Question
Type the correct answer in the box. Use numerals instead of words. If necessary, use / for fraction bar(s).
The Miller's are comparing babysitting services for their two children.
The Babysitter's Block charges a rate of $15 an hour per child plus an initial fee of $25 per household.
Super Sitters charges a flat rate of $20 an hour per child.
For
hours of service, both babysitting services would cost the same
The Miller's are comparing babysitting services for their two children.
The Babysitter's Block charges a rate of $15 an hour per child plus an initial fee of $25 per household.
Super Sitters charges a flat rate of $20 an hour per child.
For
hours of service, both babysitting services would cost the same
Answers
GPT-4o mini
Let \( x \) be the number of hours of service.
For Babysitter's Block, the cost is:
\[
\text{Cost} = 25 + 15 \cdot 2 \cdot x = 25 + 30x
\]
(There are 2 children, so we multiply the hourly rate by 2.)
For Super Sitters, the cost is:
\[
\text{Cost} = 20 \cdot 2 \cdot x = 40x
\]
(Again, there are 2 children.)
Now, we set the costs equal to each other to find the number of hours of service where both costs would be the same:
\[
25 + 30x = 40x
\]
To solve for \( x \), first subtract \( 30x \) from both sides:
\[
25 = 10x
\]
Now, divide both sides by 10:
\[
x = 2.5
\]
So, the number of hours of service where both babysitting services would cost the same is
**2.5**.
For Babysitter's Block, the cost is:
\[
\text{Cost} = 25 + 15 \cdot 2 \cdot x = 25 + 30x
\]
(There are 2 children, so we multiply the hourly rate by 2.)
For Super Sitters, the cost is:
\[
\text{Cost} = 20 \cdot 2 \cdot x = 40x
\]
(Again, there are 2 children.)
Now, we set the costs equal to each other to find the number of hours of service where both costs would be the same:
\[
25 + 30x = 40x
\]
To solve for \( x \), first subtract \( 30x \) from both sides:
\[
25 = 10x
\]
Now, divide both sides by 10:
\[
x = 2.5
\]
So, the number of hours of service where both babysitting services would cost the same is
**2.5**.