3 Easy Steps to Multiply and Divide Fractions with Unlike Denominators

When encountering fractions with totally different denominators, referred to as not like denominators, performing multiplication and division could appear daunting. Nevertheless, understanding the underlying ideas and following a structured method can simplify these operations. By changing the fractions to have a standard denominator, we will remodel them into equal fractions that share the identical denominator, making calculations extra simple.

To find out the frequent denominator, discover the least frequent a number of (LCM) of the denominators of the given fractions. The LCM is the smallest quantity that’s divisible by all of the denominators. As soon as the LCM is recognized, convert every fraction to its equal fraction with the frequent denominator by multiplying each the numerator and denominator by acceptable components. As an example, to multiply 1/2 by 3/4, we first discover the LCM of two and 4, which is 4. We then convert 1/2 to 2/4 and multiply the numerators and denominators of the fractions, leading to 2/4 x 3/4 = 6/16.

Dividing fractions with not like denominators follows an analogous precept. To divide a fraction by one other fraction, we convert the second fraction to its reciprocal by swapping the numerator and denominator. For instance, to divide 5/6 by 2/3, we invert 2/3 to three/2 and proceed with the multiplication course of: 5/6 ÷ 2/3 = 5/6 x 3/2 = 15/12. By simplifying the ensuing fraction, we acquire 5/4 because the quotient.

The Fundamentals of Multiplying and Dividing Fractions

Understanding Fractions

A fraction represents part of an entire. It consists of two numbers: the numerator, which is written on prime, and the denominator, which is written on the underside. The numerator signifies what number of components are being thought of, whereas the denominator signifies the whole variety of components in the entire. For instance, the fraction 1/2 represents one half out of a complete of two components.

Multiplying Fractions

To multiply fractions, we multiply the numerators after which multiply the denominators. The product of the fractions is a brand new fraction with the multiplied numerators because the numerator and the multiplied denominators because the denominator. As an example:

“`
(1/2) x (3/4) = (1 x 3) / (2 x 4) = 3/8
“`

Dividing Fractions

To divide fractions, we invert the second fraction (flip the numerator and denominator) after which multiply. The reciprocal of a fraction is discovered by switching the numerator and denominator. For instance:

“`
(1/2) ÷ (3/4) = (1/2) x (4/3) = 2/3
“`

Simplifying Fractions

After multiplying or dividing fractions, it could be essential to simplify the consequence by discovering frequent components within the numerator and denominator and dividing by these components. This will scale back the fraction to its easiest type. For instance:

“`
(6/12) = (1 x 2) / (3 x 4) = 1/2
“`

Operation	Instance
Multiplying Fractions	(1/2) x (3/4) = 3/8
Dividing Fractions	(1/2) ÷ (3/4) = 2/3
Simplifying Fractions	(6/12) = 1/2

Discovering the Least Widespread A number of (LCM)

To multiply or divide fractions with not like denominators, it’s essential to first discover the least frequent a number of (LCM) of the denominators. The LCM is the smallest optimistic integer that’s divisible by all of the denominators.

To search out the LCM, you should use the Prime Factorization Technique. This technique includes expressing every denominator as a product of its prime components after which figuring out the best energy of every prime issue that seems in any of the denominators. The LCM is then discovered by multiplying collectively the best powers of every prime issue.

For instance, let’s discover the LCM of 12, 15, and 18.

12 = 2² x 3

15 = 3 x 5

18 = 2 x 3²

The LCM is 2² x 3² x 5 = 180.

Multiplying Fractions with Not like Denominators

Multiplying fractions with not like denominators requires discovering a standard denominator that’s divisible by each authentic denominators. To do that, comply with these steps:

Discover the Least Widespread A number of (LCM) of the denominators. That is the smallest quantity divisible by each denominators. To search out the LCM, you may record the multiples of every denominator and establish the smallest quantity that seems in each lists.
Multiply the numerator and denominator of every fraction by the issue essential to make the denominator equal to the LCM. For instance, if the LCM is 12 and one fraction has a denominator of 4, multiply the numerator and denominator by 3.
Multiply the numerators and denominators of the fractions collectively. The product of the numerators would be the new numerator, and the product of the denominators would be the new denominator.

Instance: Multiply the fractions $\frac{1}{3}$ and $\frac{2}{5}$ .

The LCM of three and 5 is 15.
Multiply $\frac{1}{3}$ by $\frac{5}{5}$ to get $\frac{5}{15}$ .
Multiply $\frac{2}{5}$ by $\frac{3}{3}$ to get $\frac{6}{15}$ .
Multiply the numerators and denominators of the brand new fractions: $\frac{5 \cdot 6}{15 \cdot 15} = \frac{30}{225}$ .

