A System of Arithmetic: Reprinted from the Mathematical Text-book |
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Page 18
... EXAMPLES . ( 1 ) ( 2 ) ( 3 ) From 3287625 Take 2343756 From 5327467 Take 1008438 From 1234567 Take 345678 Rem . 943869 Remain . 4319029 Remain . 888889 Proof 3287625 Proof 5327467 Proof 1234567 of the parts is equal to the whole , so ...
... EXAMPLES . ( 1 ) ( 2 ) ( 3 ) From 3287625 Take 2343756 From 5327467 Take 1008438 From 1234567 Take 345678 Rem . 943869 Remain . 4319029 Remain . 888889 Proof 3287625 Proof 5327467 Proof 1234567 of the parts is equal to the whole , so ...
Page 22
... examples are subjoined to make the reason of the rule appear as plain as possible . ( 1 ) 37565 5 ( 2 ) 1375435 4567 plicand . ] 25F 5X5 30 = 60X5 25 - 500X5 = 9628045 8252610 = 60 times 6877175 7 times the multi- do . 500 times do . 35 ...
... examples are subjoined to make the reason of the rule appear as plain as possible . ( 1 ) 37565 5 ( 2 ) 1375435 4567 plicand . ] 25F 5X5 30 = 60X5 25 - 500X5 = 9628045 8252610 = 60 times 6877175 7 times the multi- do . 500 times do . 35 ...
Page 23
... EXAMPLES . 164197512178 Product . ( 2 ) Multiply 32745654478 by 234 130982617892 98236963419 65491308946 Product 7662483146682 EXAMPLE . 4215 3 excess of 9s in the multiplicand . 878 5 ditto in the multiplier . 33720 29505 33720 3700770 ...
... EXAMPLES . 164197512178 Product . ( 2 ) Multiply 32745654478 by 234 130982617892 98236963419 65491308946 Product 7662483146682 EXAMPLE . 4215 3 excess of 9s in the multiplicand . 878 5 ditto in the multiplier . 33720 29505 33720 3700770 ...
Page 24
... EXAMPLES . 1. Multiply 1234500 by 7500 . 12345 75 61725 86415 9258750000 the Product . 2. Multiply 461200 by 72000 . Ans . 33206400000 . 3. Multiply 815036000 by 70300. Ans . 57297030800000 . II . When the multiplier is the product of ...
... EXAMPLES . 1. Multiply 1234500 by 7500 . 12345 75 61725 86415 9258750000 the Product . 2. Multiply 461200 by 72000 . Ans . 33206400000 . 3. Multiply 815036000 by 70300. Ans . 57297030800000 . II . When the multiplier is the product of ...
Page 25
Reprinted from the Mathematical Text-book Samuel Webber. EXAMPLES . i . Multiply 123456789 by 25 . 123456789 5 ... example the second , 7 times the product of 8 , multiplied into the given number , makes 56 times that given number , as ...
Reprinted from the Mathematical Text-book Samuel Webber. EXAMPLES . i . Multiply 123456789 by 25 . 123456789 5 ... example the second , 7 times the product of 8 , multiplied into the given number , makes 56 times that given number , as ...
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A System of Arithmetic: Reprinted From the Mathematical Text-Book (Classic ... Samuel Webber No preview available - 2016 |
A System of Arithmetic: Reprinted from the Mathematical Text-Book Samuel Webber No preview available - 2016 |
Common terms and phrases
2qrs 3qrs amount of 11 annuity annum answer required arithmetical Arithmetical Progression bushel called carats cent common difference compound fraction compound interest contained cube root cyphers debt decimal DEMONSTRATION discount Divide dividend division divisor equal equated equivalent evident EXAMPLES farthings fourth gallon Geometrical Progression geometrical series given number gold greater greatest common measure gross improper fraction inches integer last term least common multiple less number manner method of proof miles mixed number months multiplicand Multiply NOTE number of combinations number of places number of terms number of things payment pence pound present worth principal proportion quantities question quotient ratio Reduce remainder repetend Rule of Three shillings Signifies simple interest square root subtract supposition taken tare tion trett TROY WEIGHT vulgar fraction weight whole number yards year's interest
Popular passages
Page 66 - Operations with Fractions A) To change a mixed number to an improper fraction, simply multiply the whole number by the denominator of the fraction and add the numerator.
Page 159 - Multiply the divisor, thus augmented, by the last figure of the root, and subtract the product from the dividend, and to the remainder bring down the next period for a new dividend.
Page 199 - RULE.* — Multiply each payment by the time at which it is due; then divide the sum of the products by the sum of the payments, and the quotient will be the true time required.
Page 141 - As the sum of the several products, Is to the whole gain or loss ; So is each man's particular product, To his particular share of the gain or loss.
Page 92 - Let the farthings in the given pence and farthings possess the second and third places ; observing to increase the second place or place of hundredths, by 5" if the shillings be odd; and the third place by 1 when the farthings exceed 12, and by 2 when they exceed 36.
Page 225 - ... is to the difference between the true and second supposed number ; when that is not the case, the exact answer to the question cannot be found by this rule.
Page 133 - A wall to be built to the height of 27 feet, was raised to the height of 9 feet by 12 men in 6 days : how many men must be employed to finish the wall in 4 days at the same ruts.- of working 1 31.
Page 170 - To the remainder bring down the first figure in the next period, and call it the dividend. 4. Involve the root to the next inferior power to that which is given, and multiply it by the number denoting the given power, for u divisor.
Page 170 - Bring doion the first figure of the next period to the remainder for a new dividend, to which find a new divisor, as before; and in like manner proceed till the whole is finished.
Page 112 - Multiply the second and third terms together, and divide their product by the first term; and the quotient will be the answer to the question, in the same denomination you left the second term in, which may be brought into any other denomination required.