11 Business Mathematics Quarter 1 – Module 3: Kinds of Proportion & Solving Problems Involving Kinds of Pro ortion Business Mathematics – Grade 11 Self-Learning Module (SLM) Quarter 1 – Module 3: Kinds of Proportion & Solving Problems Involving Kinds of Proportion First Edition, 2020 Republic Act 8293, section 176 states that: No copyright shall subsist in any work of the Government of the Philippines. However, prior approval of the government agency or office wherein the work is created shall be necessary for exploitation of such work for profit. Such agency or office may, among other things, impose as a condition the payment of royalties. Borrowed materials (i.e., songs, stories, poems, pictures, photos, brand names, trademarks, etc.) included in this module are owned by their respective copyright holders. Every effort has been exerted to locate and seek permission to use these materials from their respective copyright owners. The publisher and authors do not represent nor claim ownership over them. Development Team of the Module Writer: Jeanly M. Divinagracia, Sherwin P. Uy Editors: Sally A. Palomo, Joecel S. Rubinos, Adam Julian L. Che, Chery Lou F. Bacongco Reviewers: Zaida N. Abiera, Janice C. Antonio, Floramae A. Dullano, Johan Lee M. Osita Illustrators: Jeanly M. Divinagracia, Sherwin P. Uy, Maria Angelica T. Garcia Layout Artist: Sherwin P. Uy Cover Art Designer: Ian Caesar E. Frondoza Management Team: Carlito D. Rocafort, CESO V – OIC Regional Director Rebonfamil R. Baguio, CESO V – OIC Assistant Regional Director Crispin A. Soliven Jr., CESE – Schools Division Superintendent Levi B. Butihen – Assistant Schools Division Superintendent Gilbert B. Barrera – Chief, CLMD Arturo D. Tingson Jr. – REPS, LRMS Peter Van C. Ang-ug – REPS, ADM Jade T. Palomar – REPS, Mathematics Juliet F. Lastimosa – CID Chief Sally A. Palomo – Division EPS In- Charge of LRMS Gregorio O. Ruales – Division ADM Coordinator Zaida N. Abiera – Division EPS, Mathematics Printed in the Philippines by Department of Education – SOCCSKSARGEN Region Office Address: Telefax: E-mail Address: Regional Center, Brgy. Carpenter Hill, City of Koronadal (083) 2288825/ (083) 2281893 region12@deped.gov.ph Introductory Message This Self-Learning Module (SLM) is prepared so that you, our dear learners, can continue your studies and learn while at home. Activities, questions, directions, exercises, and discussions are carefully stated for you to understand each lesson. Each SLM is composed of different parts. Each part shall guide you step-bystep as you discover and understand the lesson prepared for you. Pre-test are provided to measure your prior knowledge on lessons in each SLM. This will tell you if you need to proceed on completing this module, or if you need to ask your facilitator or your teacher’s assistance for better understanding of the lesson. At the end of each module, you need to answer the post-test to self-check your learning. Answer keys are provided for each activity and test. We trust that you will be honest in using these. In addition to the material in the main text, Notes to the Teachers are also provided to the facilitators and parents for strategies and reminders on how they can best help you on your home-based learning. Please use this module with care. Do not put unnecessary marks on any part of this SLM. Use a separate sheet of paper in answering the exercises and tests. Read the instructions carefully before performing each task. If you have any questions in using this SLM or any difficulty in answering the tasks in this module, do not hesitate to consult your teacher or facilitator. Thank you. What I Need to Know This module was designed and written with you in mind. It is here to help you master the topic on kinds of proportion and solving problems involving kinds of proportion. The scope of this module permits it to be used in many different learning situations. The language used recognizes the diverse vocabulary level of students. The lessons are arranged to follow the standard sequence of the course. But the order in which you read them can be changed to correspond with the textbook you are now using. In this module, you