Question
Linear Functions(1 point)
1. Tommy the cat is constantly stealing hair ties. At the start of the week, he had already stolen 5 hair ties. Each day, Tommy steals 3 more hair ties.
Part A: Write a linear equation that represents the total number of hair ties (h) based on the number of days that have passed (d).
h(d)=
ℎ
(
𝑑
)
=
Part B: Tommy would have stolen 32 hair ties after 9 days.
2. Penny earned a monetary reward for returning a lost puppy. She decides to spend $12 from the reward each week on treats for her own pets. After 4 weeks Penny has $134 left.
Part A: What is the slope and what is one point that we know?
m=
𝑚
=
a point that we know is (write your response as an ordered pair)
Part B: Write a linear equation that models the total money left, y, from her reward after x weeks.
y=
𝑦
=
(Write your answer in slope y-intercept form:y=mx+b
𝑦
=
𝑚
𝑥
+
𝑏
)
1. Tommy the cat is constantly stealing hair ties. At the start of the week, he had already stolen 5 hair ties. Each day, Tommy steals 3 more hair ties.
Part A: Write a linear equation that represents the total number of hair ties (h) based on the number of days that have passed (d).
h(d)=
ℎ
(
𝑑
)
=
Part B: Tommy would have stolen 32 hair ties after 9 days.
2. Penny earned a monetary reward for returning a lost puppy. She decides to spend $12 from the reward each week on treats for her own pets. After 4 weeks Penny has $134 left.
Part A: What is the slope and what is one point that we know?
m=
𝑚
=
a point that we know is (write your response as an ordered pair)
Part B: Write a linear equation that models the total money left, y, from her reward after x weeks.
y=
𝑦
=
(Write your answer in slope y-intercept form:y=mx+b
𝑦
=
𝑚
𝑥
+
𝑏
)
Answers
GPT-4o mini
Sure! Let's work through your questions step by step.
### Problem 1: Tommy the Cat and Hair Ties
**Part A: Write a linear equation.**
Tommy starts the week with 5 hair ties and steals 3 more each day. Therefore, the total number of hair ties \( h \) as a function of the number of days \( d \) is given by:
\[
h(d) = 3d + 5
\]
**Part B: Validate the statement that Tommy would have stolen 32 hair ties after 9 days.**
We can further analyze this by substituting \( d = 9 \) into the function.
\[
h(9) = 3(9) + 5 = 27 + 5 = 32
\]
So, after 9 days, Tommy indeed would have stolen 32 hair ties.
---
### Problem 2: Penny and Her Monetary Reward
**Part A: Determine the slope and known point.**
1. **Slope (m)**: Penny spends $12 each week, which indicates her spending rate is $-12 per week. Thus:
\[
m = -12
\]
2. **Known Point**: After 4 weeks, she has $134 left. This gives us the point:
\[
(4, 134)
\]
**Part B: Write a linear equation that models the total money left.**
Using the slope-intercept form \( y = mx + b \):
We already have \( m = -12 \) and we can use the point (4, 134) to find \( b \).
Substituting into the equation:
\[
134 = -12(4) + b
\]
Calculating:
\[
134 = -48 + b
\]
\[
b = 134 + 48 = 182
\]
So the linear equation that models the total money left \( y \) from her reward after \( x \) weeks is:
\[
y = -12x + 182
\]
To summarize:
1. Tommy the cat's hair ties:
- **Linear equation:** \( h(d) = 3d + 5 \)
2. Penny's monetary reward:
- **Slope:** \( m = -12 \)
- **Known point:** \( (4, 134) \)
- **Linear equation:** \( y = -12x + 182 \)
### Problem 1: Tommy the Cat and Hair Ties
**Part A: Write a linear equation.**
Tommy starts the week with 5 hair ties and steals 3 more each day. Therefore, the total number of hair ties \( h \) as a function of the number of days \( d \) is given by:
\[
h(d) = 3d + 5
\]
**Part B: Validate the statement that Tommy would have stolen 32 hair ties after 9 days.**
We can further analyze this by substituting \( d = 9 \) into the function.
\[
h(9) = 3(9) + 5 = 27 + 5 = 32
\]
So, after 9 days, Tommy indeed would have stolen 32 hair ties.
---
### Problem 2: Penny and Her Monetary Reward
**Part A: Determine the slope and known point.**
1. **Slope (m)**: Penny spends $12 each week, which indicates her spending rate is $-12 per week. Thus:
\[
m = -12
\]
2. **Known Point**: After 4 weeks, she has $134 left. This gives us the point:
\[
(4, 134)
\]
**Part B: Write a linear equation that models the total money left.**
Using the slope-intercept form \( y = mx + b \):
We already have \( m = -12 \) and we can use the point (4, 134) to find \( b \).
Substituting into the equation:
\[
134 = -12(4) + b
\]
Calculating:
\[
134 = -48 + b
\]
\[
b = 134 + 48 = 182
\]
So the linear equation that models the total money left \( y \) from her reward after \( x \) weeks is:
\[
y = -12x + 182
\]
To summarize:
1. Tommy the cat's hair ties:
- **Linear equation:** \( h(d) = 3d + 5 \)
2. Penny's monetary reward:
- **Slope:** \( m = -12 \)
- **Known point:** \( (4, 134) \)
- **Linear equation:** \( y = -12x + 182 \)