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)
To compare the two proportional relationships, we can calculate the rate of growth for each plant.
The rate of growth for the bean plant is found by dividing the change in height (2 inches) by the number of days (2 days): 2 inches / 2 days = 1 inch/day.
Similarly, the rate of growth for the strawberry plant is found by dividing the change in height (4 inches) by the number of days (5 days): 4 inches / 5 days = 0.8 inches/day.
Comparing the two rates of growth, we can see that the bean plant grows at a faster rate (1 inch/day) compared to the strawberry plant (0.8 inches/day). So the bean plant is growing faster than the strawberry plant.
Last week, Malika’s cat slept 18 hours each day. Her baby slept 91 hours total for the week. Compare the proportional relationship of the number of hours the cat and baby sleep each day.(1 point)
To compare the proportional relationship of the number of hours the cat and baby sleep each day, we need to calculate their average daily sleep hours.
The cat slept 18 hours each day for a week, so the average daily sleep of the cat is 18 hours / 7 days = 2.57 hours/day (rounded to two decimal places).
The baby slept 91 hours total for the week, so the average daily sleep of the baby is 91 hours / 7 days = 13 hours/day (rounded to two decimal places).
Comparing the two average daily sleep hours, we can see that the baby sleeps for a significantly longer time (13 hours/day) compared to the cat (2.57 hours/day). Therefore, the baby sleeps much more than the cat per day.
Use the tables to answer the question. Company A Hours of Work Pay ($) 5.5 140.25 22.0 561.00 35.0 892.50 40.0 1,020.00 Company B Hours of Work Pay ($) 4.0 114.00 10.6 302.10 20.5 584.25 35.0 997.50 Based on the tables showing what two leading gas brands pay employees, compare which company pays the higher rate. Which answer provides the correct company and hourly rate? (1 point) Responses Company A has the best hourly rate of $1,020/40 hours. Company A has the best hourly rate of $1,020/40 hours. Company B has the best hourly rate of $997.50/40 hours. Company B has the best hourly rate of $997.50/40 hours. Company B has the best hourly rate of $28.50/hour. Company B has the best hourly rate of $28.50/hour. Company A has the best hourly rate of $25.50/hour.
To compare the two proportional relationships, we can calculate the rate of growth for each plant.
For the bean plant, it grows 2 inches in 2 days. So, the rate of growth can be calculated as 2 inches / 2 days = 1 inch/day.
For the strawberry plant, it grows 4 inches in 5 days. So, the rate of growth can be calculated as 4 inches / 5 days = 0.8 inches/day.
Comparing the two rates of growth, we can see that the bean plant has a faster growth rate (1 inch/day) compared to the strawberry plant (0.8 inches/day).
To compare the two proportional relationships, we need to determine the rate at which each plant grows.
Let's start with the bean plant. We know that the bean plant grows 2 inches in 2 days. To find the rate, we divide the change in height (2 inches) by the change in time (2 days):
Rate of bean plant growth = 2 inches / 2 days = 1 inch/day
Now let's analyze the strawberry plant. We are given that the strawberry plant grows 4 inches in 5 days. Again, we can find the rate by dividing the change in height (4 inches) by the change in time (5 days):
Rate of strawberry plant growth = 4 inches / 5 days = 0.8 inches/day
By comparing the rates, we can see that the bean plant grows at a faster rate (1 inch/day) compared to the strawberry plant (0.8 inches/day). Therefore, the proportional relationship of the bean plant's growth is greater than that of the strawberry plant.