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Ch 01 GM 1&2 YR 11 Page 21 Wednesday, December 15, 1999 5:49 PM Chapter 1 Arithmetic 21 Ratios A ratio is a comparison of two or more quantities measured in the same units. Consider the following extract from a microwave recipe book: ‘. . . Place rice and water in the ratio 1:2 in a microwave-proof dish, cover and cook on high for 10 minutes. . .’ The ratio 1:2 (which is read as ‘one to two’) of rice and water means that for each cup of rice we should add two cups of water (that is, the amount of water is twice that of rice). The numbers 1 and 2 are called the terms of the ratio. Naturally, if we expect a large number of guests for dinner, 1 cup of rice won’t be enough. If we use 2 (or 3 or even more) cups of rice, we should then increase the amount of water accordingly. Here are some possible ratios of rice and water: 1 1--2- :3 2:4 2.5:5 3:6 All of these ratios are equivalent and, of all of them, the ratio 1:2 (the one from the recipe book) is said to be in its simplest form. It is the most convenient to work with, as the numbers are small and easy to interpret. a Generally the ratio a:b (or --- ) is in its simplest form if both a and b are whole b numbers and it has been reduced to its lowest terms. WORKED Example 15 Express each of the following ratios in simplest form. a 24:8 b 3.6:8.4 c 1 4--9- :1 2--3THINK WRITE a Write the question. Divide both terms by the highest common factor (HCF) of 8. a 24:8 = 3:1 3 Write the question. Multiply both terms by 10 to obtain whole numbers. Divide both terms by the HCF of 12. b 3.6:8.4 = 36:84 = 3:7 1 Write the question. c 1 4--9- :1 2--3- 2 Change both terms into improper fractions. = 3 Multiply both terms by the lowest common denominator (LCD) of 9 to obtain whole numbers. = 13:15 1 2 b 1 2 c 13 -----9 : 5--3- Finding the ratio of two quantities As was discussed before, a ratio compares quantities that are measured in the same units. Therefore to find the ratio of two quantities, we first have to make sure that their units are the same. We then write the two numbers as a ratio and omit the units altogether, as they are not relevant anymore. Note that the order of the numbers in the ratio is important. Remember the example of the ratio of rice to water? When written as 1:2, it means ‘1 cup of rice for 2 cups of water’; when written as 2:1 however, it would mean ‘2 cups of rice for each 1 cup of water’. (The rice will most likely burn in this case!) Ch 01 GM 1&2 YR 11 Page 22 Wednesday, December 15, 1999 5:49 PM 22 General Mathematics Keeping this in mind, always write the numbers in the same order as they were given to you in the question when solving problems involving ratios. WORKED Example 16 Find the ratio of 2 hours to 112 minutes. Write your answer in simplest form. THINK 1 2 3 WRITE Convert 2 hours into minutes to make both units the same. Omit the units and write the two quantities as a ratio. (Keep the same order as in the question.) Simplify by dividing both terms by 8. 2 hours = 2 × 60 minutes = 120 minutes The ratio of 2 h to 112 min is 120:112 = 15:14 Dividing a quantity in a given ratio Here is a recipe for Chilli prawns. Ingredients 1 --- cup tomato sauce 4 1 red chilli, chopped 2 gloves garlic, crushed 1 teaspoon finely chopped ginger 6 shallots, chopped 500 g prawns 360 g cooked rice This recipe poses a problem, as it does not tell us how many cups of uncooked rice to use, but instead tells us the amount of the ready-made product, containing two ingredients (rice and water) in the ratio 1: 2. WORKED Example 17 Divide 360 g in the ratio 1: 2; hence state the amount of rice and water needed to prepare 360 g of cooked rice. THINK WRITE 2 Write the ingredients as a ratio. Count the number of parts. Rice:water = 1: 2 Number of parts = 1 + 2 =3 3 Find the size of each part. Each part = 4 Find the amount of rice needed. 5 Find the amount of water needed. 1 360 --------3 g = 120 g We need 1 part of rice; hence the amount of rice is 120 g. We need 2 parts, so 2 × 120 g = 240 g of water is needed. Ch 01 GM 1&2 YR 11 Page 23 Wednesday, December 15, 1999 5:49 PM Chapter 1 Arithmetic 23 remember 1. A ratio compares two (or more) quantities in the same units. 