The Most General School-assistant: Containing, a Complete System of Arithmetic: the Common and Useful Problems in Practical Geometry: the Methods Used in Taking the Dimensions of Artificers Work: Mensuration of All Kinds of Superficies and Solids, of Artificers Work, of Timber, and of Land: Together with Guaging, Bills of Parcels, &c. &c |
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Page 3
... added Column , and carry the Units to the next , and fo proceed through all the Columns . EXAMPLES in ADDITION of Simple or Whole Numbers . £ . Yards . 16 . C. Tuns . 2 427 34245 48784248 48784253 3 347 87425 3454257 87425678 3 874 ...
... added Column , and carry the Units to the next , and fo proceed through all the Columns . EXAMPLES in ADDITION of Simple or Whole Numbers . £ . Yards . 16 . C. Tuns . 2 427 34245 48784248 48784253 3 347 87425 3454257 87425678 3 874 ...
Page 17
... added to 484 makes the Sum 874258 ? 4r The Sum of two Numbers is 472 , the leaft is 43 , what is the greatest ? 5. Subtract 24 , 14 , 18 , 95 , and 178 , from 478000 , and let me know the Difference ? 6. What Number of Pounds ...
... added to 484 makes the Sum 874258 ? 4r The Sum of two Numbers is 472 , the leaft is 43 , what is the greatest ? 5. Subtract 24 , 14 , 18 , 95 , and 178 , from 478000 , and let me know the Difference ? 6. What Number of Pounds ...
Page 18
... which increase by an equal Difference , the greateft is equal to the leaft ( the leaft being 41. 14s . 84d . ) added to double the Difference of the ift and and zd , and the Difference of the 2d and 18 The most General School - Affistant .
... which increase by an equal Difference , the greateft is equal to the leaft ( the leaft being 41. 14s . 84d . ) added to double the Difference of the ift and and zd , and the Difference of the 2d and 18 The most General School - Affistant .
Page 11
... adding thereto the given Num- ber of faid Denomination . Divide this Sum as before , and fo proceed ; the Quotes placed in due Order are the Anfwer . EXAMPLES of MONEY . 1. Divide gol . 14s . 10d . by 4 , 5 , 6 , 7 , 8 , 11 , 13 , 17 ...
... adding thereto the given Num- ber of faid Denomination . Divide this Sum as before , and fo proceed ; the Quotes placed in due Order are the Anfwer . EXAMPLES of MONEY . 1. Divide gol . 14s . 10d . by 4 , 5 , 6 , 7 , 8 , 11 , 13 , 17 ...
Page 6
... added , when a mixt No. ) is the Numerator to the given Denominator . EXAMPLES . Reduce 16 to an improper Fraction , whofe Demominator fhall be 6 . Reduce 142 , 62 , 16-18 , and 197 to improper Fractions . 43. To reduce improper ...
... added , when a mixt No. ) is the Numerator to the given Denominator . EXAMPLES . Reduce 16 to an improper Fraction , whofe Demominator fhall be 6 . Reduce 142 , 62 , 16-18 , and 197 to improper Fractions . 43. To reduce improper ...
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The Most General School-Assistant: Containing, a Complete System of ... Gilbert Dyer No preview available - 2016 |
Common terms and phrases
alfo Anfo Anfw Anfwer Angle Annum Anſw Axis Bafe Barter Baſe Bought Breadth Bufhels Bung Diameter Cafk called Cent Circle coft common Crown Cyphers Decimal Denominator Dimenfions divide Dividend Divifion Divifor Ducat equal EXAMPLES Facit faid fame Farthings fecond Feet long fhall Figure firft firſt Flemish folid Content folid Feet fome fquare Feet Fruftrum fuch fuperficial Content gain given Number greatest Grofs hath Head Diameter Height Hogfhead Hundred improper Fractions Inches Integer Intereft Interfection laft laſt leaft lefs Length Maravedies Meaſure middle Zone Miles mixt Numbers Moidore Money Months muft Multiply muſt No's Ounce parabolic Spindle perpendicular Piaftres Piece Places Pound Pound Sterling Price Primes Product Proportion Quantity Quotient Reduce refpectively reft Remainder Reſult Root Rule Segment Shillings Side Spheroid Square Sterling Subtractor Suppofe Tare Term thefe theſe thofe Timber Trapezium Triangle Ullage uſed Value VULGAR FRACTIONS Wine Gallons
Popular passages
Page 82 - A cone is a solid figure described by the revolution of a right-angled triangle about one of the sides containing the right angle, which side remains fixed.
Page 6 - Multiply the numerators together for a new numerator, and the denominators together for a new denominator.
Page 24 - If a man perform a journey in 15 days when the days are 12 hours long, in how many will he do it when the days are but 10 hours long ? Ans.
Page 10 - RULE. Multiply the numerators together for the numerator, and the denominators together for the denominator of the required fraction.
Page 152 - If a footman travel 130 miles in 3 days, when the days are 12 hours long ; in how many days, of 10 hours each, may he travel 360 miles ? Ans. 9|f days. 5. If 120 bushels of corn can serve 14 horses 56 days, how many days will 94 bushels serve 6 horses?
Page 62 - How many strokes do the clocks of Venice, which go on to 24 o-clock, strike in the compass of a day?
Page 12 - When a decimal number is to be multiplied by 10, 100, 1000, &c., the multiplication may be made by removing the decimal point as many places to the right hand as there are ciphers in the multiplier, and if there be not so many figures on the right of the decimal point, supply the deficiency by annexing ciphers "10 l...
Page 5 - NOTE. — A fraction, strictly speaking, is less than a unit ; hence, if the numerator is equal to, or greater than, the denominator, it expresses a unit or more than a unit, and is therefore called an improper fraction. A mixed number is a whole number with a fraction; as, 7^, 5f.
Page 58 - ... be allowed to keep the remaining $70 ? Ans. 1 yr. 11 mo. 25 d., about. Another common but incorrect method. To find the time when several debts, due at different times, can be paid at once, without loss to either debtor or creditor, merchants usually Multiply each debt by the time to elapse before it is due, and divide the sum of the products by the sum of the debts. Though this method is inaccurate it is easy, and experiment shows it may be employed without much error, to find the mean time...