Higher Arithmetic: Designed for the Use of High Schools, Academies, and Colleges ...D. Appleton, 1851 - 342 σελίδες |
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Σελίδα 8
... Geometrical progression , 232 Summation of decreasing infinite series , 246 CHAPTER XII . Miscellaneous questions solved by analysis , 248 • CHAPTER XIII . Miscellaneous questions , . APPENDIX , .. 273 · 283 ARITHMETIC . CHAPTER I ...
... Geometrical progression , 232 Summation of decreasing infinite series , 246 CHAPTER XII . Miscellaneous questions solved by analysis , 248 • CHAPTER XIII . Miscellaneous questions , . APPENDIX , .. 273 · 283 ARITHMETIC . CHAPTER I ...
Σελίδα 152
... geometrical series , whose first term is the original principal ; the ratio is the amount of $ 1 for one year , at the given rate per cent .; the number of terms is equal to the number of years , plus one . From this we learn that ...
... geometrical series , whose first term is the original principal ; the ratio is the amount of $ 1 for one year , at the given rate per cent .; the number of terms is equal to the number of years , plus one . From this we learn that ...
Σελίδα 159
... geometrical pro- gression , whose first term is the annuity , the ratio is the amount of $ 1 for 1 year , and the number of terms is equal to the number of years ; therefore , the amount of an annuity is found by summing the terms of a ...
... geometrical pro- gression , whose first term is the annuity , the ratio is the amount of $ 1 for 1 year , and the number of terms is equal to the number of years ; therefore , the amount of an annuity is found by summing the terms of a ...
Σελίδα 176
... geometrical progression : 3 - 1 + 1õõ + ( 1õõ ) 2 + ( ïõõ ) 3 + , & c .; this , summed , dis- regarding the 3 days of grace , gives 10752688 . Therefore , in this case , the bank receives 7.52688 per cent . per annum for its money . The ...
... geometrical progression : 3 - 1 + 1õõ + ( 1õõ ) 2 + ( ïõõ ) 3 + , & c .; this , summed , dis- regarding the 3 days of grace , gives 10752688 . Therefore , in this case , the bank receives 7.52688 per cent . per annum for its money . The ...
Σελίδα 231
... terms of an arith- metical progression is 10 , the last term is 1003 , and the sum of all the terms is 50800. What is the first term ? Ans . 13 . CHAPTER XI . GEOMETRICAL PROGRESSION . 82. A SERIES of ARITHMETICAL PROGRESSION . 231.
... terms of an arith- metical progression is 10 , the last term is 1003 , and the sum of all the terms is 50800. What is the first term ? Ans . 13 . CHAPTER XI . GEOMETRICAL PROGRESSION . 82. A SERIES of ARITHMETICAL PROGRESSION . 231.
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Συχνά εμφανιζόμενοι όροι και φράσεις
acres amount of $1 annex annuity approximative values arith arithmetical progression bushel canceling ciphers common denominator common difference compound interest continued fraction cube root decimal figures decimal places denotes digits diminished divided dividend divisible by 9 EXAMPLES exponent expressed feet find the interest find the present following RULE frac fraction is equivalent gallons geometrical progression given principal gives greatest common measure half the number Hence improper fraction inches indorsement interest of $1 last term least common multiple less lowest terms method metical progression miles mixed number multiplied nearly number of decimal number of dollars number of terms numerator and denominator obtain Operation partial fraction perfect repetend places of decimals pound present worth prime factors quantity quotient rate per cent ratio Reduce remainder right-hand figure Rule under Art shillings square root subtract tabular number third term Total branches trial divisor vulgar fraction whole number wine vessel worth of $1 yards
Δημοφιλή αποσπάσματα
Σελίδα 309 - That is, the square of the sum of two numbers is equal to the square of the first number, plus twice the product of the two numbers, plus the square of the second number.
Σελίδα 22 - Divide the greater number by the less, the divisor by the remainder, and thus continue to divide the last divisor by the last remainder until there is no remainder ; the last divisor will be the greatest common divisor.
Σελίδα 132 - ... apply the payment, in the first place, to the discharge of the interest then due. If the payment exceeds the interest, the surplus goes towards discharging the principal, and the subsequent interest is to be computed on the balance of principal remaining due. If the payment be less than the interest, the surplus of interest must not be taken to augment the principal; but interest continues on the former principal until the period when the payments, taken together, exceed the interest due, and...
Σελίδα 37 - Multiply all the numerators together for a new numerator, and all the denominators for a new denominator: then reduce the new fraction to its lowest terms.
Σελίδα 132 - The rule for casting interest, when partial payments have been made, is to apply the payment, in the first place, to the discharge of the interest then due. " If the payment exceeds the interest, the surplus goes towards discharging the principal, and the subsequent interest is to be computed on the balance of principal remaining due.
Σελίδα 247 - His head weighed as much as his tail and half his body, and his body weighed as much as his head and tail together. What was the weight of the fish ? Let 2x = the weight of the body in pounds.
Σελίδα 323 - The logarithm of the product of any number of factors is equal to the sum of the logarithms of the factors.
Σελίδα 9 - To raise a whole number or a decimal to any power, use it as a factor as many times as there are units in the exponent.
Σελίδα 234 - Multiply the first term by the power of the ratio, whose exponent is one less than the number of terms. EXAMPLES. 1.
Σελίδα 141 - DISCOUNT is an allowance made for the payment of money before it is due. The present worth of a...