Determining the common denominator or least common multiple is the first step in creating two equivalent fractions with a least common denominator. In the first two examples, the denominators were 6 and 8, which you determined have an LCD of 24. To convert each, find a factor that when multi...
Add the numerators, but leave the denominator the same, once you have similar fractions. For example, 5/15 + 6/15 = 11/15 or 6/12 + 3/12 = 9/12. Simplify the answer, if necessary. The fraction 11/15 cannot be simplified, but 9/12 can be simplified to 3/4 by dividing both ...
To create equivalent fractions, divide the numerator and denominator by the common factors between the numerator and denominator to find equivalent fractions for any given fraction. For example, To find an equivalent fraction of \( \frac{24}{64} \) We must first determine the common factors of...
There are specific steps to follow when calculating equivalent fractions. Learn the steps to break up a number line correctly to find equivalent...
We will examine two example problems to illustrate how to make equivalent fractions. Example Problem 1: Making an Equivalent Fraction First, we will find the number required to multiply by the current denominator in order to make it 100. We can do this by dividing the desired denominator by ...
Which value should be in the numerator? How to think about fractions? **Updated** Seeing as I'm a dunce, I'm not quite satisfied with the provided answer, since I want to get a little bit more nitty gritty is how one should think about the numerator and denominator spe...
If you are asked to work out the product of two numbers, then you need to multiply the two numbers together. If you are asked to find the sum of two numbers, then you need to add the numbers together.
How do I convert recurring decimals to fractions? We’ll walk through this step by step below. Step 1: Write out the equation To convert a recurring decimal to a fraction, start by writing out the equation where (the fraction we are trying to find) is equal to the given number. Use ...
Become a Study.com member to unlock this answer! Create your account View this answer To find the reciprocal of any fraction, just flip that fraction over. Make the numerator of the original fraction the denominator of the reciprocal... See full answer below....
Before we move ahead with the understanding ofdividing fractions, it is important to recall some of the terms that are relevant to the division offractions. Like Fractions –Fractions that have the same denominator are called like fractions. For example, the fractions, $\frac{4}{9}$, $\frac...