2. A ratio itself does not contain any units. 3. The ratio a:b is in the simplest form if both of its terms (a and b) are whole numbers and have been reduced to their lowest terms. 4. Order of numbers in the ratio is important. 5. To write the ratio of two quantities, convert them to the same units first, then put them as a ratio in the same order as they were given to you in the question and omit the units. 6. To divide a quantity in a given ratio, find the total number of parts, the size of one part and then the size of each share. WORKED Example 15b WORKED Example 15c 2 Express each of the following ratios in simplest form. a 1.2:0.2 b 3.9:4.5 c 9.6:2.4 e 1.8:3.6 f 4.4:0.66 g 0.9:5.4 i 6:1.2 j 12.1:5.5 k 8.6:4 4 --7 :2 g 5:1 1--2- h 2 3--4- :1 1--3- 4 multiple choice The ratio not equivalent to 3:5 is: C A 18:30 B 0.6:1 WORKED Example 16 2 --5 : 4--6- i 3 5--6- :2 1--2- D 2.1:3.5 e 3: 2--3j 1 3--5- : 6 4--8- E 1 --3 Ratios D 1:60 HEET 1.3 : 1--5- 5 Find the ratio of each pair of quantities and write the answer in the simplest form. a 5 cm to 20 cm b 12 mm to 1 cm c 2 m to 78 cm d 4.6 km to 400 m e 250 ml to 3 l f 504 kg to 1 tonne g 20 kg to 1050 g h $12 to 60 c i 4 month to 5 years j 18 min to 100 sec 6 multiple choice The ratio of 36 seconds to 6 hours is: A 36:6 B 6:1 C 1:6 L Spread XCE d 18:3.6 h 0.35:0.21 l 0.07:14 3 Write each of the following ratios in the simplest form. a 1 1--2- :2 b 2:1 3--4c 1 1--3- :2 d 1 2--5- :1 1--4f d 14:35 h 144:44 E 15a 1 Express each of the following ratios in the simplest form. a 12:18 b 8:56 c 9:27 e 88:66 f 16:60 g 200:155 i 32:100 j 800:264 sheet Example SkillS WORKED Ratios E 1:600 7 Divide each of the following quantities into the ratio given in brackets. a 270 kg (4:5) b 600 m (1:11) c 215l (2:3) d 5000 mm (3:5) e 420 g (4:3) f 3.6 tonnes (8:1) g $4000 (2:3:3) h 250 km (2:3:5) i 700 ml (2:3:9) j 48 h (11:3:2) HEET SkillS 1E 1.4 Ch 01 GM 1&2 YR 11 Page 24 Wednesday, December 15, 1999 5:49 PM 24 General Mathematics WORKED Example 17 8 Michelle is studying for her Maths and Science exams. She decides to divide the 8 hours that she has for study in a ratio 1:3. How many hours will Michelle study for each exam? 9 A brother and a sister are sharing a packet of chewing gum in the ratio 5:7. If a packet contains 60 pieces of chewing gum, how much will each receive? 10 Three friends, Lena, Vicky and Margaret, always order household goods in bulk from the home delivery service to save on costs to suit their families’ needs. They then divide the goods in the ratio 1:2:3. On one occasion, their order contained a carton of tissues (36 packets per carton) valued at $39.60 and a box of 240 garbage bags valued at $18. Find: a the number of packets of tissues each of the friends received b the number of garbage bags that each received c the total amount of money each has to contribute to pay for the order (the delivery is free). 11 Leon and Igor invested $18 000 and $22 000 respectively in International Independent shares. Calculate how they should divide a $3000 dividend if they agreed to share it in the ratio of their investments. 12 The angles of a quadrilateral are in the ratio of 3:4:4:5. Find the size of each angle and hence name this quadrilateral. 13 To make wholegrain bread with a bread-maker, I must use water, bread mix and yeast (in that order) in the ratio 35:50:1. If the total weight of the mixture is 0.86 kg, find the amount of each ingredient. Work ET SHE 1.2 14 The estimated volume of the earth’s salt water is about 1285 600 000 cubic kilometres. The estimated volume of fresh water is about 35 000 000 cubic kilometres. a What is the ratio of fresh water to salt water (in simplest form)? b Find the value of x, to the nearest whole number, when the ratio found in a is expressed in the form 1: x Ch 01 GM 1&2 YR 11 Page 25 Wednesday, December 15, 1999 5:49 PM Chapter 1 Arithmetic 25 Proportion A proportion is a statement about the equality of two ratios. Consider the following example. To make a cup of coffee a person combines 1 teaspoon of instant coffee and 2 teaspoons of sugar; hence the ratio of coffee and sugar is 1:2. Clearly, to make 3 cups of coffee, this person will use 3 times as much coffee and sugar, namely 3 teaspoons and 6 teaspoons respectively. The ratio in this case is 3:6. Obviously the two ratios are equivalent and hence can be written as a proportion: 1:2 = 3:6. This should be read as ‘1 is to 2 as 3 is to 6’. When three terms of a proportion are known, the fourth term can be found. WORKED Example 18 b 2 Rewrite each of the two ratios as fractions. 