Key to System of practical mathematics. 2 pt. No.xvii |
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Side 107
... end of the same , the population at the end of a year is to that at its beginning as 103 : 100 ; if we then put n for the population at any time , the population a year before 100n 103 that time would be ; and since 103 : 100 :: ( 100 ) ...
... end of the same , the population at the end of a year is to that at its beginning as 103 : 100 ; if we then put n for the population at any time , the population a year before 100n 103 that time would be ; and since 103 : 100 :: ( 100 ) ...
Side 108
... 500-86416 , being divided by the tabular number , will give the annuity = 33-333 - L.33 , 6s . 8d . sought ; or 500-864166 15.025805 END OF KEY TO PART FIRST . No . XVII . PART II . KEY TO SYSTEM 103 KEY - EXERCISES IN ALGEBRA .
... 500-86416 , being divided by the tabular number , will give the annuity = 33-333 - L.33 , 6s . 8d . sought ; or 500-864166 15.025805 END OF KEY TO PART FIRST . No . XVII . PART II . KEY TO SYSTEM 103 KEY - EXERCISES IN ALGEBRA .
Side 65
... ends . 118 , whole surface . = 49 , the solidity . 433013 , page 67 . Multiply by 22— = 4 1.732052 2 12 × 2 × 3 = 75 . 3-464104 , surface of the ends . surface of the sides . 78-464104 , whole surface . 1-732052 × 121 = 21-65065 ...
... ends . 118 , whole surface . = 49 , the solidity . 433013 , page 67 . Multiply by 22— = 4 1.732052 2 12 × 2 × 3 = 75 . 3-464104 , surface of the ends . surface of the sides . 78-464104 , whole surface . 1-732052 × 121 = 21-65065 ...
Side 66
... end . 2 144 ) 628-734392 , area of both ends . 4-366211 sq . feet . = 20-625 Area of an end Mult . by the height = area of sides . 24.991211 , whole surface . 2.183105 331 4 416.549315 1-637329 6.549315 8-186644 , solidity . 4.828427 ...
... end . 2 144 ) 628-734392 , area of both ends . 4-366211 sq . feet . = 20-625 Area of an end Mult . by the height = area of sides . 24.991211 , whole surface . 2.183105 331 4 416.549315 1-637329 6.549315 8-186644 , solidity . 4.828427 ...
Side 67
... end . 2 14.1372 , area of both ends . = 70-6860 , curved surface . 84-8232 , whole surface . 7 · 0686 Area of an end as above Multiply by the height , ( 2. ) 3.1416x5x30 ** 7854 × 5 × 5 7 3.5343 49.4802 53-0145 , solidity . = 471 · 24 ...
... end . 2 14.1372 , area of both ends . = 70-6860 , curved surface . 84-8232 , whole surface . 7 · 0686 Area of an end as above Multiply by the height , ( 2. ) 3.1416x5x30 ** 7854 × 5 × 5 7 3.5343 49.4802 53-0145 , solidity . = 471 · 24 ...
Vanlige uttrykk og setninger
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Populære avsnitt
Side 74 - If two triangles have two angles of the one equal to two angles of the other, each to each, and one side equal to one side, viz.
Side 75 - If the vertical angle of a triangle be 'bisected 'by a straight line which also cuts the base, the rectangle contained by the sides of the triangle is equal to the rectangle contained by the segments of the base, together with the square on the straight line which bisects the angle.
Side 9 - Let x measure у by the units in n, then it will measure cy by the units in nc. 2d. If a quantity measure two others, it will measure their sum or difference. Let a be contained...
Side 15 - ... sin(a + b + c). Again (a) represents the coarse ROM, and bands b and c are two controls of the fine-tuned ROMs so that a < 90°, b < 90 • 2~a and c < 90 • 2~(a + 6). This is shown in Fig. 7-7. Sunderland showed that the trigonometric identity can be written as sin(a + b + c) = sin(a + 6) cos c + cos a cos b sin...
Side 10 - The truth of this rule depends upon these two principles ; 1". If one quantity measure another, it will also measure any multiple of that quantity. Let x measure y by the units in n, then it will measure cy by the units in nc.
Side 139 - Arc, on the Sine and Cosine of an Arc in terms of the Arc itself, and a new Theorem for the Elliptic Quadrant.
Side 137 - The differential of the logarithm of a function is equal to the differential of the function, divided by the function itself.
Side 149 - The pyramid may be conceived to be made up of an infinite number of planes parallel to ABC.
Side 81 - ... sum of any number of quantities is equal to the sum of the corresponding functions of each of these quantities, will be called distributive
Side 86 - We thus derive the following method for multiplying two binomials which have a common first term : The first term of the product is the square of the common first terms of the binomials.