Equivalent Fractions For 2 5

Equivalent Fractions For 2 5 – Equivalent fractions can be defined as fractions that may have different numerators and denominators but represent the same value. For example, 9/12 and 6/8 are equal fractions because they both simplify to 3/4.

All equivalent fractions reduce to the same fraction in its simplest form, as shown in the example above. Study this lesson to get a better idea of ​​how to find equivalent fractions and check the equivalence of given fractions.

Equivalent Fractions For 2 5

Two or more fractions are equivalent when reduced to the same fraction. For example, the equivalent fractions of 1/5 are 5/25, 6/30, and 4/20, which when simplified form the same fraction, 1/5.

What Is An Equivalent Fraction

Equivalent fractions are defined as fractions that have the same value regardless of the numerator and denominator. For example, 6/12 and 4/8 both simplify to 1/2, which means they’re basically equivalent.

Example: 1/2, 2/4, 3/6, and 4/8 are equivalent fractions. Let’s see how their values ​​equal. We depict each of these fractions as circles with shaded parts. It can be seen that the shaded parts in all the figures represent the same part when viewed as a whole.

Here we can see that the amount of the shadow part is the same across all circles. So 1/2, 2/4, 3/6, and 4/8 are equal fractions.

Teaching Equivalent Fractions

Equivalent fractions can be written by multiplying or dividing both the numerator and the denominator by the same number. This is why these fractions are added to the same number when simplifying. Let’s understand two ways to create equivalent fractions:

To find equivalent fractions of any fraction, multiply the numerator and denominator by the same number. For example, to find the equivalent fraction 3/4, multiply the denominator 3 and the numerator 4 by the same number, say 2. So 6/8 is the equivalent part of 3/4. We can find some other equivalent fractions by multiplying the numerator and denominator of the given fraction by the same number.

To find equal fractions for any fraction, divide the numerator and denominator by the same number. For example, to find the equivalent part of 72/108, we first find their common factors. We know that 2 is a common factor of both 72 and 108. Therefore, the equivalent fraction 72/108 can be found by dividing the numerator and denominator by 2. So 36/54 is the equivalent fraction of 72/108. Let’s see how the fraction is simplified:

Teaching Fraction Concepts Using The Concrete Representational Abstract Sequence

Therefore, several equivalent fractions for 72/108 are 36/54, 18/27, 6/9, and 2/3. Here is 2/3 a simplified form of 72/108 because 2 and 3 have no common factor (other than 1).

To determine whether the given fractions are equal or not, we have to simplify them. To get equivalent numbers, both the numerator and the denominator can be configured to the point where they need to be integers. There are different ways to determine the equivalence of given fractions. some of them:

The denominators of fractions 2/6 and 3/9 are 6 and 9. The least common multiple for gamblers 6 and 9 is 18. Let’s multiply the denominators of both fractions by the appropriate numbers and turn them into 18. .

Fraction Equivalence Using Division (solutions, Examples, Videos, Homework, Worksheets, Lesson Plans)

We can see that both fractions are equivalent to the same fraction 6/18. Thus, the given fractions are equal.

Note: If the fractions are not equal, we can check if the fraction is large or small depending on the number of fractions produced. Hence, this method can also be used to compare fractions.

Let’s find the decimal form of the fractions 2/6 and 3/9 to see if they give the same value.

Equivalent Fractions Stock Illustrations

To determine the parity of 2/6 and 3/9, we cross them. Fractions are equivalent if both products are the same.

Let’s represent both the fractions 2/6 and 3/9 in the same picture and see if the shaded parts of the two are equal.

We can see that the shaded part of both circles represents the same value. In other words, it can be seen that the shaded parts in both figures represent the same part when viewed as a whole. Hence, the given fractions are equal.

Nelson International Maths Workbook 5 Answers By Hany Mufeid

Graphs and tables are often used to better represent concepts because they provide convenient reference for calculations and are easier to understand. Joining charts and tables, like the one below, make it easier for students to understand equivalent fractions. We use the table below to find equal fractions of 1/4.

