A bean plant grows 2 Inches in 2 days. A strawberry plant grows 4 Inches in 5 days. Compare the two proportional relationships. Assume each plant is growing at a constant rate. (1 point)
The bean plant grows at a slower rate because it grows 2 inches while the strawberry plant grows 4 Inches.
The strawberry plant grows at a slower rate because it grows 0.8 inches per day while the bean plant grows 1 inch per day.
The strawberry plant has grown 2 inches more than the bean plant.
Both plants are growing every day.
The correct answer is: The strawberry plant grows at a faster rate because it grows 0.8 inches per day while the bean plant grows 1 inch per day.
The correct answer is:
The strawberry plant grows at a faster rate because it grows 4 inches in 5 days, while the bean plant only grows 2 inches in 2 days.
To compare the two proportional relationships, we need to compare how much each plant grows over the same amount of time.
Let's calculate the rate of growth for each plant:
For the bean plant, we know that it grows 2 inches in 2 days. To find the growth rate per day, we can divide the total growth (2 inches) by the number of days (2).
So, the bean plant grows at a rate of 2 inches / 2 days = 1 inch per day.
For the strawberry plant, we know that it grows 4 inches in 5 days. To find the growth rate per day, we can divide the total growth (4 inches) by the number of days (5).
So, the strawberry plant grows at a rate of 4 inches / 5 days = 0.8 inches per day.
Comparing the growth rates:
- The bean plant grows 1 inch per day.
- The strawberry plant grows 0.8 inches per day.
From this comparison, we can conclude that the bean plant grows at a faster rate than the strawberry plant, as it grows 1 inch per day compared to the strawberry plant's 0.8 inches per day.