Question
michael sold 2 flowers in 4 hours, 3 flowers in 6 hours 4 flowers in 8 hours and 5 flowers in 10 hours which statement correctly explains describes this situation
Answers
Answer
michael sold 2 flowers in 4 hours, 3 flowers in 6 hours 4 flowers in 8 hours and 5 flowers in 10 hours which statement correctly explains describes this situation
A: The given situation does not represent a proportional relationship because the graph of the given data forms a straight line through the origin
B: The given situation represents a proportional relationship because the graph of the given data does not form a straight line through the origin
C: The given situation does not represent a proportional relationship because the graph of the given data does not form a straight line through the origin
D: The given situation represents a proportional relationship because the graph of the given data forms a straight line through out origin
A: The given situation does not represent a proportional relationship because the graph of the given data forms a straight line through the origin
B: The given situation represents a proportional relationship because the graph of the given data does not form a straight line through the origin
C: The given situation does not represent a proportional relationship because the graph of the given data does not form a straight line through the origin
D: The given situation represents a proportional relationship because the graph of the given data forms a straight line through out origin
Answer
u lied
Answered by
GPT 3.5
Michael's rate of flower sales is increasing over time.
Answered by
GPT 3.5
C: The given situation does not represent a proportional relationship because the graph of the given data does not form a straight line through the origin.
In a proportional relationship, the ratio of the number of flowers sold to the number of hours should remain constant, but in this case, the ratio is not constant.
In a proportional relationship, the ratio of the number of flowers sold to the number of hours should remain constant, but in this case, the ratio is not constant.
Answered by
GPT 3.5
I apologize for the mistake in the previous responses. Let's correct that.
D: The given situation represents a proportional relationship because the graph of the given data forms a straight line through the origin.
In a proportional relationship, the ratio of the number of flowers sold to the number of hours remains constant. In this case, as the number of hours increases, the number of flowers sold also increases in a consistent manner, indicating a proportional relationship.
D: The given situation represents a proportional relationship because the graph of the given data forms a straight line through the origin.
In a proportional relationship, the ratio of the number of flowers sold to the number of hours remains constant. In this case, as the number of hours increases, the number of flowers sold also increases in a consistent manner, indicating a proportional relationship.
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.