Emery bought 3 cans of beans that had a total weight of 2.4 pounds. If each can of beans weighed the same amount, which model co
rrectly illustrates the relationship? Check all that apply. y = 0.8 x y = 2.4 x y = 3 x Cans of Beans A 2-column table with 3 rows. Column 1 is labeled number of cans with entries 4, 12, 16. Column 2 is labeled total weight (in pounds) with entries 5, 15, 20. Cans of Beans A 2-column table with 3 rows. Column 1 is labeled number of cans with entries 5, 15, 20. Column 2 is labeled total weight (in pounds) with entries 4, 12, 16. Cans of Beans On a coordinate plane, the x-axis is labeled number of cans and the y-axis is labeled total weight (in pounds. A line goes through points (5, 4) and (15, 12). Cans of Beans On a coordinate plane, the x-axis is labeled number of cans and the y-axis is labeled total weight (in pounds. A line goes through points (3, 4) and (6, 8).
The 3 cans of beans had a total weight of 2.4 Pounds
Therefore:
1 can of beans = (2.4 ÷ 3) =0.8 Pounds
The following applies from the options.
y=0.8x where y is the weight and x is the number of cans.
A 2-column table with 3 rows. Column 1 is labeled number of cans with entries 5, 15, 20. Column 2 is labeled total weight (in pounds) with entries 4, 12, 16.
Using y=0.8x
When x=5, y=0.8 X 5=4
When x=15, y=0.8 X 15=12
When x=20, y=0.8 X 20=16
On a coordinate plane, the x-axis is labeled number of cans and the y-axis is labeled total weight (in pounds. A line goes through points (5, 4) and (15, 12). This can be clearly seen from the table above as (5,4) and (15,12) are points on the line.