Question
Alex and Jesse are baking muffins. On day one, they baked five muffins, on day two, they baked 11 muffins, and on day three, they baked 17 muffins. Write a linear function to represent the number of muffins (y)
(
π¦
)
successfully baked in x days.(1 point)
Responses
y=6x+1
π¦
=
6
π₯
+
1
y equals 6 x plus 1
y=16xβ1
π¦
=
1
6
π₯
β
1
y equals Start Fraction 1 over 6 End Fraction x minus 1
y=x+6
π¦
=
π₯
+
6
y equals x plus 6
y=6xβ1
(
π¦
)
successfully baked in x days.(1 point)
Responses
y=6x+1
π¦
=
6
π₯
+
1
y equals 6 x plus 1
y=16xβ1
π¦
=
1
6
π₯
β
1
y equals Start Fraction 1 over 6 End Fraction x minus 1
y=x+6
π¦
=
π₯
+
6
y equals x plus 6
y=6xβ1
Answers
GPT-4o mini
To find a linear function \(y\) that represents the number of muffins baked in \(x\) days, we start by analyzing the data given:
- Day 1: 5 muffins
- Day 2: 11 muffins
- Day 3: 17 muffins
We can note the number of muffins baked over each day:
- From Day 1 to Day 2: 11 - 5 = 6 muffins
- From Day 2 to Day 3: 17 - 11 = 6 muffins
This consistent increase of 6 muffins per day suggests a linear relationship.
Letβs define the linear function in the form \(y = mx + b\), where:
- \(m\) is the slope (the change in muffins per day),
- \(b\) is the y-intercept (the number of muffins at Day 0).
From our data:
- Slope \(m = 6\) (they bake 6 more muffins each subsequent day).
Now, to find the y-intercept \(b\), we can use one of our known points. Let's use Day 1 where \(x = 1\) and \(y = 5\):
\[
5 = 6(1) + b
\]
\[
5 = 6 + b
\]
\[
b = 5 - 6 = -1
\]
Putting it all together, the linear function is:
\[
y = 6x - 1
\]
Thus, the correct response is:
**y = 6x - 1**.
- Day 1: 5 muffins
- Day 2: 11 muffins
- Day 3: 17 muffins
We can note the number of muffins baked over each day:
- From Day 1 to Day 2: 11 - 5 = 6 muffins
- From Day 2 to Day 3: 17 - 11 = 6 muffins
This consistent increase of 6 muffins per day suggests a linear relationship.
Letβs define the linear function in the form \(y = mx + b\), where:
- \(m\) is the slope (the change in muffins per day),
- \(b\) is the y-intercept (the number of muffins at Day 0).
From our data:
- Slope \(m = 6\) (they bake 6 more muffins each subsequent day).
Now, to find the y-intercept \(b\), we can use one of our known points. Let's use Day 1 where \(x = 1\) and \(y = 5\):
\[
5 = 6(1) + b
\]
\[
5 = 6 + b
\]
\[
b = 5 - 6 = -1
\]
Putting it all together, the linear function is:
\[
y = 6x - 1
\]
Thus, the correct response is:
**y = 6x - 1**.