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This article was co-written by David Jia. David Jia is a tutoring teacher and founder of LA Math Tutoring, a private tutoring facility based in Los Angeles, California. With over 10 years of teaching experience, David teaches a wide variety of subjects to students of all ages and grades, as well as college admissions counseling and prep for SAT, ACT, ISEE, etc. scoring 800 in math and 690 in English on the SAT, David was awarded a Dickinson Scholarship to the University of Miami, where he graduated with a bachelor’s degree in business administration. Additionally, David has worked as an instructor in online videos for textbook companies such as Larson Texts, Big Ideas Learning, and Big Ideas Math.
This article has been viewed 5,838 times.
Two fractions are said to be equivalent if they have the same value. Knowing how to convert a fraction to its equivalent forms is a necessary math skill for everything from basic algebra to advanced math. This article will cover several ways to calculate equivalent fractions from basic multiplication and division to more complex methods for solving equations with equivalent fractions.
Steps
Creating Equivalent Fractions
- For example, if we take the fraction 4/8 and multiply both the numerator and denominator by 2, we get (4×2)/(8×2) = 8/16. These two fractions are equivalent.
- (4×2)/(8×2) is exactly the same as 4/8×2/2. Remember that when multiplying two fractions, we are multiplying horizontally, i.e. numerator by numerator and denominator by denominator.
- Note that 2/2 equals 1 when you do the division. Therefore, it is easy to see why 4/8 and 8/16 are equal because 4/8 × (2/2) still = 4/8. Likewise 4/8 = 8/16.
- Any fraction has an infinite number of equivalent fractions. You can multiply the numerator and denominator by any integer, large or small, to produce an equivalent fraction.
- For example, look back at the fraction 4/8. Instead of multiplying, we divide both numerator and denominator by 2, we get (4 ÷ 2)/(8 ÷ 2) = 2/4. 2 and 4 are both integers, so this equivalent fraction is valid.
Using Basic Multiplication to Determine Equivalence
- For example, get back the fractions 4/8 and 8/16. The smaller denominator is 8, and we will have to multiply that by 2 to get the larger denominator 16. So, the number to look for in this case is 2.
- For more complex numbers, you can simply divide the large denominator by the small denominator. In the above example 16 divided by 8, the result is 2.
- This number is not always an integer. For example, if the two denominators are 2 and 7, then 7 divided by 2 equals 3.5.
- For example, if we take the fraction 4/8 from step one and multiply both the numerator and the denominator by the 2 determined earlier, we have (4×2)/(8×2) = 8/16 . That proves that these two fractions are equivalent.
Using Basic Division to Determine Equivalence
- For example, take the fraction 4/8 above. The fraction 4/8 is equivalent to 4 divided by 8, 4/8 = 0.5. You can divide the other fraction like so, 8/16 = 0.5. Regardless of the form of the fraction, they are equivalent if the two numbers are equal when expressed as a decimal.
- Remember that representing it as a decimal can yield many digits before concluding that they are not equivalent. A basic example is 1/3 = 0.333… while 3/10 = 0.3. Just more than one digit, we see that these two fractions are not equivalent.
- For example the fraction 4/8. Instead of multiplying, we divide both numerator and denominator by 2, we get (4 ÷ 2)/(8 ÷ 2) = 2/4 . 2 and 4 are both integers so this equivalent fraction is valid.
- When a fraction is in its simplest form, its numerator and denominator are both as small as possible. You cannot divide them by any integer to get a smaller number. To convert a fraction to its simplest form, we divide the numerator and denominator by the greatest common factor .
- The greatest common factor of the numerator and denominator is the largest number that they are divisible by. So, in the 4/8 example, since 4 is the largest number that both 4 and 8 are divisible by, we’ll divide the numerator and denominator of this fraction by 4 to get the simplest form. (4 ÷ 4)/(8 ÷ 4) = 1/2 . In another example 8/16, GCF is 8, the result is also 1/2.
Using Cross Multiplication to Solve the Variable Finding Problem
- Take two examples, 4/8 and 8/16. These two fractions contain no variables, but we can show that they are equivalent. By cross multiplying, we get 4 x 16 = 8 x 8, or 64 = 64, which is obviously true. If these two numbers are not the same, then the fractions are not equivalent.
- For example, consider the following equation 2/x = 10/13. To cross multiply, we multiply 2 by 13 and 10 by x, then set these two results equal:
- 2 × 13 = 26
- 10 × x = 10x
- 10x = 26. By simple algebraic method we can find the variable x = 26/10 = 2.6 , then the two initial equivalent fractions are 2/2.6 = 10/13.
