Is 572/885 and 67/958 Proportional?

Are you looking to find out whether 572/885 and 67/958 form a proportion? In this article we'll compare these two to determine if there is a proportional ratio between 572/885 and 67/958. Let's get to it!

Okay, so first off we are referring to this is a proportion, but it can also be considered a ratio. The question we are really asking here is whether 572/885 equals 67/958 in a different proportion. Let's look at it visually and use letters to explain how proportions work:

Now these look like fractions and we could call the top number of each a numerator and the bottom number of each the denominator but, when working with proportions we need to refer to them differently.

The numbers in the A and D positions are called the "extremes" and the numbers in the B and C position are called the "means".

So how do we know if 572/885 and 67/958 are proportional to each other? The core defining property of any proportion is that the product of the means is equal to the product of the extremes.

What does that mean? Well in simple terms it means A multiplied by D must equal B multiplied by C. You could also consider these ratios to be fractions and then simplify them down to their lowest terms and compare them. If they are equal, then they are proportional.

Let's first work out if A (572) x D (958) is equal to B (885) x C (67):

572 x 958 = 547976

885 x 67 = 59295

As we can see, 547976 does NOT equal 59295 so we can say that 572/885 and 67/958 are NOT proportional.

Let's also try this by reducing the two fractions/ratios down to their lowest terms and see if the resulting ratio is equal.

By reducing the two ratios down to their simplest/lowest form we can see that the simplest form of 572/885 is 572/885 and the simplest form of 67/958 is 67/958, so 572/885 and 67/958 are NOT proportional to each other.

That's all there is to it when comparing 572/885 and 67/958 to see if the ratios are proportional. The easiest method is to make sure the product of the "means" is equal to the product of the "extremes" by multiplying A and D and B and C to make the resulting number matches.

Hopefully this tutorial has helped you to understand how to compare fractions and you can use your new found skills to compare whether one fraction is greater than another or not!

Cite, Link, or Reference This Page

If you found this content useful in your research, please do us a great favor and use the tool below to make sure you properly reference us wherever you use it. We really appreciate your support!

Random List of Proportion Examples

If you made it this far you must REALLY like proportional ratio examples. Here are some random calculations for you: