{"id":49446,"date":"2023-02-22T05:03:50","date_gmt":"2023-02-22T07:03:50","guid":{"rendered":"https:\/\/blessedfilmes.com.br\/?p=49446"},"modified":"2025-08-27T10:31:24","modified_gmt":"2025-08-27T13:31:24","slug":"simplify-fractions-9-2","status":"publish","type":"post","link":"http:\/\/blessedfilmes.com.br\/?p=49446","title":{"rendered":"simplify fractions 9"},"content":{"rendered":"<p>Simplify Fractions Calculator Reduce to Simplest Form<\/p>\n<p>\u2705 Instant Results \u2013 Get simplified fractions in real time. And what is the simplest form of a fraction with negative numbers, e.g., -4\/6? You only need to know that the negative number factors are the same as the positive ones multiplied by -1. Click here to go to our the answer section on this website, that will tell you how to reduce fractions with step-wise instruction. They&#8217;re created by multiplying or dividing both the top and bottom numbers by the same value.<\/p>\n<ul>\n<li>The GCD is the largest number that divides both numerator and denominator evenly.<\/li>\n<li>We can make a complicated fraction as simple as possible by following the process of simplifying the fraction.<\/li>\n<li>An improper fraction is a fraction where the numerator is higher than the denominator (or more precisely, their absolute values follow this rule).<\/li>\n<li>To arrive at the first answer (1\/3), you need to divide the numerator and denominator by 4.<\/li>\n<\/ul>\n<h2>Fraction simplifier with steps<\/h2>\n<p><img class='aligncenter' style='display: block;margin-left:auto;margin-right:auto;' width=\"601px\" alt=\"simplify fractions\" 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\"\/><\/p>\n<p>Always simplify your final answer when working with fractions to ensure you&#8217;ve found the most reduced form. To arrive at the first answer (1\/3), you need to divide the numerator and denominator by 4. To arrive at the second answer (2\/6), you need to divide the numerator and denominator by 2. The resulting fraction, 2\/3, is in simplest form because both 2 and 3 do not share any factors other than 1. Check these interesting articles related to simplifying fractions. The result at the bottom is our simplified fraction, 3\/4.<\/p>\n<h2>@ mathwarehouse.com<\/h2>\n<p>To simplify a fraction, we divide both the top number (numerator) and bottom number (denominator) by their greatest common factor (GCF). This makes the fraction smaller without changing its value. To simplify a fraction, simply enter the numerator\/top number (on the left side) and the denominator\/lower number (on the right side) of the input but.<\/p>\n<h2>Simplifying Fractions with Exponents<\/h2>\n<p>Then, we write it in the mixed number form by placing the quotient as the whole number, the remainder as the numerator, and the divisor as the denominator. Let us go through the following example to understand this better. Simplifying a fraction implies reducing a fraction to its lowest form. A fraction is in its simplest form if its numerator and denominator are co-prime or have no common factors except 1.<\/p>\n<h2>Need a Custom Calculator?<\/h2>\n<p><img class='aligncenter' style='display: block;margin-left:auto;margin-right:auto;' width=\"608px\" alt=\"simplify fractions\" 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\"\/><\/p>\n<p>This is also known as &#8220;writing a fraction in lowest terms&#8221;. Writing a fraction in its simplest form means that both top and bottom numbers can no longer be divided by the same whole number other than 1. Make sure you have the simplest form of the fraction, with the numerator and denominator as small as possible, by using this simplify fraction calculator. Enter the numerator above the line and the denominator below the line and click the &#8220;Simplify Fraction&#8221; button to perform the calculation. The simplify fraction calculator reduces the fraction to its simplest form and shows you the GCF and the work and steps of the calculation.<\/p>\n<p>Fractioncalculator.com in no way guarantees that the information and the the calculations on this website are correct. Now, let\u2019s work through one more example of how to simplify a fraction that is proper. In this case, 18 and 27 share a greatest common factor of 9. For starters, let\u2019s review the difference between the numerator of a fraction and the denominator of a fraction.<\/p>\n<h2>Simplifying Fractions<\/h2>\n<p>Use the expanded form of each term in the numerator and denominator to make it easy for you to simplify the fraction with variables. Here is a <a href=\"https:\/\/www.accountingcoaching.online\/simplify-fractions\/\">simplify fractions<\/a> step-by-step process for you to understand the process of simplifying a fraction. Consider the fraction, 8\/24 and follow the steps mention below to understand how to simplify the fraction 8\/24. All of these are equivalent fractions, but only is in simplest form. We can simplify all of the other equivalent fractions and find that the simplest form of those fractions will be .<\/p>\n<p>Though we simplify them, the value of the fraction is going to remain unchanged. This means the simplified fraction and the actual fraction form a pair of equivalent fractions. In this article, we will learn a few easy ways of simplifying fractions. Improper fractions are those in which the numerator is greater than or equal to the denominator. To simplify improper fractions we need to convert them to mixed fractions, and for that, we need to divide the numerator by the denominator.<\/p>\n<ul>\n<li>This calculator also simplifies proper fractions by reducing to lowest terms and showing the work involved.<\/li>\n<li>The Fraction Calculator will reduce a fraction to its simplest form.<\/li>\n<li>In order to find the simplified form of a fraction, take a look at an easy way to simplify the fraction.<\/li>\n<li>Imagine that the objects we are dealing with are two cakes, each divided into two equal parts.<\/li>\n<li>Simplifying a fraction means reducing it to its lowest terms, where the numerator and denominator have no common factors other than 1.<\/li>\n<\/ul>\n<p>The number above the fraction bar is called the numerator, and the number below the fraction bar is the denominator. A fraction is in its simplest form (irreducible, in its lowest terms) when the numerator and denominator have no common factors other than 1. In that case the greatest common factor (also called greatest common divisor or highest common factor) is 1. The strategy that we used will serve as the basis for the 3-step method for simplifying fractions that you will learn in the next section. Large fractions can be simplified by dividing the numerator and denominator by the common prime factors to reduce it to the simplest form. Now, let us also discuss an easy way to simplify fractions.<\/p>\n<p>Our interactive tools and resources help students master fraction concepts through engaging learning experiences. A fraction is fully simplified when the GCD of its numerator and denominator is 1. The GCD is the largest number that divides both numerator and denominator evenly. Express the numerator and denominator as the product of variables. You buy two extra-large pizzas of the same size but different shapes. The Hawaiian is divided into 16, and the Hot dog stuffed crust is cut into 24 pieces.<\/p>\n<p>This is useful when you need to compare fractions or find common denominators. A mixed number shows the fraction as a whole number plus a proper fraction. This format is often used in cooking recipes and everyday measurements. Now that all of the factors are listed, we can see that 66 and 93 share a greatest common factor of 3. And now as you can see, 1\/3 and 3\/9 are equivalent fractions. No complicated steps, no sign-ups\u2014just quick, accurate fraction simplifications.<\/p>\n","protected":false},"excerpt":{"rendered":"<p>Simplify Fractions Calculator Reduce to Simplest Form \u2705 Instant Results \u2013 Get simplified fractions in real time. And what is the simplest form of a fraction with negative numbers, e.g., -4\/6? You only need to know that the negative number factors are the same as the positive ones multiplied by -1. 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