 Subtract the quotient from the Annuity: Divide the remainder by the ratio less 1 , and the quotient will be the present worth to commence immediately, 3. Divide this quotient by that power of the ratio denoted by the time of Reversion, (or...  Daboll's Schoolmaster's Assistant - Σελίδα 207των Nathan Daboll - 1828 - 247 σελίδεςΠλήρης προβολή - Σχετικά με αυτό το βιβλίο
 | James L. Connolly (mathematician.) - 1835 - 264 σελίδες
...interest. RULE. Divide the annuity by that power of the ratio, denoted by the time of its continuance, subtract the quotient from the annuity, divide the remainder by the ratio less one, and the quotient will be the present worth, to commence immediately. Di.vide this quotient by... | |
 | Nathan Daboll - 1837 - 262 σελίδες
...REVERSION, at Compound Interest. 1. Divide the annuity by that power of the ratio denoted by the time of its continuance. 2. Subtract the quotient from...remainder by the ratio less 1, and the quotient will be th present worth to commence immediately. 3. Divide this quotient by that power of the ratio denoted... | |
 | Nathan Daboll - 1839 - 220 σελίδες
...Of the ratio equal to the time of its continuance, and subtract this quotient from the annuity, and divide the remainder by the ratio less 1, and the quotient will be the piesent worth to commence immediately. 2. Divide the quotient by the power of the ratio equal to the... | |
 | Benjamin Greenleaf - 1839 - 356 σελίδες
...Find the last term, as before, multiply it by the ratio, and from the product subtract the first term. Divide the remainder by the ratio less 1 , and the quotient will be the answer. Or, raise the ratio to a power, wlwse index shall be equal to the number of terms ; from which... | |
 | Frederick Emerson - 1840 - 302 σελίδες
...series. RULE. Multiply the greater extreme by the ratio, from the product subtract the less extreme, and divide the remainder by the ratio less 1, and the quotient will be the sum of the series. 6. The first term in a series of continual proportionals is 1, the last term is... | |
 | Benjamin Greenleaf - 1841 - 334 σελίδες
...Find the last term, as before, multiply it by Ike ratio, and from the product subtract the first term. Divide the remainder by the ratio less 1, and the quotient will be the answer. Or, raise the ratio to a power, whose index shall be equal to the number of terms ; from which... | |
 | Nathan Daboll - 1843 - 260 σελίδες
...REVERSION, at Compound Interest. 1. Divide the Annuity by that power of the ratio denoted by the time of its continuance. 2. Subtract the quotient from...worth to commence immediately. 3. Divide this quotient iiy that power of tlie ratio 'denoted by the time of Reversion, (or the time to come before tlie Annuity... | |
 | Nathan Daboll - 1843 - 254 σελίδες
...the series. BULB. Multiply the last term by the ratio ; from the product subtract the first term, and divide the remainder by the ratio, less 1, and the quotient will be the sum of all the terms. EXAMPLES. 1 . A man bought 6 yards of cloth, giving 2 cents for the first yard,... | |
 | 1845 - 196 σελίδες
...given, to find the present worth: IIULE. Divide the annuity by the ratio involved to the time, and subtract the quotient from the annuity; divide the remainder by the ratio less one, and the quotient will be the present worth: Or, by Table IV. Multiply the number under the rate,... | |
 | Nathan Daboll, David Austin Daboll - 1849 - 260 σελίδες
...RULE. Raise the ratio to a powen equal to the given number of years. From thai power subtract 1, and divide the remainder by the ratio, less 1 , and the quotient will be the amount of $1 annuity for the given time. Multiply this amount by the given a§nuity, and the product... | |
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