Tips and Tricks for Easily Solving Fraction Problems

Many individuals believe fraction issues are tough. They are not. Mathematicians adore fractions because they have total control over them. Those who struggle with math, on the other hand, despise fractions. This information has been put up to assist such individuals. Yes, let us make you feel odd by informing you that you may now use’s free multiple fraction calculator to properly grasp and convert fractions into other forms. You may think it’s strange, but trust us when we say it works.

A fraction is a quotient when the numerator is divided by the denominator. Many pupils enjoy fractions, while others dislike them. Thanks to for creating a free multiple fraction calculator that can quickly compute the simplified forms of fractions. What do you think about it?

Let’s go right to the subject. We’ll go over some crucial strategies and methods for solving fraction problems quickly and simply in this article. Let’s go!

What Do Fractions Mean?

Numerators and denominators are both present in fractions. The numerator is the higher component of the fraction, while the denominator is the lower part.

Fraction Resolving Techniques:

Fractions are no longer a difficult subject for kids. With the free multiple fraction calculator, you can now simplify fractions. However, it is equally critical to comprehend and learn manual computations. So let us approach them.

Simplified Fraction Writing:

Consider the case of a/b. We’ll look at how to rapidly resolve a fraction number in this section. Take the following measures into consideration:

  • Determine the highest common factor for a/b fractions (HCF)

  • Then, to reach the final solution, divide both the numerator and denominator with HCF.

Adding Fractions with Common/Like Denominators: 

  • Determine whether the denominators of the two fractions to be added are the same.

  • If they are the same, your denominator

answer will be the denominator of your fractions being added.

  • 3. Add the numerators of the two numbers together fractions being added.


  • If required, simplify your response.

Subtracting Fractions with common/like denominators:

  • Check to see if the denominator of both fractions is the same.

  • The denominator of your solution will equal the denominator of your fractions if they are the same.

  • Subtract the second fraction’s numerator from the first fraction’s numerator.

  • If required, simplify your response.

Multiplying Fractions:

  • Convert the fractions to improper fractions if any of them are mixed fractions.

  • Multiply across – for the numerator of your answer, multiply the numerator of the first fraction by the numerator of the second fraction.

  • Then, multiply the denominator of your first and second fraction to find the denominator of your answer.

  • If required, simplify your response.

Keeping, Changing, and Flipping Fractions:

  • KEEP – The first fraction should be kept as a proper/improper fraction.

  • MODIFY – Replace the division symbol with a multiplication sign.

  • FLIP — Change the second fraction to its reciprocal to ‘flip’ it.

  • Multiply the first fraction’s numerator by the second fraction’s numerator, then multiply the denominators of the first and second fractions.

  • If required, simplify your response.

Increasing the order of fractions:

The following are two examples of cases:

The numerator and denominator both have the same difference:

When you have fractions that have the same numerator and denominator difference, you must resolve them using the key rule:

  • The biggest fractions are those with a large numerator, whereas the smallest fractions have a tiny numerator.

Numerators and denominators both grow by a fixed amount:

When you have fractions with growing numerators and denominators, remember the following trick:

  • Simple: the fractions with the smallest numerator are the smallest fractions, and vice versa.

The intriguing aspect is that you may perform these calculations with the help of a free multiple fraction calculator.

Identifying the Original Fraction:

In this part, I will resolve an example for you so that determining the original fraction with a given integer as a multiple or divider of the fraction is not a problem.

For instance, Reshaeel was requested to determine the fraction 6/7. However, instead of multiplying with the specified integer, he divided the fraction. He ended up with a fraction that was 13/70 higher than the initial figure. Calculate the fraction that was provided to Reshaeel.


The finest dividing fractions calculator rapidly calculates the answer to this issue. The outcome is x larger than the original value when a number is divided by a/b rather than multiplied by a/b, and the provided number is abx/b2-a2. Consequently, we have:

a = 6, b = 7, and x = 13/17

Original fraction = abx/b2-a2

Original fraction = 6*7*13/17/72-62

Original fraction = 6*13/10*13

Original fraction = 78/130

Original fraction = 3/5

Reshaeel was assigned the task of determining the final fraction. Another option is to use’s multiple fraction calculator to find the fraction. This calculator can also convert fractions to decimals in a matter of seconds.

Final Thoughts:

We highlighted some significant fraction resolution strategies in this article, which will come in helpful for individuals studying for aptitude exams. In addition, the value of a multiple fraction calculator has been emphasised in the context of quickly converting fractions to decimals.

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