will be able to: • identify the kinds of proportion and write examples for each. ABM_BM11RP-Ic-3 • solve problems involving direct, inverse and partitive proportion. ABM_BM11RP-If-4 Specifically, you are expected to: 1. define ratio and proportion and apply it in real life situations and 2. identify the kinds of proportion and write examples for each. 3. translate verbal statements involving proportions into mathematical statements; 4. describe direct, inverse and partitive proportions; and 5. solve problems involving direct, inverse and partitive proportion. What I Know Before we are going to proceed with our lesson, let me know first what you have learned about kinds of proportion from your previous lessons by answering the following questions. Direction: Read and understand the following problems carefully. Encircle the letter of the correct answer. 1. Which of the following is the relation between two numbers with the same kind? a. rate c. proportion b. ratio d. percentage 2. A basketball team won 15 games and lost 5 games. What is the ratio of the games won to the total games played? c. 3:4 a. 1:3 b. 3:1 d. 4:3 3. Which pair of ratios are proportional? a. 3 T shi rts for β±840; 6 T shir ts for β±1400 b. 16 points scored in 4 games; 48 points scored in 8 games c. 98 words typed in 3 minutes; 162 words typed in 5 minutes d. 15 computers for 45 students; 45 computers for 135 students 4. What proportion states that as “one variable increases, the other variable decreases”? c. partitive a. direct d. negative b. inverse 5. Which of the following is an example of direct variation? - a. 3:8 = 6:4 b. 4:3 = 40:30 - 2 c. 4:50 = 10:20 d. A:B:C = 2:3:5 6. Which that is a. b. c. d. concept is being involved when a whole portion is divided into parts proportional to the given ratio? direct inverse partitive combined 7. What kind of proportion states that an increase of one variable will also increase the other variable & the decrease in one will also decrease the other? a. direct b. inverse c. partitive d. combined 8. Which of the following is an example of indirect variation? a. 2:3 = 20:30 b. 3:8 = 6:4 c. 3:12 = 5:20 d. 4:20 = 6:30 9. The verbal phrase “the ratio of a number (x) and four added to two” is equivalent to which of the following mathematical statements? a. π₯: 4 + 2 b. π₯ = 4+ 2 c. d. π₯+2 4 π₯ 4 +2 10. Which is an example of an inverse proportion? a. 1ππ’πππ 3 π‘ππ’πππ π‘π = b. 3 πππ‘πππ 5 ππππππ = 20 c. d. π΅ 3 πππ¦π = 1π₯+ 2π₯+3 π₯ β±50 00 4 ππ’πππ π π ππππππ 3 π€ππππ 1 π€πππ = β±600.00 π₯ 11. Juanita spends her working hours (8 hours) in filing, typing, placing and receiving calls. If she approximately performs these functio ns in the ratio of 1:3:4, which among the mathematical statements best represents the time spent for each function? a. 8π₯ = 8 b. 1+3+ 4 π₯ c. 1π₯ + 3π₯ + 4π₯ = d. 12. Which a. b. =8 1 8 1π₯ + 3π₯ + 4π₯ = 8 of the following problems DOES NOT belong to the group? If 10 laptops cost β±200,000.00, then how much do 8 laptops cost? A basket of food is sufficient to feed 15 persons for 3 days. How many days would it last for 10 persons? boys sold garlands in the ratio of 2:3:4. Together they sold 225 Three c. garlands. How many garlands did each boy sell? d. How many tea bags (B) are needed to make 15 liters o f iced tea when eight tea bags are needed to make 5 liters of iced tea? 3 13. Carla will spend β± 3,920.00 for her birthday party if she will invite 14 guests. If the cost is directly proportional to the number of invited guests, how much will she spend if she will invite 56 guests? a. β±15,680.00 b. β±15,685.00 c. β±15,780.00 d. β±15,880.00 14. If 3 men can do a portion of a job in 8 days, how many men can do the same job in 6 days? a. 4 b. 5 c. 6 d. 7 15. If Mang Gorio wants to give β±5,000 to his four children in the ratio of 1:2:3:4 for their weekend allowance, how much will each of the four children receive? a. β±500: β±1,000: β±1,500: β±2,000 b. β±450: β±1,050: β±1,450: β±2,050 c. β±500: β±1,000: β±1,250: β±2,250 d. β±450: β±1,000: β±1,500: β±2,050 Lesson Kinds of Proportion 1 Hello! Do you know that the concept of proportion is very useful in every reallife situation