this table represents the ratio of apples to dollars. think about how you have used tables to find equivalent ratios
number of apples: 5 10
cost ($) 1 2
how can you show that 5 to 1 is equivalent to 10 to 2?
5 ? = 10
1 ? = 2
To show that 5 to 1 is equivalent to 10 to 2, we can use tables to compare the ratios.
Number of apples: 5 / 10
Cost ($) : 1 / 2
To find the equivalent ratio, we can first divide the number of apples by the cost in each ratio:
5 / 1 = 5
10 / 2 = 5
Therefore, we can see that both ratios have the same value of 5. This shows that 5 to 1 is equivalent to 10 to 2.
this table represents the ratio of apples to dollars. think
about how you have used tables to find equivalent ratios
number of apples: 5 10
cost ($) 1 2
how can you show that 5 to 1 is equivalent to 10 to 2?
5 ? (x 2, x 5, / 2, /5) = 10
1 ? (x 2, x 5, / 2, /5) = 2
To show that 5 to 1 is equivalent to 10 to 2, you can use the same operations on both sides of the ratio and confirm that the ratio remains the same.
Starting with the ratio 5 to 1:
5 x 2 = 10
1 x 2 = 2
Therefore, the ratio 5 to 1 is equivalent to 10 to 2, as when you multiply both sides by 2, the ratio remains the same.
number of apples 5 10 35
cost 1 2 7
how can you show that 35 to 7 is equivalent to 5 to 1?
35 ? (x5, x7, /5, /7) = 5
7 ? (x5, x7, /5, /7) = 1
To show that 35 to 7 is equivalent to 5 to 1, you can use the operations on both sides of each ratio to confirm that they are equal.
Starting with the ratio 35 to 7:
35 / 5 = 7
7 / 5 = 1
Therefore, the ratio 35 to 7 is indeed equivalent to 5 to 1. When you divide both sides by 5, the ratio remains the same.