Question

How do you read $\dfrac{5}{8}$ as a ratio?

Answer 1

Hint: In the above question you were asked to read $\dfrac{5}{8}$ as a ratio. A ratio is a quantitative relation between two objects, in other words, you can say, the number of times one value contains within the other. Also, this is a proper fraction. So let us see how we can solve this problem.

Complete Step by Step Solution:
In the given question we have to read $\dfrac{5}{8}$ as a ratio. Actually $\dfrac{5}{8}$ is a ratio. You can say that all fractions are ratio’s expressions.
The numerator of $\dfrac{5}{8}$ is the first part of the ratio
The denominator of $\dfrac{5}{8}$ is the second part of the ratio
It can be concluded from the above statement that there are 5 parts of the first item for every 8 parts of the second item.
It simply means that for every 13 total parts, 5 parts of the first item is present in it
And for every 13 total parts, 8 parts of the second item is present in it.

Therefore, $\dfrac{5}{8}$ can be read as 5: 8 in ratio.

Note:
In the above solution, we get to know about the quantitative relation of ratio. Also, we concluded 13 as the total ratio because by adding both the first and second part that is 5 and 8, we get 13. The sum of the ratio is very important in finding the proportion.