3. What is the tare on 32 boxes of soap, weighing 31550lb., allowing 4lb. per box for draft and 12 per cent for tare?

31550 gross.

32x4= 128 draft.

31422

31422

12

3770,64

Ans. 3770,64lb.=1 T. 13cwt. 2qr. 18lb. 10oz.+

4. What will be the cost of 3 hogsheads of tobacco at $9,47 per cwt. net, the gross weight being of

5. At £1 5s per cwt. net; tare 47b. per cwt.: what will be the cost of 4 hogsheads of sugar weighing gross,

cwt. gr. lb.

10 3

6

6. At 21 cents per lb., what will be the cost of 5hhd. of

coffee weighing in gross,

cwt. qr. lb.

No. 1

lb. tare 94

7. At £7 5s per cwt. net, how much will 16hhd. of sugar come to, each weighing gross 8cwt. qr. 71b.; tare 127b. per cwt.? Ans. £912 14s 51⁄2d+.

8. What is the net weight of 18hhd. of tobacco, each weighing gross 8cwt. 3qr. 14lb.; tare 167b. to the cwt.? Ans. 6T. 16cwt. 3qr. 20lb.

9. In 4T. 3cwt. 3qr. gross, tare 2016. to the cwt., what is the net weight? Ans. 3 T. 8cwt. 3qr. 5lb.

10. What is the net weight and value of 80 kegs of figs, gross weight 7 T. 11cwt. 3qr., tare 147b. per cwt., at $2,31 per cwt.? 6 T. 12cwt. 3qr. 3lb. 8oz.

Ans. {Value $306,724 4+.

DUODECIMALS.

§ 170. Duodecimals are denominate fractions in which 1 foot is the unit that is divided.

The unit 1 foot is first supposed to be divided into 12 equal parts, called inches or primes, and marked'.

Each of these parts is supposed to be again divided into 12 equal parts, called seconds, and marked".

Each second is divided in like manner into 12 equal parts, called thirds, and marked "".

This division of the foot gives

1' inch or prime

1" second is of 12

=

=2of a foot.
of a foot.

1third is of 12 of 12-1728 of a foot.

=

Duodecimals are added and subtracted like other denominate numbers, 12 of a lesser denomination making one of a greater, as in the following

1. In 185', how many feet?

2. In 250", how many feet and inches?

3. In 4367", how many feet?

Ans. 15ft. 5'.

Ans. 1ft. 8' 10".

Ans. 2ft. 6' 3" 11”.

Q. In Duodecimals what is the unit that is divided? How is it divided? How are these parts again divided? What are the parts called? How are duodecimals added and subtracted? How many of one denomination make 1 of the next greater?

EXAMPLES IN ADDITION AND SUBTRACTION.

1. What is the sum of 3ft. 6' 3" 2"

and 2ft. 1' 10" 11""? Ans. 5ft. 8' 2" 1"".

2. What is the sum of 8ft. 9' 7" and 6ft. 7 3" 4!!!?

Ans.

Ans. 15ft 4' 10" 4". 3. What is the difference between 9ft. 3' 5" 6" and 7ft. 31 6 7 ? 4. What is the difference between 40ft. 6' 6" and 29ft. 7? Ans. 11ft. 6' 5" 5".

MULTIPLICATION OF DUODECIMALS.

§ 171. It has been shown (§ 64) that feet multiplied by feet give square feet in the product.

EXAMPLES.

1. Multiply 6ft. 6' 6" by 2ft. 7. Set down the multiplier under the multiplicand, so that feet shall fall under feet, inches under inches, &c. It is generally most convenient to begin with the highest denomination of the multiplier, and then multiply first the lower denominations of the multiplicand.

6

1/2

6

pro

The 6" of the multiplicand is of an inch, or of a foot. Therefore when we multiply it by 2 feet, the duct is 12", equal to 1 inch. Multiplying 6' or of a foot, by 2 feet, the product is 12', to which add 1 inch from the last product, making 13'. Set down 1' under the column of inches and carry 1 foot to the product of the 6 by 2, making 13 feet.

6

Then mulitply by 7. The product of 7' by 6"-42": for, 7 of a foot, and 6" of a foot: hence 7'6" =12×114=1738-42"-3" 6. Then

42

==

42", and 3" to carry make 45"-3' 9": set down 9". Then by 6=42', and 3' to carry make 45'=3ft. 9', which are set down in their proper places.

Hence, we see,

1st, That feet multiplied by feet give square feet in the product.

2nd, That feet multiplied by inches give inches in the product.

3rd, That inches multiplied by inches give seconds, or twelfths of inches in the product.

4th, That inches multiplied by seconds give thirds in the product.

2. Multiply 9ft. 4in. by 8ft. 3in. Beginning with the 8 feet, we say 8 times 4 are 32', which is equal to 2 feet 8': set down the 8'. Then say 8 times 9 are 72 and 2 to carry are 74 feet: then multiplying by 3', we say, 3 times 4' are 12", equal to 1 inch: set down 0 in the second's place: then 1 to carry make 28', equal to 2ft. 4'. product is equal to 77ft.

9

OPERATION.

4

8 3'

74

8/

2 4' 0"

77 0 0 Ans.

3 times 9 are 27 and Therefore the entire

3. How many solid feet in a stick of timber which is 25ft. 6in. long, 2ft. 7in. broad, and 3ft. 3in. thick?

4. Multiply 9ft. 2in. by 9ft. 6in.

5. Multiply 24ft. 10in. by 6ft. 8in. 6. Multiply 70ft. 9in. by 12ft. 3in.

Ans. 87ft. 1'. Ans.

Ans. 866ft. 8' 3".

7. How many cords and cord feet in a pile of wood 24 feet long, 4 feet wide, and 3ft. 6in. high?

Ans. 2 cords and 5 cord feet.

NOTE. It must be recollected that 16 solid feet make one cord foot § 65.

Q. In multiplication how do you set down the multiplier? Where do you begin to multiply? How do you carry from one denomination to another? Repeat the four principles.

ALLIGATION MEDIAL.

§ 172. A merchant mixes 87b. of tea worth 75cts. per pound, with 167b. worth $1,02 per pound: what is the value of the mixture per pound?

The manner of finding the price of this mixture is called Alligation Medial. Hence,

ALLIGATION MEDIAL teaches the method of finding the price of a mixture when the simples of which it is composed, and their prices, are known.

In the example above, the simples 87b. and 1676., and also their prices per pound, 75cts. and $1,02, are known. 8lb. of tea at 75cts. per lb.

167b.

$1,02 per lb.

24 sum of simples.

Now if the entire cost of the mixture, which is $22,32, be divided by 24 the number of pounds, or sum of the simples, the quotient 93cts. will be the price per pound. Hence, we have the following

RULE.

6,00 16,32

Total cost $22,32

OPERATION.

24)$22,32(93cts.

216

72

72

Divide the entire cost of the whole mixture by the sum of the simples: the quotient will be the price of the mixture.