A person plans a child’s birthday party and analyzes the cost to rent a bounce house from two different companies.
Part A
The linear model
y = 132h + 325 can be used to represent the total cost, y
, in dollars, to rent a bounce house from Company 1
for h
hours. If h > 0
, what is the meaning of the slope in the linear model?
Responses
For each hour that the bounce house is rented, the total cost decreases by
.
For each hour that the bounce house is rented, the total cost decreases by $ $ 132 .
For each hour that the bounce house is rented, the total cost decreases by
.
For each hour that the bounce house is rented, the total cost decreases by $ $ 325 .
For each hour that the bounce house is rented, the total cost increases by
.
For each hour that the bounce house is rented, the total cost increases by $ $ 132 .
For each hour that the bounce house is rented, the total cost increases by
.
1 answer
In the linear model \( y = 132h + 325 \), the slope is the coefficient of \( h \), which is 132.
This means that for each hour that the bounce house is rented, the total cost increases by $132.
Thus, the correct response is:
For each hour that the bounce house is rented, the total cost increases by $132.
1 answer
1 answer
1 answer
6 answers