- For example, consider the following equation ((x + 3)/2) = ((x + 1)/4). As above, we solve by cross multiplying two fractions:
- (x + 3) × 4 = 4x + 12
- (x + 1) × 2 = 2x + 2
- 2x + 2 = 4x + 12, subtract both sides for 2x
- 2 = 2x + 12, to separate the variable we subtract both sides by 12
- -10 = 2x, and divide both sides by 2 to find x
- -5 = x
Using Quadratic Root Formula to Solve Variable Finding Equations
- For example, consider the following equation ((x +1)/3) = (4/(2x – 2)). Step 1, we cross multiply:
- (x + 1) × (2x – 2) = 2x 2 + 2x -2x – 2 = 2x 2 – 2
- 4 × 3 = 12
- 2x 2 – 2 = 12.
- Some values can be zero. Although 2x 2 – 14 = 0 is the simplest form of equation, its correct quadratic equation is 2x 2 + 0x + (-14) = 0. It will help. reflects the correct form of a quadratic equation even if some values are 0.
- x = (-b +/- √(b 2 – 4ac))/2a. In the equation, 2x 2 – 14 = 0, a = 2, b = 0, and c = -14.
- x = (-0 +/- √(0 2 – 4(2)(-14)))/2(2)
- x = (+/- √( 0 – -112))/2(2)
- x = (+/- (112))/2(2)
- x = (+/- 10.58/4)
- x = +/- 2.64
Advice
- Converting fractions to equivalent fractions is actually the form of multiplying them by 1. When converting 1/2 to 2/4, we are actually multiplying the numerator and denominator by 2, or the multiplication itself. 1/2 with 2/2, exactly equals 1.
- If desired, convert the mixed number to an irregular fraction to make the conversion easier. Obviously, not every fraction you come across is as easy to convert as our 4/8 example above. For example, mixed numbers (eg 1 3/4, 2 5/8, 5 2/3, etc.) can make the conversion a bit more complicated. If you need to convert a mixed number to an equivalent fraction, you can do it in two ways: convert the mixed number to an irregular fraction, then convert as usual, or keep the mixed form. and consider mixed numbers as the answer.
- To convert an irregular fraction, multiply the integer part of the mixed number by the denominator of the fractional part then add it to the numerator. For example, 1 2/3 = ((1 × 3) + 2)/3 = 5/3. Then, if you want, you can convert to equivalent fractions as needed. For example, 5/3 × 2/2 = 10/6 , which is still equivalent to 1 2/3.
- However, we do not need to convert to the non-canonical fraction form as above. Skip the integer part, convert only the fraction part, then add the integer part back to the converted fraction part. For example, for 3 4/16, we will only look at 4/16. 4/16 ÷ 4/4 = 1/4. Adding the integer part back, we have a new mixed number of 3 1/4 .
Warning
- Multiplication and division are used to produce equivalent fractions because multiplying and dividing by the fractional form of the number 1 (2/2, 3/3, etc.) by definition has no effect on the fractional value. initial. Adding and subtracting doesn’t do the same.
- Although you multiply the numerator and denominator together when multiplying fractions, you cannot add or subtract the denominator when adding or subtracting fractions.
- As the example above, we see that 4/8 ÷ 4/4 = 1/2. If we added 4/4 instead, the answer would be completely different. 4/8 + 4/4 = 4/8 + 8/8 = 12/8 = 1 1/2 or 3/2 , no answer equals 4/8.
This article was co-written by David Jia. David Jia is a tutoring teacher and founder of LA Math Tutoring, a private tutoring facility based in Los Angeles, California. With over 10 years of teaching experience, David teaches a wide variety of subjects to students of all ages and grades, as well as college admissions counseling and prep for SAT, ACT, ISEE, etc. scoring 800 in math and 690 in English on the SAT, David was awarded a Dickinson Scholarship to the University of Miami, where he graduated with a bachelor’s degree in business administration. Additionally, David has worked as an instructor in online videos for textbook companies such as Larson Texts, Big Ideas Learning, and Big Ideas Math.
This article has been viewed 5,838 times.
Two fractions are said to be equivalent if they have the same value. Knowing how to convert a fraction to its equivalent forms is a necessary math skill for everything from basic algebra to advanced math. This article will cover several ways to calculate equivalent fractions from basic multiplication and division to more complex methods for solving equations with equivalent fractions.
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