Fraction	Issue	End result
$\frac{1}{3}$	$\frac{5}{5}$	$\frac{5}{15}$
$\frac{2}{5}$	$\frac{3}{3}$	$\frac{6}{15}$

Subsequently, $\frac{1}{3} \cdot \frac{2}{5} = \frac{30}{225}$ .

Decreasing the End result to Easiest Kind

To cut back a fraction to its easiest type, we have to discover the best frequent issue (GCF) of the numerator and the denominator after which divide each the numerator and the denominator by the GCF. The consequence would be the easiest type of the fraction.

For instance, to scale back the fraction 12/18 to its easiest type, we first discover the GCF of 12 and 18. The GCF is 6, so we divide each the numerator and the denominator by 6. The result’s the diminished fraction 2/3.

Listed here are the steps for decreasing a fraction to its easiest type:

1. Discover the GCF of the numerator and the denominator.
2. Divide each the numerator and the denominator by the GCF.
3. The result’s the best type of the fraction.

Steps	Instance
Discover the GCF of the numerator and the denominator.	The GCF of 12 and 18 is 6.
Divide each the numerator and the denominator by the GCF.	12 ÷ 6 = 2 and 18 ÷ 6 = 3.
The result’s the best type of the fraction.	The best type of 12/18 is 2/3.

Decreasing a fraction to its easiest type is a vital step in working with fractions. It makes it simpler to match fractions and to carry out operations on fractions.

Dividing Fractions with Not like Denominators

When dividing fractions with not like denominators, comply with these steps:

Flip the second fraction (the divisor) in order that it turns into the reciprocal.
Multiply the primary fraction (the dividend) by the reciprocal of the divisor.
Simplify the ensuing fraction by decreasing it to its lowest phrases.

Instance

Divide 2/3 by 1/4:

**Step 1:** Flip the divisor (1/4) to its reciprocal (4/1).

**Step 2:** Multiply the dividend (2/3) by the reciprocal (4/1): (2/3) * (4/1) = 8/3

**Step 3:** Simplify the consequence (8/3) by dividing each the numerator and denominator by their best frequent issue (3): 8/3 = 2⅔

Subsequently, 2/3 divided by 1/4 is 2⅔.

Inverting the Divisor

To invert a divisor, you merely flip the numerator and denominator. Because of this the brand new numerator turns into the previous denominator, and the brand new denominator turns into the previous numerator. For instance, the inverse of two/3 is 3/2.

Inverting the divisor is a helpful method for dividing fractions with not like denominators. By inverting the divisor, you may flip the division drawback right into a multiplication drawback, which is commonly simpler to resolve.

To multiply fractions with not like denominators, you should use the next steps:

Invert the divisor.
Multiply the numerators of the 2 fractions.
Multiply the denominators of the 2 fractions.
Simplify the fraction, if potential.

Right here is an instance of how you can multiply fractions with not like denominators utilizing the inversion technique:

Step	Calculation
Invert the divisor	2/3 turns into 3/2
Multiply the numerators	4 x 3 = 12
Multiply the denominators	5 x 2 = 10
Simplify the fraction	12/10 = 6/5

Subsequently, 4/5 divided by 2/3 is the same as 6/5.

Multiplying the Dividend and the Inverted Divisor

To multiply fractions with not like denominators, we have to first discover a frequent denominator for the 2 fractions. This may be completed by discovering the Least Widespread A number of (LCM) of the 2 denominators. As soon as we’ve got the LCM, we will categorical each fractions by way of the LCM after which multiply them.

For instance, let’s multiply 1/2 and a pair of/3.

Discover the LCM of two and three. The LCM is 6.
Categorical each fractions by way of the LCM. 1/2 = 3/6 and a pair of/3 = 4/6.
Multiply the fractions. 3/6 * 4/6 = 12/36.
Simplify the fraction. 12/36 = 1/3.

Subsequently, 1/2 * 2/3 = 1/3.

Fraction	Equal Fraction with LCM
1/2	3/6
2/3	4/6

We will use this technique to multiply any two fractions with not like denominators.

Decreasing the End result to Easiest Kind

As soon as you’ve got multiplied or divided fractions with not like denominators, the ultimate step is to scale back the consequence to its easiest type. This implies expressing the fraction by way of its lowest potential numerator and denominator with out altering its worth.

Discover the Best Widespread Issue (GCF) of the Numerator and Denominator

The GCF is the biggest quantity that divides evenly into each the numerator and denominator. To search out the GCF, you should use the next steps:

Record the prime components of each the numerator and denominator.
Establish the frequent prime components and multiply them collectively.
The product of the frequent prime components is the GCF.

Divide Each Numerator and Denominator by the GCF

After getting discovered the GCF, you could divide each the numerator and denominator of the fraction by the GCF. This may scale back the fraction to its easiest type.