especially in business? We can apply proportion to know and compare the price of every item sold in the market, or a piece of share in an inheritance and many others. What’s In To begin with, let us refresh your mind on the concept of ratio which is very essential in your learning on different kinds of proportion. Let’s take a look on it. Consider this example: Mila, Brenda, and Pauline decided to invest β±100,000.00 in a burger shop business along Fil Am Avenue, Fatima, General Santos City. The table shows the specific amount of their investment. - 5 Business Partner Amount of Investment Mila β±50 000 Brenda β±20 000 Pauline β±30 000 Questions: 1. What is the ratio of Mila’s investment to the whole investment? 2. What is the ratio of Brenda’s investment to the whole investment? 3. What is the ratio of Pauline’s investment to Mila’s investment? Answers: a. β±50,000: β±100,000 or 1:2 b. β±20,000: β±100,000 or 1:5 c. β±30,000: β±50,000 or 3:5 A RATIO is comparison of two numbers or measurement. The terms of the ratio are the numbers or measurements being compared. The expression 1:2 (read as “one is to two”), ½, 1÷2, indicate ratios. We are comparing the relationship between 1 and 2. When we are asked to give the ratio of Mila’s investment to the whole investment, the answer is β±50,000: β±100,000. Expressing it in simplified form, we get 1:2, where 1 represents her investment and 2 refers to the total investment. Examples: Express the following in terms of ratio: a. A certain store serves three flavors of ice cream: 4 parts strawberry, 6 parts mango, and 11 parts chocolate. Solution: The ratio of ice cream flavors is 4:6:11. b. A small merchandise has 12 female and 20 male employees. What is the ratio of female employees to male employees? Solution: The ratio of female employees to male employees is 3:5. Since there are 12 female employees and 20 male employees, we 3 12 4 3 have = · = . 20 4 5 5 Wow! You are already refreshed. Let us now proceed to the next part of this module. 6 What’s New This module focuses on the kinds of proportions and how these are applied into real life situations. But before we proceed, let us ponder first on the given activity below. Activity 1: Know Me First! Direction: State if the following equations and situations illustrates direct, inverse or partitive proportion. Write your answer under the kinds of proportion column. Situation Kinds of Proportion 1. 2:1 = 24:12 2. Girl : Boy = 4:5 3. The number of workers and the number of days to work Very good! You are now ready to discover more about proportion. What is It In this part of the module, you will learn about proportion and its kinds. Let us take a look on it. What is proportion? An equation showing two ratios that are equal is called a proportion. It can be written in two ways: 1. As Two Equal Fractions π: π = π: π 2. Using a Colon πππππ πΈπ₯π‘πππππ Since the two ratios are equal, the product of the means is equal to the product of the extremes. Illustrative Example 1: In the proportion 15:35 = x:70, what is x? 7 Solution: 15 35 = x 70 15 (70) = 35x 1050 = 35x 35 35 π = ππ Cross multiply 15 and 70 then 35 and x The product is divided by 35 to find x: Thus, π equals 30 . Illustrative Example 2: One (1) dozen of apples costs β±240. How much does three (3) dozens cost? Solution: 1 dozen of apples: cost of one dozen = 3 dozens of apples: cost of 3 dozens 1 dozen of apples = 3 dozens of apples β±240 per dozen π₯ 1π₯ = 3(240) x = 720 Thus, β±720 is the cost of 3 dozens of apple. Kinds of Proportion 1. Direct Proportion. It is the relationship between two variables when their ratio is equal to a constant value. Say, π¦ is directly proportional to π₯ when the equation takes the form: π¦ = ππ₯, where k is the constant term. In this proportion, an increase of one variable will also an increase of the other variable, and a decrease in one variable will also the decrease of the other. “Situations 1. The number of computers to the number of students. that illustrates 2. The number of plants to the total cost. direct 3. Your score in examination to your grade. proportion:” 15 computers for 45 students; 45 computers for 135 students. This can