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)
Responses
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 grows at a slower rate because it grows 0.8 inches per day while the bean plant grows 1 inch per day.
The bean plant grows at a slower rate because it grows 2 inches while the strawberry plant grows 4 inches.
The bean plant grows at a slower rate because it grows 2 inches while the strawberry plant grows 4 inches.
Both plants are growing every day.
Both plants are growing every day.
The strawberry plant has grown 2 inches more than the bean plant.
The strawberry plant has grown 2 inches more than the bean plant.
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.
To compare the two proportional relationships, we need to calculate the rate of growth for each plant. To do this, we divide the total growth (in inches) by the number of days it took to reach that growth.
For the bean plant:
Rate of growth = Total growth / Number of days
Rate of growth = 2 inches / 2 days
Rate of growth = 1 inch per day
For the strawberry plant:
Rate of growth = Total growth / Number of days
Rate of growth = 4 inches / 5 days
Rate of growth = 0.8 inches per day
Comparing the rates of growth, we can see that the bean plant grows at a faster rate, with 1 inch per day, while the strawberry plant grows at a slower rate, with 0.8 inches per day.
So, the correct answer is: 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.