Instance:

Let’s scale back the fraction 12/18 to its easiest type.

1. Discover the GCF of 12 and 18:

Prime components of 12: 2, 2, 3

Prime components of 18: 2, 3, 3

Widespread prime components: 2, 3

GCF = 2 * 3 = 6

2. Divide each numerator and denominator by the GCF:

12 ÷ 6 = 2

18 ÷ 6 = 3

Subsequently, the best type of 12/18 is 2/3.

Steps	Instance
Discover the GCF of 12 and 18	GCF = 6
Divide each numerator and denominator by the GCF	12 ÷ 6 = 2 18 ÷ 6 = 3
Easiest type	2/3

Superior Functions of Multiplying and Dividing Fractions

9. Functions in Chance

Chance idea, a department of arithmetic that offers with the probability of occasions occurring, closely depends on fractions. Let’s contemplate the next state of affairs:

You’ve gotten a bag containing 6 purple marbles, 4 blue marbles, and a pair of yellow marbles. What’s the chance of drawing a blue or a yellow marble?

To find out this chance, we have to divide the sum of favorable outcomes (blue and yellow marbles) by the whole variety of potential outcomes (complete marbles).

Chance of drawing a blue or yellow marble = (Variety of blue marbles + Variety of yellow marbles) / Complete variety of marbles
Chance of drawing a blue or yellow marble = (4 + 2) / (6 + 4 + 2)
Chance of drawing a blue or yellow marble = 6 / 12
Chance of drawing a blue or yellow marble = 1 / 2

Subsequently, the chance of drawing a blue or a yellow marble is 1/2.

Consequence	Quantity	Chance
Draw a blue marble	4	4/12 = 1/3
Draw a yellow marble	2	2/12 = 1/6
Complete	12	1

This instance showcases the sensible utility of multiplying and dividing fractions in chance, the place we mix the chances of particular person outcomes to find out the probability of a selected occasion.

Drawback-Fixing Methods for Multiplying and Dividing Fractions with Not like Denominators

10. Discovering the Least Widespread A number of (LCM)

To multiply or divide fractions with not like denominators, you could discover a frequent denominator, which is the least frequent a number of (LCM) of the denominators. The LCM is the smallest optimistic integer that’s divisible by each denominators.

There are two strategies for locating the LCM:

a. Prime Factorization Technique:

Issue every denominator into its prime components.
Multiply the best energy of every prime issue that seems in any of the factorizations.

b. Widespread Components Technique:

Divide every denominator by its smallest prime issue.
Pair up the components which can be frequent to the denominators.
Multiply the components from every pair.
Repeat steps till no extra frequent components may be discovered.

For instance, to search out the LCM of 6 and 10:

Denominator	Prime Factorization	LCM
6	2 × 3	6
10	2 × 5	30

The LCM of 6 and 10 is 30 as a result of it’s the smallest optimistic integer divisible by each 6 and 10.

How To Multiply And Divide Fractions With Not like Denominators

Multiplying and dividing fractions with not like denominators is usually a difficult activity, nevertheless it’s a necessary ability for any math scholar. This is a step-by-step information that can assist you grasp the method:

Step 1: Discover a frequent denominator. The frequent denominator is the least frequent a number of (LCM) of the denominators of the 2 fractions. To search out the LCM, record the multiples of every denominator and discover the smallest quantity that seems on each lists.

Step 2: Multiply the numerators and denominators. After getting the frequent denominator, multiply the numerator of the primary fraction by the denominator of the second fraction, and multiply the denominator of the primary fraction by the numerator of the second fraction.

Step 3: Simplify the fraction. If potential, simplify the ensuing fraction by dividing the numerator and denominator by their best frequent issue (GCF).

Instance: Multiply the fractions 1/2 and three/4.

Step 1: Discover a frequent denominator. The LCM of two and 4 is 4.

Step 2: Multiply the numerators and denominators. 1/2 * 3/4 = 3/8.

Step 3: Simplify the fraction. 3/8 is already in easiest type.

Individuals Additionally Ask

How do you divide fractions with not like denominators?

To divide fractions with not like denominators, merely invert the second fraction and multiply. For instance, to divide 1/2 by 3/4, you’ll invert 3/4 to 4/3 after which multiply: 1/2 * 4/3 = 4/6, which simplifies to 2/3.

Can I add or subtract fractions with not like denominators?

No, you can not add or subtract fractions with not like denominators. You will need to first discover a frequent denominator earlier than performing these operations.

Is multiplying fractions simpler than dividing fractions?

Multiplying fractions is mostly simpler than dividing fractions. It is because if you multiply fractions, you might be primarily multiplying the numerators and denominators individually. If you divide fractions, it’s essential to first invert the second fraction after which multiply.