The Tutor's Guide: Being a Complete System of Arithmetic; with Various Branches in the Mathematics. To which is Added an Appendix, Containing Different Forms of Acquittances, Bills of Exchange, &c. &c |
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Page 188
... Theorem will be as follows . THEOREM 1. ptr = l . EXAMPLES . ( 1 ) What is the Interest of 2607 17s 6d for 5 Years , at 41 per Cent . per Annum ? ( 2 ) What is the Interest of 500 / 188 Simple Interest . Real Estates 219 Simple Interest.
... Theorem will be as follows . THEOREM 1. ptr = l . EXAMPLES . ( 1 ) What is the Interest of 2607 17s 6d for 5 Years , at 41 per Cent . per Annum ? ( 2 ) What is the Interest of 500 / 188 Simple Interest . Real Estates 219 Simple Interest.
Page 189
... Theorem 1 , which , added to the Principal , will give the Amount . Thus , THEOREM 2. ptr + p A. EXAMPLES . ( 5 ) What will 284 / 10s amount to in 7 Years , at 31 per Cent . per Annum ? ( 6 ) What will 6721 5s amount to in Simple ...
... Theorem 1 , which , added to the Principal , will give the Amount . Thus , THEOREM 2. ptr + p A. EXAMPLES . ( 5 ) What will 284 / 10s amount to in 7 Years , at 31 per Cent . per Annum ? ( 6 ) What will 6721 5s amount to in Simple ...
Page 190
... THEOREM 3 . I - = p . tr EXAMPLES . ( 8 ) I demand what Principal , being put to Interest for 3 Years , will gain 69 / 13s 6d . at 5 per Cent . per Annum ? ( 9 ) I demand what Principal , being put to Interest for 51 Years , will gain ...
... THEOREM 3 . I - = p . tr EXAMPLES . ( 8 ) I demand what Principal , being put to Interest for 3 Years , will gain 69 / 13s 6d . at 5 per Cent . per Annum ? ( 9 ) I demand what Principal , being put to Interest for 51 Years , will gain ...
Page 191
... THEOREM 5 . I - pr = EXAMPLES . ( 14 ) In what Time will 464 / 10s gain 691 13s 6d at 5 per Cent . per Annum ? ( 15 ) In what Time will 2607 gain 647 7s at 4 per Cent . per Annum ? ( 16 ) În what Time will 500 / gain 130 / 9s 7d at 61⁄2 ...
... THEOREM 5 . I - pr = EXAMPLES . ( 14 ) In what Time will 464 / 10s gain 691 13s 6d at 5 per Cent . per Annum ? ( 15 ) In what Time will 2607 gain 647 7s at 4 per Cent . per Annum ? ( 16 ) În what Time will 500 / gain 130 / 9s 7d at 61⁄2 ...
Page 192
... THEOREM 7 . - = r . pt EXAMPLES . ( 20 ) At what Rate per Cent . will 464 / 10s gain 69 / 13s 6d in 3 Years ? ( 21 ) At what Rate per Cent . will 2601 gain 641 7s in 51 Years ? ( 22 ) At what Rate per Cent . will 5607 12s 83d gain 235 ...
... THEOREM 7 . - = r . pt EXAMPLES . ( 20 ) At what Rate per Cent . will 464 / 10s gain 69 / 13s 6d in 3 Years ? ( 21 ) At what Rate per Cent . will 2601 gain 641 7s in 51 Years ? ( 22 ) At what Rate per Cent . will 5607 12s 83d gain 235 ...
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Common terms and phrases
Acres Amount Annuity Annum Answer Area Arithmetical Progression Avoirdupois Barrels Bought Breadth Bushels Ciphers Circumference common Difference compound Copecs cost Crown Cube Root Decimal demand Denominator Diameter ditto Divide Dividend Divisor Dozen dwts equal EXAMPLES Exchange Exercise at Leisure Farthings Feet Figure Flemish Fraction Frustum gain Gallons given Number given Quantity Grosh Gross Guilders Guineas Half hhds improper Fraction Integer Length London Measure Miles Moidores Months Multiplicand Number of Days Number of Terms Ounces paid payable Payment Pence Person Piece Pints Place Pounds Pounds Sterling Pray present Worth Price Principal Product Proportion Quarters Quarts QUESTIONS for Exercise Quotient Rate per Cent ready Money Reduce Remainder Rent Repetend RULE Shillings Side sold Square Root Sterling Stock subtract Table Tare THEOREM third Value VULGAR FRACTIONS Weight whole Number Wine Yards Yearly
Popular passages
Page 77 - ... dollars. How many days did he work, and how many days was he idle ? Ans.
Page 126 - There is a fish whose head is 6 inches long, and the tail is as long as the head and half the body, and the body is as long as the head and tail ; what is the length of the whole fish?
Page 165 - Opposite to each dividend, on the left hand, place such a number for a divisor, as will bring it to the next superior denomination, and draw a line between them.
Page 141 - Now .} of f- is a compound fraction, whose value is found by multiplying the numerators together for a new numerator, and the denominators for a new denominator.
Page 248 - Multiply the circumference of the base by the slant height or length of the side, and half the product 'will be the surface.
Page 172 - Reduce the fraction to its lowest terms, then extract the square root of the numerator for a new numerator, and the square root of the denominator for a new denominator.
Page 95 - A» the Amount of 100/ at the Rate and Time given : is to 100/ : : so is the Amount given : to the Principal required.
Page 137 - Hence, when the extremes and the number of terms are given, to find the sum of all the terms,- — Multiply £ the sum of the extremes by the number of terms, and the product will be the answer.
Page 142 - To reduce a mixed number to an improper fraction, Multiply the whole number by the denominator of the fraction, and to the product add the numerator; under this sum write the denominator.
Page 227 - To fold the area of a Parallelogram, whether it be a Square, a Rectangle, a Rhombus, or a Rhomboides. RULE. Multiply the length by the height or perpendicular breadth, and the product will be the area.* * *DEMONSTSATION.