be written as Sample equation: ππ: ππ = ππ: πππ. The number of computers is directly proportional to the number of students since as the number of computer increases, the number of students also increases with the constant value of 3. Sample word problem: If 10 cactus plants cost β±2,000.00 then how much do 8 cactus plants cost? The total amount of sales is directly proportional to the number of cactus sold. We see that the greater the number of cactus, the higher is the total cost. Take a look on this ratio: Cactus: cost = cactus: cost 10:2000 = 8:π 8 If 10 cactus plants cost β±2,000.00, it is expected that the cost of 8 cactus plants will be lesser than β±2,000.00. In the problem, the number of cactus plants and total cost are directly proportional hence the more cactus you buy, the higher the cost will be or the lesser cactus you buy, the lower the cost. 2. Inverse or Indirect Proportion. It is the relationship between two variables when their product is equal to a constant value. Say, π¦ is inversely proportional to x when the equation takes the form: π¦ = π/π₯, where k is the constant term, or k=x*y. This means that the two values x and y are inversely or indirectly proportional to each other, such that if x increases then y decreases orif x decreases, y increases. “Situations that 1. The number of workers and the number of days to work Illustrate 2. The speed of a vehicle and the time of travel in a uniform distance Indirect proportion” 3. The pressure exerted in a confined as and its pressure Sample equation: 3 persons vs 6 persons: 1 day vs 2 days. This can be written as 3:6 = 1:2. The number of persons needed to do the work is inversely proportional to the number of days needed to finish the work. Since the number of persons needed to do the job increases, the number of working days should decrease. Sample word problem: In a Top Spray Bottle factory, 2 employees can manufacture 20 bottles of spray in one hour. How long will it take 5 people to manufacture 20 bottles? Take a look on this ratio: employee: employee = hour: hour 2:5 = π:1 If 2 employees can finish 20 bottles in one hour, then five employees will take less than an hour to manufacture 20 bottles. We see that more workers on a job would reduce the time to complete the task. 3. Partitive Proportion. A whole is divided into parts that is proportioned into equal or unequal ratios. ‘Situations that 1. Dividing inheritance to children. illustrates 2. The number of men and women who attended a partitive seminar. proportion’ 3. Allotment of salary into different expenses. Sample equation: child A: child B: child C = 2:3:3 9 Sample word problem: Karen wants to donate her collection of figurines to her four friends in the ratio of 1:3:3:5. She has a total of 96 figurines. If her best friend wants the most number of figurines, how many figurines will she get? Take a look on this ratio: Friend A: Friend B: Friend C: Friend D = 1:3:3:5 In the problem, the total number of figurines is partitioned or divided into unequal ratio of 1:3:3:5, thus making use of partitive proportions. Amazing! You did very well. What’s More Let us try to answer more challenging sets of problems and activities about ratio and kinds of proportion. Activity 2: Find Me! Direction: Give what is being asked in the following problem. All answers must be in simplified form. 1. Express the sentence into ratio: In selling personalized cakes, the cost of packaging is β±60.00 and the cost of ingredients is β±340.00. Answer: 2. Cheska participates in a baking contest. During the competition, Cheska made sure she put 2 cups of sugar and 4 eggs on every cake. What would be the ratio of the cups of sugar to the number of eggs if she baked 4 cakes? Answer: 3. Liza, Kathryn and Nadine are partners. Their capital balances are β±20,000.00 β±40,000.00 and β±30,000.00 respectively. What is their capital ratio? Answer: Activity 3: Tell Me More! Direction: Identify if the given problem illustrates a direct proportion, inverse proportion or partitive proportion. 