3 Solve for x: (a) Cross-multiply. (b) Divide both sides by 18. 1 Write the equation. 2 Rewrite each of the two ratios as fractions. 3 Solve for x: (a) Cross-multiply. (b) Divide both sides by 3. WRITE a x:4 = 9:18 x 9 --- = -----4 18 18x = 36 -----x = 36 18 x=2 b 3:10 = 7.2:x 3 7.2 ------ = ------10 x 3x = 72 -----x = 72 3 x = 24 L Spread XCE Ratios sheet The Maths Quest Excel file ‘Ratio’ may be used to solve problems like the one in the previous worked example. E Find the value of x in each of the following: a x:4 = 9:18 b 3:10 = 7.2:x THINK a 1 Write the equation. Ch 01 GM 1&2 YR 11 Page 26 Wednesday, December 15, 1999 5:49 PM 26 General Mathematics WORKED Example 19 Find the value of x in the proportion (x − 3):(x + 5) = 3:4. THINK 1 2 3 4 5 6 WRITE Write the question. Rewrite the ratios as fractions. Solve for x: cross-multiply. Expand. Subtract 3x from both sides and simplify. Add 12 to both sides and simplify. (x − 3):(x + 5) = 3:4 ( x – 3) 3 ----------------- = --( x + 5) 4 4(x − 3) = 3(x + 5) 4x − 12 = 3x + 15 4x − 3x − 12 = 3x − 3x + 15 x − 12 = 15 x = 15 + 12 x = 27 WORKED Example 20 If a set of 5 identical books costs $31.50, how much will 3 of these books cost? THINK 1 2 WRITE Since we are talking about the same books, the ratio of the number of books to the total cost will be equivalent; therefore a proportion can be formed. Remember to keep the number of books and the total cost in the same order for both ratios. Rewrite the ratios as fractions. 3 Solve for x. Cross multiply then divide both sides by 5. 4 Interpret the result. 5:31.50 = 3:x 5 3 ------------- = --31.50 x 5x = 31.5 × 3 31.5 × 3 x = ------------------5 x = 18.9 The total cost of three books is $18.90. remember 1. Proportion is a statement about the equality of two ratios. 2. When solving a proportion: (a) Write the two ratios as fractions. (b) Solve for x. 3. When forming a proportion, remember to keep the same order on both sides. Ch 01 GM 1&2 YR 11 Page 27 Wednesday, December 15, 1999 5:49 PM 27 Chapter 1 Arithmetic WORKED Example 1 Find the value of x for each of the following proportions. a x:2 = 9:4 b x:7 = 24:56 c x:3 = 21:9 e 4:x = 6:8 f 3:x = 9:8 g 5:9 = x:15 i 6:5 = 18:x j 4:11 = 22:x L Spread XCE d 6:x = 4:3 h 10:3 = x:12 Proportion 2 multiple choice If 5:70 = 9:x, the expression to use to find x is: 5 × 70 5×9 9 × 70 A --------------B -----------C --------------9 70 5 70 D -----------9×5 5 E --------------70 × 9 3 multiple choice If 4:x = 5:8, the expression which is not true is: 4 5 8 x 4×8 A --- = --B --- = --C x = -----------x 8 5 4 5 x 4 D --- = --5 8 E x×5=4×8 4 Form a proportion from the following numbers: 12, 3, 32 and 8. How many solutions are possible? WORKED Example 19 WORKED Example 20 5 Find the value of x in each of the following proportions. a (x + 6):(x − 2) = 12:5 b (x − 8):x = 3:8 c x:(x + 4) = 7:9 d (x − 5):(x + 7) = 3:10 e (x − 2):(x − 5) = 6:4 f (x + 3):5 = x:3 g (x − 6):4 = (x + 5):3 h (2x − 9):2 = (x − 3):12 i (7x − 3):(2x + 9) = 3:2 j (5 + 3x):9 = (4 − 2x):5 6 If 12 identical pens cost $11.64, how much would 5 such pens cost? 7 Two 100-g cans of tuna in spring water cost $2.70. How many such cans can be bought for $10.80? 