Or, 3. If the product of the extremes be divided by one mean, the quotient will be the other mean.... | |
| John Fair Stoddard - 1856 - 312 sider
...The product of the means is equal to the product of the extremes. Therefore, 2. If the product of the means be divided by one extreme, the quotient will be the other extreme. Or, 3. If the product of the extremes be divided by one mean, the quotient will be the other mean.... | |
| William Harding Girdlestone - 1867 - 368 sider
...the product of the means. From this it follows as a necessary consequence that if the product of the means be divided by one extreme, the quotient will be the other extreme; or if the product of the extremes be divided by one mean, the quotient will be the other mean. It is... | |
| Thomas Liddell Ainsley - 1880 - 866 sider
...4 : 6 4 :: 18 : 6 193. From this it follows, as a necessary consequence, that if the product of the means be divided by one extreme, the quotient will be the other extreme. Thue, 18 : 6 :: ix : 4 Aho, if the produet of the extremes be divided by one mean, the quotient will... | |
| William Estabrook Chancellor - 1901 - 152 sider
...4:9 = 20:45. | = fg If in a proportion any term is lacking, it may be found. 1. If the product of the means be divided by one extreme, the quotient will be the other extreme. 2. If the product of the extremes be divided by one mean, the quotient will be the other mean. ч ,... | |
| William Estabrook Chancellor - 1902 - 264 sider
...4:9 = 20:45. | = f| If in a proportion any term is lacking, it may be found. 1. If the product of the means be divided by one extreme, the quotient will be the other extreme. 2. If the product of the extremes be divided by one mean, the quotient will be the other mean. 2d term... | |
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