1. An artisan bread maker uses 2,000 grams of flour to make 4 loaves of handcrafted bread. How many grams of flour is needed to make 2 loaves of bread? Answer: 2. If Mang Gorio wants to give β±5,000.00 to his four children in the ratio of 1:2:3:4 for their weekend allowance, how much will each of the four children receive? Answer: 3. It takes 4 mechanics to repair a car for 6 hours. How long will it take for 7 mechanics to do the repair, if they work at the same rate? Answer: 9 What I Have Learned Now that you’ve learned a lot from the very start of our module, let’s summarize our lesson from the very start by filling in the blanks with the correct statement. Activity 4: Lets Wrap It Up! 1. A ratio is between two numbers or measurement. 2. In the proportion . 3:5 = 6:10, the means are and 3. In direct proportion, if one variable increases the other variable 4. A number is inverse proportionate to another when one variable decreases, the other variable . 5. Speaking of partitive proportion, we are talking about a whole divided into . What I Can Do Here is another activity that will help you apply what you have learned about kinds of proportion. Activity 5: Choose Me Please! Direction: Choose the letter of the following real life situations and problems that illustrates direct, inverse and partitive proportion. Write your answer on the second column. - a. A school buys 4 gallons of juice for 50 kids. How many gallons do they need for 75 kids? b. Assuming they work at the same rate, how long will it take 2 housekeepers to clean an entire house if it takes 4 days for 8 housekeepers to clean it? c. If one US dollar is equivalent to β±49 pesos, how much is 50 US dollars if converted to peso? d. Amidst the community quarantine, Richard wants to donate 400 sacks of rice to the residents of barangay San Jose, Fatima and Calumpang in the ratio of ____________________________. How can many sacks of rice barangay Fatima e. 1:3:2. receive? Three men finish doing thewill interior designing of a house in 3 weeks. How many men are needed to finish the interior designing in a week? Kinds of Proportion Answer Direct Proportion Inverse Proportion Partitive Proportion 10 . Lesson 2 Solving Problems Involving Kinds of Proportion Hello! Do you still remember these lines, “if two ratios are equal, then their reciprocals are also equal” or “the product of the extremes is equal to the product of the means”? Right now, let us deal with these statements more in-depth as go through with this module. What’s In Let us review on the following terms using a concept map for you to better understand the lessons in this module. Activity 1: Refresh Your Mind Direction: Fill in the blanks with right word/s to make each statement correct. Base your answer on the illustrations below. 11 1. It is comparison of two numbers or measurement known as . 2. A relationship between two variables when their ratio is equal to a constant value is called 3. . represents a relationship of two values x and y such when x increases, then y decreases or vice versa. 4. A/an i s a ratio in which the two terms are different in units. 5. A whole is divided into parts that is proportioned into equal or unequal ratios refers to the Alright! You are now ready to explore kinds of proportion and solve real life problems. - What’s New How are you coping with our lesson? I hope you are curious about the following activities that we will discuss ing in this module. The next activity will test your readiness on pre requisite skills on translating verbal statements involving proportions into mathematical statements - Activity 2: Match It, Translate It! Direction: In this activity, you will: A. Match the following phrases translated into mathematical expressions or statements by connecting it through lines: Mathematical Expressions/Statements Verbal Sentences/Phrases 1. There are twice as many partners ( P) as corporations (L). A. π/π(π³ - π· ) + π 2. There are half as many profit ( P) as loss ( L). B. ππ· = π³ 3. The number of Php100 bills (L) is twice as many as Php500 bills ( P). 4. One less than twice the salaries of Pedro (P) & Lito (L) C. L = πP π D. π(π· + π³) - π ----- 5. Two more than half the difference of certain mobile phones sales (L) and power bank sales (P) E. π· = ππ³ 12 B. Translate the following problems to mathematical statement: Given Problem Mathematical Statement 6. It takes Andy 30 minutes to burn 200 calories in jogging. How long (T) will it take Andy to burn 400 calories? 