each stroke it makes upon its own bell: and let the clock B by a similar contrivance advance the hand of the clock A one division, for each stroke it makes on its own bell. With such an arrangement, having set the hand of the clock A to the division I., that of B to III., and that of C to II., let the reader imagine the repeating parts of the clocks to be set in motion continually in the following order: viz.—pull the string of clock A; pull the string of clock B; pull the string of clock C.
The table on the following page will then express the series of movements and their results.
larger engine. The ease and precision with which it works, leave no room to doubt its success in the more extended form. Besides tables of squares, cubes, and portions of logarithmic tables, it possesses the power of calculating certain series whose differences are not constant; and it has already tabulated parts of series formed from the following equations:
Δ3ux = units figure of Δ ux
Δ3ux = nearest whole No. to (110,000Δ ux)
The subjoined is one amongst the series which it has calculated:
0 | 3,486 | 42,972 |
0 | 4,991 | 50,532 |
1 | 6,907 | 58,813 |
14 | 9,295 | 67,826 |
70 | 12,236 | 77,602 |
230 | 15,741 | 88,202 |
495 | 19,861 | 99,627 |
916 | 24,597 | 111,928 |
1,504 | 30,010 | 125,116 |
2,340 | 36,131 | 139,272 |
The general term of this is,
ux = x·x–1·x–21·2·3 + the whole number in x10 + 10Σ3(units figure of x·x+12)