Ratios In general, a ratio is an expression that shows the relationship between two values. It tells us how much of one thing is there as compared to another. Show There are two “kinds” of ratios: “part to part” and “part to whole“. KINDS OR TYPES OF RATIOSPart-to-Part Ratio In a nutshell, the ratio of some value a to some value b is  Let’s take a look at an example: Suppose, there are three girls for every boy in a classroom. What is the ratio of the number of girls to the number of boys? We can represent the ratio in different ways.
NOTE: Be very careful though, because the order does matter in the “world” of ratio! The first object mentioned is written first in the notation, then the second object follows. From the example above, we already know the ratio of girls to boys. But how about when we reverse the order? For instance, what is the ratio of boys to girls? The word “boys” is mentioned first. Therefore we express the ratio with the number of boys first; followed by the number of girls. Let’s swap the images to emphasize what we’re driving at. Now we can express the ratio of boys to girls correctly.
Part-to-Whole Ratio When we talk about “part to whole” ratios, we need to add the parts together to get the whole. As you can see, the parts consist of the number of girls and boys which sum up to the whole or the total number of students. 3 girls + 1 boy = 4 students With this setup, it is now easy to come up with various kinds of ratios. Examples: Find the required ratios in three different formats. Remember that order matters!
Examples of Word Problems involving RatiosNow, let’s go over some word problems that require the concept of ratios. EXAMPLE 1: The ratio of girls to boys in a classroom is 3 to 1. How many boys are there in the classroom if it has 12 girls? One property of ratio is that we can scale it. Scaling a ratio means multiplying or dividing the numbers in a ratio by the same factor or quantity. Start by writing the given ratio of girls to boys as a fraction which is \Large{3 \over 1}. Since there are 12 girls in the classroom, we need to find a way somehow how to convert the numerator 3 to 12. In other words, find the scale factor that can transform 3 to 12. Obviously, multiplying 3 by 4 does the job! By multiplying the numerator of \Large{3 \over 1} by 4 means that we have to do the same with the denominator to get the number of boys. This gives us 4 boys in the classroom that has 12 girls. EXAMPLE 2: In a certain classroom, the ratio of boys to girls is 5 to 2. How many girls are in the classroom if the total number of students is 28? In this problem, we will need the concept of “part to whole” ratio because the total number of students in the classroom is given. What is 3 to 5 as a ratio?The ratio of a smaller number to a larger, of a part to the whole. This illustrates 3 out of 5: the ratio of the part, 3, to the whole, 5. The part is three fifths of the whole. (Here, "part" refers to whatever is less than the whole.)
How do you know if a ratio is partRatios can compare parts to parts. An example of a part to a part ratio is where the number of females in a class is compared to the number of males. If there are 8 females in a class of 20 the ratio of females to males is 8:12.
What is an example of a partPart-to-part ratios provide the relationship between two distinct groups. For example, the ratio of men to women is 3 to 5, or the solution contains 3 parts water for every 2 parts alcohol.
What is a 3 part ratio?To calculate a ratio of 3 numbers, we follow 3 steps: Step 1: Find the total number of parts in the ratio by adding the numbers in the ratio together. Step 2: Find the value of each part in the ratio by dividing the given amount by the total number of parts. Step 3: Multiply the original ratio by the value of each part.
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Is 3/5 a part to part ratio?
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