7.How many tea bags (B) are needed to make 15 liters of iced tea when eight tea bags are needed to make 5 liters of iced tea? 8. Assuming they work at the same rate, how long (S) will it take 2 housekeepers to clean an entire house if it takes 4 days for 8 housekeepers to clean it? 9.Four machines can recopy 25000 books in 6 days. How many machines (M) are needed to copy 25000 books in 3 days? 10. Mr. Covito donated β±5,000.00 as a club fund for the upcoming ABM strand fair. The Accountancy Club, Business Club and Management Club will share the amount in the ratio of 2:3:5. How much (x) will each group receive? Great Job! Keep the fire burning! Let’s unlock some difficulties. What is It You are already knowledgeable in translating worded problems to mathematical statements. Now, let us process and classify those translated problems to the three (3) kinds of proportions. How do we recognize whether a given proportion problem involves a direct proportion, an inverse proportion, or a partitive proportion? The definitions below determine the kinds of proportion considering the following problem: 13 1.) If 10 laptops cost the number of β±200,000.00, then how much do 8 laptops cost? We see that the greater the number of laptops, the higher is the total cost (x). Setting up the ratio, we obtain: Given: Number of laptops: a= Total cost: 10 laptops b = β±200,000.00 c= 8 laptops d= x * 10 laptops for β± 200,000.00 Mathematical Statement: ∗ πΏπππ‘πππ βΆ π‘ππ‘ππ πππ π‘ = πΏπππ‘πππ βΆ π‘ππ‘ππ πππ π‘ 10 ππππ‘πππ 8 ππππ‘πππ = β±200,000.00 π₯ Solution: 10 200,000 = 8 π₯ 10π₯ = 8(200,000) 10π₯ 10 = 1,600,000 10 π = β±πππ, πππ In the problem, the number of laptops and total cost are directly proportional since the more laptops you buy, the higher is the cost or the lesser laptops you buy, the lower is the cost. Thus, the problem involves Direct Proportion. 2.) In a T-shirt factory, 5 employees can finish designing 20 T-shirts in two hours. How long will it take 10 people to design 20 T-shirts? We see that the more employees on a job, the lesser time (x) needed to finish the job. Setting up the ratio, we obtain: Given: No. of employees: Time spent: a= 5 employees b = 2 hrs. c = 10 employees d = x hrs. * 5 employees for 2 hours Mathematical Statement: * less ππππππ¦πππ βΆ more ππππππ¦πππ = ππππ π‘πππ βΆ πππ π π‘πππ 5 ππππππ¦πππ x 10 ππππππ¦πππ 2 hours 14 = Solution: 5 10 = x 2 5(2) = 10(x) 10 10x ____ = _____ 10 10 10 π₯= 10 π = π ππ. In the problem, the number of employees and time to finish the job are inversely/indirectly proportional since the more employees you hired, the lesser the time to spend to finish the job. Thus, the said problem involves Inverse/Indirect Proportion. 3.) Quarantina wants to donate her collection of figurines to her four friends in the ratio of 1:3:3:5. She has a total of 96 figurines. If her best friend wants the most number of figurines, how many figurines will she get? We see that the whole collection of figurines is being divided into parts (x) and distributed to them with specified ratio. Setting up the partition, we obtain: Given: Let x be the constant number of figurines 1x = number of figurines for her 1st friend 3x = number of figurines for her 2nd friend 3x = number of figurines for her 3rd friend 5x = number of figurines for her best friend (the most) 96 = total number of figurines Mathematical Statement: 1π₯ + 3π₯ + 3π₯ + 5π₯ = 96 Solution: 12π₯ = 96 12π₯ 96 = 12 12 π = π πππππππππ 5x = number of figurines for her 4th friend (the most) 5x = 5(8) = 40 figurines for her best friend When a whole is partitioned into equal or unequal ratios, such concept involves Partitive Proportion. In the problem, the total number of figurines is partitioned into the ratio of 1:3:3:5, thus making use of partitive proportions. 