Determine if the situation represents proportioncel relationships.Explain.

1. Maggie makes $6 per hour babysitting.
(My answer was yes because per is showing a proportioncel relationship)
2. Gina can buy 1bottle of shampoo for 2.95 and 2 bottles for 4.50.
(My answer is no because this is showing a unit rate)
I clearly need help xD

*Proportional. Not proportioncel

a proportion needs to indicate equality between two ratios (or fractions)

#1. Not enough data
#2. no, because 1/2.95 ≠ 2/4.50

The most basic help you need is to re-read the definition of a proportion.

To determine if the situations represent proportional relationships, we need to understand what a proportional relationship is. A proportional relationship exists when two quantities have a constant ratio.

Let's analyze each situation:

1. Maggie makes $6 per hour babysitting.
In this situation, the relationship is proportional because the amount of money earned is directly proportional to the hours worked. Maggie makes $6 for every hour she babysits, which means the ratio of money earned to the number of hours worked remains constant (in this case, $6 per hour). Thus, the situation represents a proportional relationship.

2. Gina can buy 1 bottle of shampoo for $2.95 and 2 bottles for $4.50.
In this situation, the relationship does not represent a proportional relationship but rather a unit rate. To determine this, we compare the prices of 1 bottle and 2 bottles of shampoo. We find that the price of 2 bottles ($4.50) is not exactly double the price of 1 bottle ($2.95). The ratio of the prices changes, meaning the relationship is not constant. Therefore, this situation does not represent a proportional relationship.

To summarize, the first situation represents a proportional relationship because the ratio remains constant, while the second situation does not represent a proportional relationship because the ratio changes.