If two or more fractions have the same value regardless of the numerator and denominator, they are called equivalent fractions. For example, 2/4 and 8/16 are equivalent fractions because they reduce to 1/2 when simplifying.

There can be many examples of equivalent fractions, such as the equivalent fractions 8/12 and 6/9, because they reduce to the same fraction (2/3) when simplified. Likewise, 4/7 and 28/49 are equal fractions.

Write Four Equivalent Fractions To Each Of The Following:2/73/82/5​

If the given fractions are simplified and become simple fractions, then they can be called equivalent fractions. In addition, there are other methods for determining the valency or valency of specific fractions. some of them:

If two fractions are equal, it means that they are equal to the same value, regardless of the different numerator and denominator. In other words, when simplified, it reduces to the same fraction.

Equivalent fractions help us add, subtract, multiply, divide and compare fractions, which helps us solve many problems in real time.

Equivalent Fractions Worksheets

An equivalent improper fraction refers to an equivalent fraction in an incorrect form. If the numerator of a fraction is greater than the denominator, the fraction is called an improper fraction. For example, 3/2 is an improper fraction equal to 9/6.

Any two fractions can be considered equal if they have the same value. There are various ways to determine the equivalence of fractions. The main way is to reduce it. If they are reduced to the same fraction, then they are equal.

Equivalent fractions can be written by multiplying or dividing both the numerator and the denominator by the same number. This is why these fractions reduce to the same number when simplifying. For example, we write a fraction equivalent to 2/3. Multiply the numerator and denominator by 4 and we get (2 x 4) / (3 x 4) = 8/12. Therefore, 8/12 and 2/3 are two equal fractions.

The Equivalent Fractions Of 25 On The Given Number Lines Are At:

To write the equivalent fraction of 6/8, multiply the numerator and denominator by 2, and we get (6 x 2) / (8 x 2) = 12/16. Therefore, 6/8 and 12/16 are equal fractions. Let’s take another equivalent fraction of 6/8, divide it by a simple number, say 2. After dividing the numerator and denominator by 2, we get (6 ÷ 2) / (8 ÷ 2) = 3 we can / 4. So, 6/8 and 3 / 4 two equal fractions.

To find equal fractions of 1/4, multiply the numerator and denominator by the same number. So we multiply it by 2, which is (1 x 2) / (4 x 2) = 2/8. Now multiply it by 3 to find another equivalent fraction for 1/4. This would be (1 x 3) / (4 x 3) = 3/12. So, we get two equivalent fractions of 1/4 which are 2/8 and 3/12.

To find equal fractions of 2/3, multiply the numerator and denominator by the same number. So we multiply it by 5, which is (2 x 5) / (3 x 5) = 10/15. Now multiply it by 6 to find another equivalent fraction for 2/3. This would be (2 x 6) / (3 x 6) = 12/18. So, we get two equivalent fractions of 2/3 which are 10/15 and 12/18. Course 1 Equivalent Fractions Warm-up List Factors list for each number. 1. 8 2. 10 3. 16 4. 20 5. 30 1, 2, 4, 8 1, 2, 5, 10 1, 2, 4, 8, 16 1, 2, 4, 5, 10, 20 1 , 2, 3, 5, 6, 10, 15, 30

Equivalent Fractions Learning Chart, 17

Course 1 Equivalent Fractions Enter lesson name here. At the end of the lesson, we will learn the following: We will explain what equivalent fractions are, and we will understand that each fraction has one fraction, which is called the simplest form Equivalent fractions find the simplest form of a fraction.

Course 1 Equivalent fractions written differently but representing the same value are equal fractions. Hence, they are equivalent fractions. 1 2 __ 2 4 __ 4 8 __ 12 24 48 = =

Course 1 Equivalent Fractions To get equivalent fractions, multiply or divide the numerator and denominator by the same number. If you multiply, you get a larger number of fractions.