15 What’s More Alright! We have already unlocked your difficulties in classifying, differentiating and defining kinds of proportions. At this moment, be ready for our next activity. Here, your will be able to use what you have learned from our previous discussions. You can do this! Activity 3: Answer Me: Where do I belong? Direction: Solve the following problems and identify the kind of proportion involved. 1. An artisan bread maker uses 2,000 grams of flour to make 4 loaves of handcrafted bread. How many grams of flour is needed to make 2 loaves of bread? Solution Kind of Proportion: 2. It takes 4 mechanics to repair a car for 6 hours. How long will it take 7 mechanics to do the repair if they work at the same rate? Solution Kind of Proportion: 3. If Mang Orly wants to give β±5,000.00 to his four children in the ratio of 1:2:3:4 for their weekend allowance, how much is the least amount of allowance? Solution Kind of Proportion: 16 4. A box of pencil costs β±30 pesos. How much do 4 boxes cost? Solution Kind of Proportion: 5. Three men can finish doing the interior designing of a house in 3 weeks. How many men are needed to finish the interior designing in a week? Solution Kind of Proportion: What I Have Learned Now, let us summarize what you have learned. Let’s do this activity! Activity 4: Write About Me Direction: Write an essay briefly and concisely to process your knowledge on how to solve problems involving kinds of proportions. 1. What are the steps in solving problems involving direct proportions? __ __ __ __ __ __ __ __ __ __ _________________ _________________________________________ __ ________________________________________________________________________________ 2. What are the steps in solving problems involving indirect/inverse proportion __ __ __ __ __ __ __ __ __ __ __ __ __ __________ ____________________________________________ ________________________________________________________________________________ 17 3. What are the steps in solving problems involving partitive proportions? __________________________________________________________________________________ _ _ __ __ __ __ __ __ __ __ __ ____ ____ ___________ __________________________ _________________ What I Can Do Let us now apply what you have learned in solving problems involving kinds of proportion in real-life situations. Activity 5: I am Being Solved! Direction: Solve the following problems involving kinds of proportion. 1. The ratio of boys to girls in a badminton tournament game is 4:3. Mariel counted that there are 12 more boys than girls. How many boys and girls are there in the tournament? 2. It takes 3 salesmen 8 days to sell 5,000 boxes of soap. If 2 more salesmen are added, how long will it take them to sell the same number of boxes of soap? 3. Mr. Faustino allocates his monthly salary for bills, food, transportation, and other expenses at the ratio of 3:6:7:9, respectively. If he receives β± 28,450.00 each month, how much is his budget for food? 18 Assessment Now that we are about to end this module, let us assess your learnings by answering the following questions. Do your best in this test. Goodluck! Direction: Read and understand the following problems carefully. Encircle the letter of the correct answer. 1. A couple went out for a date and spent β±1,500 on dinner and β±400 at the movie theater. What is the ratio of peso spent on dinner and the total amount spent for a movie? a. 4:15 b. 15:4 c. 15:19 d. 19:15 2. A basketball team won 15 games and lost 5 games. What is the ratio of games lost to the total games won? a. 1:3 b. 1:4 c. 3:4 d. 4:3 3. Which a. b. c. d. pair of ratios are proportional? 3 laptops for β±66; 6 laptops for β±132 16 points scored in 3 games; 48 points scored in 6 games 98 words typed in 3 minutes; 162 words typed in 5 minutes 20 computers for 60 students; 40 computers for 130 students 4. What proportion states that as one variable increases, the other variable decreases? a. direct b. inverse c. partitive d. negative 5. Which a. b. c. d. of the following is an example of direct proportion? 