Drag numbers to the table so it shows a proportional relationship between x and y.
1.8
8
0.4
2.4
1.6
5
x
2
0.6
DRAG AND DROP AN ITEM HERE
1.5
DRAG AND DROP AN ITEM HERE
DRAG AND DROP AN ITEM HERE
Drag numbers to the table so it shows a proportional relationship between x and y.
Share
To show a proportional relationship between ( x ) and ( y ), we need to find pairs of values that maintain a constant ratio. A proportional relationship can be represented as ( frac{y}{x} = k ), where ( k ) is a constant.
Let’s evaluate the ( x ) values provided:
1. For ( x = 2 ) and find ( y ): The possible values of ( y ) can be calculated by ( y = k times x ). Testing with some chosen values from the options can help find matching pairs.
2. For ( x = 0.6 ): Similar calculation using the values to see which results maintain the ratio.
After testing different combinations:
– When ( x = 2 ), if we select ( y = 8 ), we have ( frac{8}{2} = 4 ).
– If ( x = 0.6 ), we can use ( y = 2.4 ) which results in ( frac{2.4}{0.6} = 4 ).
So, the completed table should look like this:
| ( x ) | ( y ) |
|——|——-|
| 2 | 8 |
| 0.6 | 2.4 |
You can choose any ( y ) value that satisfies the conditions. Always double-check that the ratio remains the same across the pairs!