If a bag contains 18 red, 6 yellow, 24 blue, and 8 white balloons, what is the part-to-whole ratio of white balloons to all balloons?
8/56 = 1/7
To find the part-to-whole ratio of white balloons to all balloons, we need to calculate the number of white balloons and then divide it by the total number of balloons.
The number of white balloons is 8.
To find the total number of balloons, we add up the number of each color:
18 red + 6 yellow + 24 blue + 8 white = 56 total balloons.
Now, we can calculate the ratio:
8 white balloons / 56 total balloons.
Simplifying the ratio, we get:
1 white balloon / 7 total balloons.
So, the part-to-whole ratio of white balloons to all balloons is 1:7.
To find the part-to-whole ratio of white balloons to all balloons, we need to determine the number of white balloons and the total number of balloons.
In this case, the number of white balloons is given as 8. To find the total number of balloons, we add up the number of each colored balloon:
18 red + 6 yellow + 24 blue + 8 white = 56 balloons.
So, the part-to-whole ratio of white balloons to all balloons is 8/56.
To simplify the ratio, we can divide both the numerator and denominator by their greatest common divisor, which is 8:
8 ÷ 8 / 56 ÷ 8 = 1/7.
Therefore, the part-to-whole ratio of white balloons to all balloons is 1 to 7, or 1/7.