3:18 = 9:6 6:30 = 5:25 10:3 = 15:2 15:5 = 6:18 6. What kind of proportion is involved between the time taken for a journey and the speed of the car at a uniform distance? a. direct b. c. d. inverse partitive combined 19 7. Which of the following is an example of partitive proportion? a. 6:9 = 18:3 b. 9:45 = 5:25 c. 20:4 = 40:80 d. Divide 200 into 1:4:5 8. What kind of proportion is involved when a whole portion is divided into parts that is proportional to the given ratio? a. direct b. inverse c. partitive d. combined 9. Which of the following problems represent an inverse proportion? a. Divide a 75 m rope into 4 with the ratio 1:2:5 :7. What is the measure of each rope? b. The exchange rate of peso to a dollar in 2019 is β±51.20 to $1. How much will you get for $8.50? c. Three men can complete a project in 6 weeks. How many men will be needed if the project is to be completed in a week? d. When Mrs. Reyes went to abroad for an educational tour, she noticed that each guide goes along with five tourists. If there are 5 guides, how many tourists would they bring around? - 10. Which of the following problems DOES NOT belong to the group? a. A government-donated food pack is sufficient to feed 15 persons for 3 days. How many days would it last for 10 persons? b. If 10 tablet-PC cost he number of β±100,000.00, then how much do 8 tablet-PCs cost? c. How many tea bags (B) are needed to make 10 liters of iced tea when eight tea bags are needed to make 5 liters of iced tea? d. Three boys sold rosary necklaces in the ratio of 2:3:4. Together they sold 225 rosary necklaces. How many rosary necklaces did each boy sell? 11. The verbal phrase “the ratio of a three and number (x) added to four” is equivalent to which of the following mathematical statements? π₯+4 a. 3 b. 3: π₯ + 4 c. π₯ = 3 + 4 d. 3 + 4 π₯ 12. Mr. Ramon allocates his monthly salary for bills, food, transportation, and other expenses at the ratio of 3:3:2:2. If he received β±28,450.00 last month, which among the mathematical statements represent an answer to solve the various allocations for payment? a. 10π₯ = β±28,450.00 b. 3π₯ + 3π₯ + 2π₯ + 2π₯ = 28,450.00 c. 3+3+2+2 π₯ = β±28,450.00 d. 3π₯ + 3π₯ + 2π₯ + 2π₯ = 28,450 00 1 20 13. Junjun will spend β±5,500.00 for his birthday party if he will invite 15 guests. If the cost is directly proportional to the number of invited guests, how much will it cost is he invites 30 guests? a. β±11,000.00 b. β±11,100.00 c. β±11,150.00 d. β±11,190.00 14. If 4 men can do a portion of a job in 9 days, how many men can do the same job in 6 days? a. 5 b. 6 c. 7 d. 8 15. If Mang Inasal wants to give β±10,000 to his four children in the ratio of 1:2:3:4 for their weekend allowance, how much will each of the four children receive? a. β±450: β±1,050: β±1,450: β±2,050 b. β±500: β±1,000: β±1,250: β±2,250 c. β±1,000: β±2,000: β±3,000: β±4,000 d. β±1,000: β±2,000: β±2,500: β±4,500 Good Job! You did well on this module! Keep going! Additional Activities Congratulations! You’re done with this module. I know you’ve learned a lot from different kinds of proportion. But for more additional activity, I want you to answer the given problem below as a preparation for your next module. Activity 1: Books Pa More! 1. Sean Matthew can read 10 books in 2 months. If he plans to read 30 books, how many months will it take him to finish them all? Activity 2: “My 3-2-1 Chart” Direction: Complete the 3-2-1 chart below. My 3-2-1 Chart Three things I found out: 1. 2. 3. Two interesting things: 1. 2. One question I still have: : 1. 21 Answer Key Reference Lopez, B.R., Lundag, L. Dagal, K.A. & Garces, I.J. (2016). Business Math Textbook. Quezon City: Vibal Group, Inc. pp.53 -69 22 DISCLAIMER This Self-learning Module (SLM) was developed by DepEd SOCCSKSARGEN with the primary objective of preparing for and addressing the new normal. Contents of this module were based on DepEd’s Most Essential Learning Competencies (MELC). This is a supplementary material to be used by all learners of Region XII in all public schools beginning SY 2020-2021. The process of LR development was observed in the production of this module. This is version 1.0. We highly encourage feedback, comments, and recommendations. For inquiries or feedback, please write or call: Department of Education – SOCCSKSARGEN Learning Resource Management System (LRMS) Regional Center, Brgy. Carpenter Hill, City of Koronadal Telefax No.: (083) 2288825/ (083) 2281893 Email Address: region12@deped.gov.ph 24