8 A large box contains chocolate biscuits and shortbread biscuits in the ratio of 4:9. If there are 28 chocolate biscuits, find: a the number of shortbread biscuits b the total number of biscuits in the box. 9 The diagram at right shows a pair of similar triangles. If the lengths of the corresponding sides of similar triangles are in the same ratio, find the values of x and y. 12 9 5 x *10 Challenge For each of the following proportions find x, if x is a positive number. a x:5 = 45:x b (x + 2):2 = 9:(x − 1) c 3:(x − 5) = (x + 7):15 y 2.5 sheet 18 Proportion E 1F Ch 01 GM 1&2 YR 11 Page 28 Wednesday, December 15, 1999 5:49 PM 28 General Mathematics Gears and drive belts Proportions are also used in solving problems which involve gears and drive belts (or chains). The proportion used in the case of a gear drive (or a chain drive) is: Number of teeth on the driver Speed of the follower ----------------------------------------------------------------------- = --------------------------------------------------Number of teeth on follower Speed of the driver Note the inverse relationship between the number of teeth and the speed. Gear drive Chain drive The speeds of the driver and follower are measured in revolutions per minute (rpm). The proportion used in the case of the belt dive is: Diameter of the driver Speed of the follower ----------------------------------------------------------- = --------------------------------------------------Diameter of the follower Speed of the driver Belt drives 1 The driving wheel of a chain drive has 42 teeth and rotates at a speed of 600 rpm. Find the number of teeth of the follower if its speed is 400 rpm. 2 The driver of a belt drive has a diameter of 16 cm and rotates at a speed of 120 rpm. Find the speed of the follower if its diameter is 4 cm. 3 The follower of a belt drive has a diameter of 18 cm and rotates at a speed of 360 rpm. Find the speed of the driver if its diameter is 2.4 times larger than that of the follower. 4 The speed of the driver and the follower in a water pump are 800 rpm and 1200 rpm respectively. If the diameter of the driver is 24 cm, find the diameter of the follower. Ch 01 GM 1&2 YR 11 Page 29 Wednesday, December 15, 1999 5:49 PM Chapter 1 Arithmetic 29 Percentages The term per cent means per hundred. For instance, 29% means 29 parts out of 100. Any percentage can be changed into a fraction by dividing it by 100. WORKED Example 21 Write the following percentages as: a 12% b 10.3% c 76 3--8- % i common fractions THINK a i WRITE 1 To express 12% as a fraction, put it over a hundred and remove the % sign. 2 Simplify. a 1 b Put 10.3 over 100 and remove the % sign. ii Change the fractional part of the percentage --8- into a decimal by dividing the numerator by the denominator (3 ÷ 8). 3 3 -----25 i 10.3% = = Multiply the numerator and the denominator by 10 to get rid of the decimal point. ii Divide 10.3 by 100 by moving the decimal point 2 places to the left and removing the % sign. 1 12 --------100 ii 12% = 0.12 2 c i i 12% = = ii To write 12% as a decimal, divide it by 100 (that is, move the decimal point 2 places to the left) and remove the % sign. b i ii decimals. 10.3 ---------100 103 --------100 ii 10.3% = 0.103 c i 76 3--8- % = 76.375% 2 Put this over 100 and remove the % sign. = 76.375 ---------------100 3 Multiply the numerator and the denominator by 1000 to get rid of the decimal point. = 76 375 ------------------100 000 4 Simplify. = 611 --------800 1 Change the fractional part of the percentage into a decimal. Divide by 100 by moving the decimal point 2 places to the left and dropping the % sign. 2 ii 76 3--8- % = 76.375% = 0.763 75 Note: As was shown in the preceding example, a percentage can be a whole number (for example 76%), a common fraction (for example 1--4- %) or a decimal (for example 2.25%). When the percentage contains a fraction (for example 1--4- %) be careful not to confuse it with the common fraction (in this case, 1--4- , which is 25%). Ch 01 GM 1&2 YR 11 Page 30 Wednesday, December 15, 1999 5:49 PM 30 General Mathematics The table below contains percentages and corresponding fractions in everyday use. Knowing them by heart helps in solving problems as well as in many practical situations. % Fraction Decimal 1% 10% 12.5% 20% 25% 33 1--3- % 50% 1 --3 1 --2 1 --------100 1 -----10 1 --8 1 --5 1 --4 0.01 0.1 0.125 0.2 0.25 . 0.3̇ 0.5 66 2--3- % 100% 2 --3 . 