Use proportional relationships unit test

It seems like you may be looking for a way to assess understanding of proportional relationships, which are a common topic in mathematics. If you're preparing a unit test or a quiz on this topic, here are some sample questions and problems you could include, along with their answers:

Proportional Relationships Unit Test

Part A: Multiple Choice

1. Which of the following equations represents a proportional relationship? a) \(y = 3x + 4\)
   b) \(y = \frac{1}{2}x\)
   c) \(y = x^2\)
   d) \(y = 4 - x\)

   Answer: b) \(y = \frac{1}{2}x\)

2. If \(y\) is directly proportional to \(x\) and \(y = 12\) when \(x = 3\), what is the constant of proportionality (k)? a) 4
   b) 3
   c) 6
   d) 1

   Answer: c) 4 (since \(k = \frac{y}{x} = \frac{12}{3} = 4\))

3. Which of the following graphs represent a proportional relationship? a) A straight line that passes through the origin
   b) A parabola
   c) A straight line that does not pass through the origin
   d) A horizontal line

   Answer: a) A straight line that passes through the origin

Part B: Short Answer

4. Write an equation for a proportional relationship where \(y\) varies directly with \(x\) and the constant of proportionality is 5.

   Answer: \(y = 5x\)

5. If a car travels 60 miles in 1 hour, how far will it travel in 3.5 hours at the same speed? Use a proportional relationship to solve.

   Answer: If \(d\) is the distance and \(t\) is the time, then \(d = 60t\). So, for \(t = 3.5\): \[ d = 60 \times 3.5 = 210 \text{ miles} \]

Part C: Problem Solving

6. Jenny is buying oranges and bananas. The price of oranges is $3 per kg and the price of bananas is $2 per kg. If she buys a total of 5 kg of fruit and spends $12, how many kilograms of oranges and bananas does she buy?

   Answer: Let \(x\) be the kg of oranges and \(y\) be the kg of bananas. The system of equations is: \[ x + y = 5 \quad (1) \] \[ 3x + 2y = 12 \quad (2) \] From (1), \(y = 5 - x\). Substitute into (2): \[ 3x + 2(5 - x) = 12 \ 3x + 10 - 2x = 12 \ x + 10 = 12 \ x = 2 \] Then, \(y = 5 - x = 5 - 2 = 3\). So, she buys 2 kg of oranges and 3 kg of bananas.

7. A recipe requires 2 cups of flour for every 3 cups of sugar. If you have 8 cups of flour, how many cups of sugar do you need to maintain the ratio?

   Answer: The ratio of flour to sugar is \(2:3\). If \(F\) is flour and \(S\) is sugar, then: \[ \frac{F}{S} = \frac{2}{3} \] Let \(S\) be the amount of sugar needed: \[ \frac{8}{S} = \frac{2}{3} \] Cross-multiply: \[ 2S = 24 \ S = 12 \] You need 12 cups of sugar.

Conclusion

This test assesses comprehension of proportional relationships through various types of questions. You can adjust the complexity of the questions based on your students' proficiency levels. Good luck with your unit test!