2. Barr, Banks & Co. gain in trade $8000. Barr furnished $12000 for 6 mo., Banks, $10000 for 8 mo., and Butts $8000 for 11 mo. Apportion the gain? RULE 1.—Multiply each partner's capital by the time it is invested, and divide the whole gain or loss among the partners in the ratio of these products. Or, 2. State by proportion: The sum of the products is to each product, as the whole gain or loss is to each partner's gain or loss. 3. Jan. 1, 1876, three persons began business with $1300 capital furnished by A; March 1, B put in $1000; Aug. 1, C put in $900. The profits at the end of the year were $750. Apportion it. 4. In a partnership for 2 years, A furnished at first $2000, and 10 mo. after withdrew $400 for 4 mo., and then returned it; B at first put in $3000, and at the end of 4 mo. $500 more, but drew out $1500 at the end of 16 mo. The whole gain was $3372. Find the share of each. 5. The joint capital of a company was $5400, which was doubled at the end of the year. A put in for 9 mo., B & for 6 mo., and C the remainder for 1 year. What is each one's share of the stock at the end of the year? 6. Crane, Child & Coe, forming a partnership Jan. 1, 1875, invested and drew out as follows: Crane invested $2000, 4 mo. after $1000 more, and at the end of 9 mo. drew out $600. Child invested $5000, 6 mo. after $1200 more, and at the end of 11 mo. put in $2000 more. Coe put in $6000, 4 mo. after drew out $4000, and at the end of 8 mo. drew out $1000 more. The net profits for the year were $7570. Find the share of each. ALLIGATION 784. Alligation treats of mixing or compounding two or more ingredients of different values or qualities. 785. Alligation Medial is the process of finding the mean or average value or quality of several ingredients. 786. Alligation Alternate is the process of finding the proportional quantities to be used in any required mixture. 787. 1. If a grocer mix 8 lb. of tea worth $.60 a pound with 6 lb. at $.70, 2 lb. at $1.10, and 4 lb. at $1.20, what is 1 lb. of the mixture worth? 2. If 20 lb. of sugar at 8 cents be mixed with 24 lb. at 9 cents, and 32 lb. at 11 cents, and the mixture is sold at 10 cents a pound, what is the gain or loss on the whole? RULE. Find the entire cost or value of the ingredients, and divide it by the sum of the simples. 3. A miller mixes 18 bu. of wheat at $1.44 with 6 bu. at $1.32, 6 bu. at $1.08, and 12 bu. at $.84. What will be his gain per bushel if he sell the mixture at $1.50? 4. Bought 24 cheeses, each weighing 25 lb., at 7 a pound; 10, weighing 40 lb. each, at 10; and 4, weighing 50 lb. each, at 13; sold the whole at an average price of 91 a pound. What was the whole gain? 5. A drover bought 84 sheep at $5 a head; 96 at $4.75; and 130 at $51. At what average price per head must he sell them to gain 20%? 788. To find the proportional parts to be used, when the mean price of a mixture and the prices of the simples are given. 1. What relative quantities of timothy seed worth $2 a bushel, and clover seed worth $7 a bushel, must be used to form a mixture worth $5 a bushel ? OPERATION. 2 5 Ans. 3 ANALYSIS. Since on every ingredient usea whose price or quality is less than the mean rate there will be a gain, and on every ingredient whose price or quality is greater than the mean rate there will be a loss, and since the gains and losses must be exactly equal, the relative quantities used of each should be such as represent the unit of value. By selling one bushel of timothy seed worth $2, for $5, there is a gain of $3; and to gain $1 would require of a bushel, which is placed opposite the 2. By selling one bushel of clover seed worth $7, for $5, there is a loss of $2; and to lose $1 would require of a bushel, which is placed opposite the 7. In every case, to find the unit of value, divide $1 by the gain or loss per bushel or pound, etc. Hence, if every time of a bushel of timothy seed is taken, of a bushel of clover seed is taken, the gain and loss will be exactly equal, and and will be the proportional quantities required. To express the proportional numbers in integers, reduce these fractions to a common denominator, and use their numerators, since fractions having a common denominator are to each other as their numerators (241); thus, and are equal to and, and the proportional quantities are 2 bu. of timothy seed to 3 bu. of clover seed. 2. What proportions of teas worth respectively 3, 4, 7, and 10 shillings a pound, must be taken to form a mixture worth 6 shillings a pound? 6 3 OPERATION. 12345 181 H 4 11 77 22 101 3 3 ANALYSIS.-To preserve the equality of gains and losses, always compare two prices or simples, one greater and one less than the mean rate, and treat each pair or couplet as a separate example. In the given example form two couplets, and compare either 3 and 10, 4 and 7, or 3 and 7, 4 and 10. We find that of a lb. at 3s. must be taken to gain 1 shilling, and of a lb. at 10s. to lose 1 shilling; also of a lb. at 4s. to gain 1 shilling, and 1 lb. at 7s. to lose 1 shilling. These proportional numbers, obtained by comparing the two couplets, are placed in columns 1 and 2. If, now, the numbers in columns 1 and 2 are reduced to a common denominator, and their numerators used, the integral numbers in columns 3 and 4 are obtained, which, being arranged in column 5, give the proportional quantities to be taken of each. It will be seen that in comparing the simples of any couplet, one of which is greater, and the other less than the mean rate, the proportional number finally obtained for either term is the difference between the mean rate and the other term. Thus, in comparing 3 and 10, the proportional number of the former is 4, which is the difference between 10 and the mean rate 6; and the proportional number of the latter is 3, which is the difference between 3 and the mean rate. The same is true of every other couplet. Hence, when the simples and the mean rate are integers, the intermediate steps taken to obtain the final proportional numbers as in columns 1, 2, 3, and 4, may be omitted, and the same results readily found by taking the difference between each simple and the mean rate, and placing it opposite the one with which it is compared. 3. In what proportions must sugars worth 10 cents, 11 cents, and 14 cents a pound be used, to form a mixture worth 12 cents a pound? 4. A farmer has sheep worth $4, $5, $6, and $8 per he sell of each and realize an head. What number may average price of $5 per head? RULE.-I. Write the several prices or qualities in a column, and the mean price or quality of the mixture at the left. II. Form couplets by comparing any price or quality less, with one that is greater than the mean rate, placing the part which must be used to gain 1 of the mean rate opposite the less simple, and the part that must be used to lose 1 opposite the greater simple, and do the same for each simple in every couplet. III. If the proportional numbers are fractional, they may be reduced to integers, and if two or more stand in the same horizontal line, they must be added; the final results will be the proportional quantities required. 1. If the numbers in any couplet or column have a common factor, it may be rejected. 2. We may also multiply the numbers in any couplet or column by any multiplier we choose, without affecting the equality of the gains and losses, and thus obtain an indefinite number of results, any one of which being taken will give a correct final result. 5. What amount of flour worth $5, $6, and $7 per barrel, must be sold to realize an average price of $61 per barrel ? 6. In what proportions can wine worth $1.20, $1.80, and $2.30 per gallon be mixed with water so as to form a mixture worth $1.50 per gallon? |