Conkling's Arithmetic: The Young Arithmetician's Guide to a Knowledge of Numbers; Being an Easy Practical System of Arithmetic, Explained and Brought Down to the Capacity of the Learner; Adapted to the Currency of the United States |
From inside the book
Results 1-5 of 14
Page ix
... examining the rules , tables , & c . These tables are so constructed , that the learner may in gen- eral know what to multiply or divide by , to reduce or bring one denomination into another , and also the reason why . For ex- ample ...
... examining the rules , tables , & c . These tables are so constructed , that the learner may in gen- eral know what to multiply or divide by , to reduce or bring one denomination into another , and also the reason why . For ex- ample ...
Page 25
... examining the rule and this example , you may be able to find the answers to the following questions . EXAMPLES . Seconds . Minutes . Hours . 39542 672543 349984 Days . 764384 38 95 248 1945 1502596 63891585 86796032 .1486726880 Weeks ...
... examining the rule and this example , you may be able to find the answers to the following questions . EXAMPLES . Seconds . Minutes . Hours . 39542 672543 349984 Days . 764384 38 95 248 1945 1502596 63891585 86796032 .1486726880 Weeks ...
Page 34
... examining the rule , he may find the quotient or answer to the following questions . 4 Divide 1798467 by 24 , Answer 74936 and 3 Remainder . Divisor . Dividend . Quotient . To be placed thus , 24 ) 1798467 ( 74936 & 3 Remainder . 5 ...
... examining the rule , he may find the quotient or answer to the following questions . 4 Divide 1798467 by 24 , Answer 74936 and 3 Remainder . Divisor . Dividend . Quotient . To be placed thus , 24 ) 1798467 ( 74936 & 3 Remainder . 5 ...
Page 39
... examining the table . Over the first , and third of these sums place the same as over the first example for illustration , the second , as in simple addition . D c £ S d qr D 1698 93 216 COMPOUND ADDITION . 39 13 Rule of Three Inverse -209.
... examining the table . Over the first , and third of these sums place the same as over the first example for illustration , the second , as in simple addition . D c £ S d qr D 1698 93 216 COMPOUND ADDITION . 39 13 Rule of Three Inverse -209.
Page 61
... examining this example , you will see , that I multiplied by 6 , Compound Multipli- cation ; saying , 6 times 5 are 30 , twelve in- to 30 , twice , and 6 over ; set down 6 , and carry 2 , & c . then I said , is the ; after dividing by 8 ...
... examining this example , you will see , that I multiplied by 6 , Compound Multipli- cation ; saying , 6 times 5 are 30 , twelve in- to 30 , twice , and 6 over ; set down 6 , and carry 2 , & c . then I said , is the ; after dividing by 8 ...
Common terms and phrases
2qrs 3d term 3qrs according to rule acres added amount annex annum answer barrel bring brought bushels ciphers Compound contained cost cube root currency denomination difference dividend divisor dollars dolls drams EXAMPLE FOR ILLUSTRATION farthings Federal money feet figure Find the interest Find the number furlongs gain gallons given number given sum grains half pence hogsheads hundred improper fraction inches last product last quotient learner less lowest terms miles mills months multi multiplicand Multiply the given muslin neat weight number of terms ounces payment pecks pence penny pennyweights pints placed the numbers poles pounds present worth principal proceed proper quantity quarters quarts question quotient rate per cent ratio remainder roods Rule of Three saying second term sell shillings square root subtract sugar Suppose tare third term thousand tion VULGAR FRACTIONS whole number yards
Popular passages
Page 193 - RULE. 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.
Page 194 - 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 46 - OF TIME. 60 Seconds = 1 Minute 60 Minutes =± 1 Hour 24 Hours = 1 Day 7 Days = 1 Week 28 Days = 1 Lunar Month...
Page 109 - Then multiply the second and third terms together, and divide the product by the first term: the quotient will be the fourth term, or answer.
Page 273 - COMPUTE the interest on the principal sum, from the time when the interest commenced to the first time when a payment was made, which exceeds either alone or in conjunction with the preceding payments (if any) the interest at that time due: add that interest to the principal, and from the sum subtract the payment made at that time, together with the preceding payments (if any) and the remainder forms a new principal ; on which, compute and subtract the interest, as upon the first principal: and proceed...
Page 273 - Compute the interest on the principal sum, from the time when the interest commenced, to the first time when a payment was made, which exceeds, either alone, or in conjunction with the preceding payments, if any, the interest at that time due ; add that interest to the principal, and from the sum subtract the payment made at that time, together with the preceding payments, if any, and the remainder forms a new principal; on which compute...
Page 284 - Up starts a hare before my two greyhounds. The dogs, being light of foot, did fairly run, Unto her fifteen rods, just twenty-one. The distance that she started up' before Was fourscore sixteen rods just, and no more.
Page 251 - 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 10.
Page 272 - Compute the interest to the time of the first payment ; if that be one year or more from the time the interest commenced , add it to the principal, and deduct the payment from the sum total. If there be after payments made, compute the interest on the balance due, to the next payment, and then deduct the payment as above ; and in like manner from one payment to another till all the payments are absorbed ; provided the time between one payment and another be one year or more.
Page 243 - Place the terms of demand, under those of the same kind in the supposition. If the blank place or term sought, fall under the third term, the proportion is direct ; then multiply the first and second terms together for a divisor, and the other three for a dividend...