Easy Introduction to Mathematics, Volum 1Barlett & Newman, 1814 |
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Side xvii
... Ratios , Proportion , Pro- gression , Variable and Dependant Quantities , Interest , Dis- count , Permutations , Combinations , the Properties of Num- bers , & c . are Algebraically investigated , with numerous examples . Part V ...
... Ratios , Proportion , Pro- gression , Variable and Dependant Quantities , Interest , Dis- count , Permutations , Combinations , the Properties of Num- bers , & c . are Algebraically investigated , with numerous examples . Part V ...
Side 5
... ratios to their simplest form , & c . The ancient methods of notation were , however , but ill adapted to the practical operations of Arithmetic ; and hence it is that the art , with respect to its practical part , must have made but ...
... ratios to their simplest form , & c . The ancient methods of notation were , however , but ill adapted to the practical operations of Arithmetic ; and hence it is that the art , with respect to its practical part , must have made but ...
Side 12
... ratios , proportions , progressions , powers , roots , & c . in the most general and abstracted manner ; it considers them purely as numbers , and has no reference to any application or use , except that of deducing one property from ...
... ratios , proportions , progressions , powers , roots , & c . in the most general and abstracted manner ; it considers them purely as numbers , and has no reference to any application or use , except that of deducing one property from ...
Side 115
... ratio ; and when of four given numbers the first has the same ratio to the second which the third has to the fourth , these four numbers are said to be proportionals : Hence it appears , that ratio is the comparison of two numbers , but ...
... ratio ; and when of four given numbers the first has the same ratio to the second which the third has to the fourth , these four numbers are said to be proportionals : Hence it appears , that ratio is the comparison of two numbers , but ...
Side 148
... ratios in small numbers ; vanishing fractions , the properties of which are best explained by Fluxions , & c . h ... ratio to one another that their like multiples or like parts have respectively , both terms of any fraction may be ...
... ratios in small numbers ; vanishing fractions , the properties of which are best explained by Fluxions , & c . h ... ratio to one another that their like multiples or like parts have respectively , both terms of any fraction may be ...
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An Easy Introduction to the Mathematics: In Which the Theory and Practice ... Charles Butler Ingen forhåndsvisning tilgjengelig - 2016 |
Vanlige uttrykk og setninger
added Algebra answer Arithmetic Astronomy called carry ciphers coefficient column common denominator compound contained cube root cubic decimal denotes Diff difference Divide dividend division divisor drams equal equation Euclid's Elements EXAMPLES Explanation farthings former gallons Geometry given number greater greatest common measure guineas hundred improper fraction inches L. S. d latter learning least common multiple least term left hand logarithm lowest terms Mathematics Mixed Mathematics mixed number moidores Moral Evidence multiplicand Multiply namely nine number of terms OPERATION ounces pence pounds Prod Quot quotient Reduce remainder repetend result right hand figure rule shewn shews shillings simple square root subtract surd tens third thousand tion top line transpose transposition TROY WEIGHT units unknown quantity vulgar fraction whence wherefore whole number yards
Populære avsnitt
Side xxvi - Just so it is in the mind ; would you have a man reason well, you must use him to it betimes, exercise his mind in observing the connection of ideas and following them in train. Nothing does this better than mathematics, which therefore I think should be taught all those who have the time and opportunity, not so much to' make them mathematicians as to make them reasonable creatures...
Side 64 - LIQUID MEASURE 4 gills (gi.) = 1 pint (pt.) 2 pints = 1 quart (qt...
Side 114 - Then multiply the second and third terms together, and divide the product by the first term: the quotient will be the fourth term, or answer.
Side 466 - What number is that, which, being divided by the product of its digits, the quotient is 3 ; and if 18 be added to it, the digits will be inverted ? Ans.
Side 62 - Square Measure 144 square inches = 1 square, foot 9 square feet = 1...
Side 122 - State and reduce the terms as in the Rule of Three Direct. 2. Multiply the first and second terms together, and divide the product by the third ; the quotient will be the answer in the same denomination as the middle term was reduced into.
Side 252 - ... and to the remainder bring down the next period for a dividend. 3. Place the double of the root already found, on the left hand of the dividend for a divisor. 4. Seek how often the divisor is contained...
Side 450 - A hare is 50 leaps before a greyhound, and takes 4 leaps to- the greyhound's 3, but 2 of the greyhound's leaps are as much as 3 of the hare's ; how many leaps must the greyhound take to catch the hare ? Ans. 300.
Side 307 - Multiply the whole number by the numerator of the fraction, and divide the product by the denominator ; or divide the whole number by the denominator of the fraction, and multiply the quotient by the numerator.
Side 238 - ... 2. Multiply each term in the multiplicand, beginning at the lowest, by the feet in the multiplier, and write...