Problems of the Week

Aug 10, 2024 | Harrow

Questions:

Level A Years 1-3:

Question: Liam is choosing his outfit for the first day of school. He can't decide between a red shirt, a blue shirt, and a yellow shirt. He also can't decide between a pair of jeans and a pair of corduroys. How many different outfits can Liam make with these shirts and pants?

Level B Years 3-6:

Question: Ashley needs to buy spiral notebooks for school. NoteMart sells 2 spiral notebooks for £1.50. A+ Stationery sells spiral notebooks for 85p each. Hank's Discount School Supplies sells 10 spiral notebooks for £8.00. Where should Ashley buy her notebooks if she wants the best deal?

Level C Years 6-8:

Question: It's 7:45 AM, and class starts at 8:05 AM. Lily can run 6 kilometres per hour. If Lily is 3 kilometres away from school, can she run to school in time? If so, how much time will she have to spare? If not, how late will she be?

Level D Year 9+:

Question: There are five algebra classes at East Grand Rapids High School. Camilla, Daniel, and Elijah are all taking algebra this year. If students are placed in classes at random, then what is the percent chance that Camilla and Daniel will be in the same algebra class, but Elijah will be in a different algebra class?





Answers and Solutions:

Level A:

Answer: 6 outfits 

Solution: We can solve this problem a few ways. Instead of mixing and matching and counting up the outfits one-by-one, we can reason that there are 3 shirts that Liam can wear with each pair of pants. So, there are 3 outfits with jeans + 3 outfits with corduroys = 6 outfits in total.

Level B:

Answer: NoteMart

Solution: Each notebook from NoteMart costs £1.50 ÷ 2 = 75p. Each notebook from A+ Stationery costs 85p. Each notebook from Hank's Discount School Supplies costs £8.00 ÷ 10 = 80p.

Level C:

Answer: Lily will be 10 minutes late

Solution: There are 20 minutes until class starts. Lily can run 6 kilometres in 60 minutes, which means she can run 1 kilometre in 60 ÷ 6 = 10 minutes. That means it'll take her 10 × 3 = 30

Level D:

Answer: 16%

Solution: There is a 100% chance that Camilla will be in any algebra class, a 5 = 20% chance that Daniel will be in the same class, and a $ = 80% chance that Elijah will be in one of the four other algebra classes. So, the percent chance that Camilla and Daniel will have the same algebra class but Elijah will not is 100% × 20% × 80% = 16%.