0.6̇ 1 1.0 In order to change a percentage into a fraction we had to divide by 100 and remove the % sign. To change a fraction into a percentage, we need to do the opposite, that is, multiply the fraction by a 100 and add a % sign. WORKED Example 22 Express each of the following as a percentage. a 3 --7 b 1.02 THINK WRITE a a 1 2 Multiply the fraction by 100 and add a % sign. Change the improper fraction into a mixed number. 3 --7 = = 3 --- × 100% 7 300 --------- % 7 = 42 6--7- % b Multiply by 100 by moving the decimal b 1.02 = 1.02 × 100% point 2 places to the right and add a % sign. = 102% To find a percentage of a quantity, express the percentage as a fraction (either common, or a decimal) and multiply by that quantity. Remember that a percentage represents a certain part of a quantity, so the answer should be in the same units as the quantity in question. (That is, when finding a percentage of a certain amount in dollars, the result is in dollars; when the given quantity is in kilograms, the percentage of that quantity is also in kilograms.) WORKED Example 23 Find 23% of $72. THINK 1 2 WRITE Change 23% into a decimal fraction. Multiply by $72 and add a $ sign to the answer. 23% of $72 = 0.23 × 72 = $16.56 To express one quantity as a percentage of another, form a fraction from the two quantities and multiply by 100%. Remember to keep both quantities in the same units. Ch 01 GM 1&2 YR 11 Page 31 Wednesday, December 15, 1999 5:49 PM Chapter 1 Arithmetic 31 WORKED Example 24 Express 3 months as a percentage of 2 years. THINK WRITE 2 years = 2 × 12 months 1 Change years into months. = 24 months 2 Form a fraction from the two quantities and multiply it by 100%. 3 Evaluate. 3 -----24 × 100% = 300 --------- % 24 = 12.5% Career profile DA RREN BLOOD — Account Executive Qualifications: Completing Advanced Diploma in Business Marketing Employer: De Bortoli Wines Pty Ltd Company website: http://www.debortoli.com.au A s I have a passion for wines, I wanted to work in the wine industry and wrote letters to companies outlining my experience. A position was available at De Bortoli Wines and I have been there for about 5 years. I didn’t want an office job, and sales seemed to provide variety, challenge and opportunity. A typical day includes travelling to liquor stores to sell products, check stock and provide merchandise (T-shirts, caps, prints, aprons and so on). I conduct wine tastings for store customers and set up window displays. At the end of the day, sales are added up and faxed through to the warehouse. Calculations I need to perform which relate to using percentages include: 1. percentage discounts of wholesale prices of wine sold to liquor outlets — discounts apply with orders above a certain amount 2. percentage increases or decreases in monthly and yearly sales 3. setting yearly budgets based on the preceding year’s sales 4. calculating rebates — once a store has sold a certain amount, they receive a 2% rebate of monthly sales 5. using Excel spreadsheets to calculate which stores stock particular products 6. calculating sales tax (41%) and adding it to the wholesale price. Other calculations involve: 1. rounding off customers’ change to the nearest 5c 2. measurement — weights of bottles, size (dimensions) of pallets (64 cartons in a pallet and 12 bottles in a carton), different sized bottles — a magnum is 1.5 L and a jeraboam is 3L — and conversion of volume from millilitres (mL) to litres (L). I once took an order from a customer for 400 cartons when the customer meant to order 400 bottles. He was a little surprised when a semi-trailer delivered the stock the next day. Mathematical calculations are also very useful in analysing my total sales. I can check that I have been paid the right commission. Questions 1. List three ways Darren uses percentages in his work. 2. Calculate the sales tax on a particular carton of wine if the wholesale cost of each bottle is $8.50. 3. Find the rebate calculated by Darren for a store that has sold over its monthly quota with sales of $11 224.00. 4. Where could you complete an Advanced Diploma in Business Marketing? Ch 01 GM 1&2 YR 11 Page 32 Wednesday, December 15, 1999 5:49 PM 32 General Mathematics remember 1. To change a percentage into a fraction, divide it by 100 and omit the % sign. 2. To change a fraction into a percentage multiply it by 100%. 3. To find a percentage of a quantity, express the percentage as a fraction and multiply it by the given quantity. 4. To express one quantity as a percentage of another, form a fraction and multiply it by 100%. 1G WORKED Example 21 Mat d hca Percentages, fractions and decimals 1 Write the following percentages as: i common fractions ii decimals. a 15% b 27% e 7.3% f 19.8% i WORKED Example 22a WORKED Example 22b Percentages 10 3--5- % 44 1--2- % j c 58% g 42.06% d 112% h 100.75% k 67 1--2- % l 2 Change each of the following into percentages. 7 a 4--9b ----c 5--810 e 5 -----12 f 29 -----50 i 1 4--5- j 2 3--4- g 7 --8 3 Change each of the following into percentages. a 0.63 b 0.29 c 0.51 e 0.05 f 0.003 g 0.6 i 1.2 j 4.03 95 3--4- % d 2 --3 h 19 -----20 d 0.723 h 0.1998 4 Copy and complete the following table. Decimal Fraction Percentage a 0.18 b 7 --8 c 46% d 0.9 e 1 2--3- f 7.4% g 1.003 h i 32 -----40 3 15 -----% 20 Ch 01 GM 1&2 YR 11 Page 33 Wednesday, December 15, 1999 5:49 PM Chapter 1 Arithmetic WORKED Example 23 WORKED Example 24 5 multiple choice Which of the following is the same as 23 1--3- %? 7 C -------A 0.23 B 23.3 300 D 70 -----3 E 7 -----30 6 multiple choice Which of the following is the same as 1.06? 6 C 1 ----A 10.6% B 106% 10 D 160% E 6 --------100 7 Find the following, correct to 2 decimal places. a 12% of $400 b 8% of $75 d 67.5% of $46.50 e 17% of 22 m g 10.25% of 4060 kg h 128% of 3.5L j 0.7% of 74 mm c f i 8 Express the first quantity as a percentage of the second. a 5 of 20 b 7 of 35 c d 4 months of 1 year e 7 cm of 2 m f g 750 mL of 3 L h 12 g of 540 g i j 75 m of 2.5 km 33 45% of $2318 3% of 7 tonnes 54% of 765 mL 60 of 2000 245 kg of 3 tonnes 40 mm of 20 cm 9 Rachael scored 87 points on her French test out of a possible 90 points. What percentage is that? 10 In a kindergarten group of 24 children, 16 are boys. What percentage of the group are girls? 11 A secondhand-furniture shopkeeper purchased a coffee table at a street market for $40 and later sold it for $95. a Find the profit that she made. b Express the profit as a percentage of the purchase price. c Express the profit as a percentage of the selling price. Ch 01 GM 1&2 YR 11 Page 34 Wednesday, December 15, 1999 5:49 PM 34 General Mathematics Percentage change When a quantity is increased or decreased, we can compare the change with the original quantity by calculating the percentage change: change in quantity Percentage change = -------------------------------------------- × 100% original quantity WORKED Example 25 Over a period of 11 months, the price of Phonestra shares increased from $1.95 to $4.80 per share. Express the increase as a percentage of the original price. THINK 1 2 WRITE Increase = new price − original price = $4.80 − $1.95 = $2.85 in price Write the formula for percentage change. Percentage increase = increase --------------------------------------- × 100% original price (Since it is known that the price has increased, Find the increase in price per share in dollars. use ‘increase’ instead of ‘change’.) 3 Substitute $2.85 for increase and $1.95 for original price into the formula and evaluate. 2.85 = ---------- × 100% 1.95 = 146.15% WORKED Example 26 At the beginning of the school year a student purchased a new Maths book for $39.95 and sold it at the end of the same year for $15.00. Express the decrease in price as a percentage of the original price. THINK WRITE 1 Find the decrease in price of the book in dollars. 2 Write the formula for percentage change. (Since the book lessened in value, use ‘decrease’ instead of ‘change’.) 3 Substitute 24.95 for decrease and 39.95 for the original price into the formula and evaluate. Decrease = $39.95 − $15 = $24.95 decrease in price Percentage decrease = ---------------------------------------- × 100% original price 24.95 = ------------- × 100% 39.95 = 62.45% Sometimes we know the percentage by which the original quantity has to be changed and need to find the new quantity. In such cases the following simple algorithm should be used: 1. Find the increase (or decrease) in the required units. 2. Add the increase to (or subtract the decrease from) the original quantity. Ch 01 GM 1&2 YR 11 Page 35 Wednesday, December 15, 1999 5:49 PM Chapter 1 Arithmetic 35 WORKED Example 27 Find the new amount if $52 were to be: a decreased by 15% b increased by 10%. THINK WRITE a a Decrease = 15% of $52 1 Find the decrease in dollars. = 2 b 1 Subtract the decrease from the original quantity to find the new amount. Find the increase in dollars. Add the increase to the original quantity to find the new amount. × 52 = $7.80 New amount = original amount − decrease = $52 − $7.80 = $44.20 b Increase = 10% of $52 = 2 15 --------100 10 --------100 × 52 = $5.20 New amount = original amount + increase = $52 + $5.20 = $57.20 There is an alternative method to solve this type of problem. If the original quantity is treated as 100%, then decreasing it by 15% (part a) gives (100 − 15)% = 85%. Increasing it by 10% (part b), gives (100 + 10)% = 110% of the original quantity. So instead of finding the decrease/increase first and then subtracting/adding it to the original amount, we can find 85% and 110% of it respectively and thus obtain the answers: 85 110 --------- × 52 = $44.20 and --------- × 52 = $57.20 as before. 100 100 WORKED Example 28 After spending 15% of her money on magazines, a student has $25.50 left. Find the initial amount of money that she had. THINK 1 2 Identify the unknown. Express the remaining amount of money as the percentage of the initial amount in terms of x. 4 Form an equation by equating the expression for the remaining amount with the money that the student had left. Solve for x. 5 Write the answer. 3 WRITE Let the initial amount of money be x. The remaining amount of money = (100 − 15)% = 85% of the initial amount. ∴ Remaining amount = 85% of x or 0.85x. 0.85x = 25.5 x = 25.5 ÷ 0.85 = 30 Initially the student had $30.00. Ch 01 GM 1&2 YR 11 Page 36 Wednesday, December 15, 1999 5:49 PM 36 General Mathematics remember change in quantity 1. Percentage change = -------------------------------------------- × 100% original quantity 2. To find the new quantity when the percentage change (increase or decrease) is known, find the change in the required units and add to (or subtract from) the original quantity. 3. Always treat the original amount as 100%. 1H WORKED Example d hca Mat 25 Percentage change 1 Over a period of 5 years the price of a packet of long-life milk increased from 73c to $1.17. Express the increase as a percentage of the original price. 2 The amount of water in a tank increased from 250 L (before rain) to 400 L (after rain). Find the percentage increase. Percentage change WORKED Example 26 3 After 2 years, the price of a car purchased for $5700 had dropped to $1800. Express the decrease as a percentage of the original price. 4 The attendance at a meditation class decreased from 26 people at the first session to 18 people at the second session. Find the percentage decrease. 5 The table below shows the share prices of different companies on the first day of two consecutive months. For each company, identify whether there was an increase or decrease in price, find the amount of increase/decrease in dollars and express it as a percentage of the original price (to 2 decimal places). Price on 1.9.98 Price on 1.10.98 a BHT $12.82 $ 8.19 b Super Cole $ 5.14 $ 7.25 c $21.35 $19.00 d AMB $ 4.70 $ 5.76 e ANX Bank $ 9.52 $ 9.80 f Pronto Co $ 0.45 $ 0.61 g EIK Gold $25.40 $29.12 h Motors International $ 7.80 $ 7.06 i Optocom au $ 5.70 $ 4.98 j National Metro $18.28 $19.15 Company name SuNatCo Increase (I) or decrease (D)? Change of price ($) Percentage change Ch 01 GM 1&2 YR 11 Page 37 Wednesday, December 15, 1999 5:49 PM Chapter 1 Arithmetic WORKED Example 27 37 6 Find the new amount (correct to the nearest cent) for each of the following. a $27 increased by 12% b $45 decreased by 4% c $12.15 increased by 60% d $192.83 decreased by 37% e $586 decreased by 12.5% f $105.60 increased by 7.2% g $59 increased by 22 2--3- % h $1017.50 decreased by 20.46% 7 In country X the average lifespans for males and females increased from 72 years and 76 years by 2% and 3.5% respectively. Find the new average lifespans for males and females in that country. 8 multiple choice One style of refrigerator normally retails for $995.00, but during a ‘scratch and dent’ sale floor stock is reduced in price by 15%. A customer requests a further 10% discount on the sale price for a particular scratched refrigerator. The price the customer wishes to pay (to the nearest 5 cents) is: A $646.75 B $746.25 C $761.20 D $845.75 E $895.50 9 Lana is planning to buy a washing machine. She is given the following quotes for a certain model: a from Freddy Sparks: $780, less 10% if paying cash b from Beaufort Bulk: $730 when paying by cheque, or 5% less if paying cash. Which would be a better buy and by how much? (Assume that Lana is paying cash.) WORKED Example 28 10 After several weeks on a diet, a man’s weight decreased by 15% to 66.3 kg. Find the weight of the man before the diet. 11 Over a 12-month period the rental payments for a one-bedroom flat increased by 20% to $144 per week. Find the rental price before the increase. 12 After walking 20% of the way, a hiker is 14.4 km from his destination. Find the total length of the trip. answers 778 Answers -----3 a 8 23 24 -----b 2 61 72 1 d 3 ----23 27 f 57 ----35 21 e 8 ----31 4 a e 5 B 8 a 9 a 10 a b c 55 1--5- 12 0.062 Exercise 1F — Proportion 1 a 4.5 b 3 2 2--3- c 7 e 5 1--3- d 4.5 8 1--3- f g h 40 i 15 j 60.5 2 C 3 D 4 4 solutions: 3:12 = 8:32, 12:3 = 32:8; 3:8 = 12:32, 8:3 = 32:12 b 9700 c 10 d 73 f 450 6 A 7 E 50 b 40 $800 b $1033.55 35c × 30 = $10.50, so $10 is not enough It is really a bit over $1 for every 3 lollies, so it will be over $10 for 30 lollies. 11 a $24; $20 is not enough b 7 m 27 cm, which is 73 cm less than the length needed. 6 8 9 10 Investigation — Estimation errors Investigation — Gears and drive belts Shape a Approxi- Exact Estimate area mation area (to 4 dp.) error 130 183.4362 53.4362 471 497.6597 26.6597 5.4% 3.2 cm 10 cm c 16.9 cm 20 cm 196 209.7563 13.7563 f 4.5 g −38 6.6% a Underestimates, since error is positive b Estimates for b and c are very good but rounding to 1 significant figure in a has given a much lower approximate area. Exercise 1E — Ratios 1 a 2:3 b 1:7 c 1:3 d 2:5 e 4:3 f 4:15 g 40:31 h 36:11 i 8:25 j 100:33 2 a 6:1 b 13:15 c 4:1 d 5:1 e 1:2 f 20:3 g 1:6 h 5:3 i 5:1 j 11:5 k 43:20 l 1:200 b 8:7 c 2:3 d 28:25 e 9:2 3 a 3:4 f 2:7 g 10:3 h 33:16 i 23:15 j 16:65 4 E 5 a 1:4 b 6:5 c 100:39 d 23:2 e 1:12 f 63:125 g 400:21 h 20:1 i 1:15 j 54:5 6 E 7 a 120, 150 b 50, 550 c 86, 129 d 1875, 3125 e 240, 180 f 3.2, 0.4 g 1000, 1500, 1500 h 50, 75, 125 i 100, 150, 450 j 33, 9, 6 8 Maths 2 and Science 6 9 Brother 25, sister 35 10 a 6, 12, 18 b 40, 80, 120 c 9.60, 19.20, 28.80 11 1350, 1650 12 67.5, 90, 90, 112.5; Trapezium 13 350 g; 500 g; 10 g 14 a 175:6428 b 37 c 14 h $4.85 7 8 a 63 b 91 x = 3.75; y = 6 a 15 b 4 2 480 rpm 7 4 ----11 d 10 1--7- e 11 i 4.125 j 1 --3 c 8 3 150 rpm 4 16 cm Exercise 1G — Percentages 1 a i 3 -----20 ii 0.15 b i c i 29 -----50 ii 0.58 3 - ii 1.12 d i 1 ----25 e i 73 -----------1000 ii 0.073 f i g i 2103 -----------5000 ii 0.4206 3 - ii 1.0075 h i 1 -------400 i i 53 --------500 k i 27 -----40 29% 12.12mm 7.3 cm b 12.8 1 63 % estimation error 18.15mm b 5 a 7 5--7 ii 0.106 ii 0.675 27 --------100 99 --------500 ii 0.27 ii 0.198 j i 89 --------200 ii 0.445 l i 383 --------400 ii 0.9575 2 a 44 4--9- % b 70% c 62 1--2- % d 66 2--3- % e 41 2--3- % f 58% g 87 --12- % h 95% j b f j c 51% g 60% d 72.3% h 19.98% i 3 a e i 180% 63% 5% 120% 275% 29% 0.3% 403% 4 Decimal a 0.18 b 0.875 c 0.46 d 0.9 e 1.6 f 0.074 g 1.003 h 0.8 i 0.1515 Fraction Percentage 9 -----50 7 --8 23 -----50 9 -----10 1 2--3 37 --------500 3 1 ----------1000 32 -----40 303 -----------2000 18% 87 1--- % 2 46% 90% 166 2--- % 3 7.4% 100.3% 80% 3 -% 15 ----20 5 E 7 a 48 f 0.21 6 B b 6 c 1043.1 d 31.39 e 3.74 g 416.15 h 4.48 i 413.1 j 0.52 8 a 25% b 20% c 3% d 33 1--3- % e 3 1--2- % f 8 1--6- % g 25% h 2 2--9- % i 20% j 3%
