{"appState":{"pageLoadApiCallsStatus":true},"articleState":{"article":{"headers":{"creationTime":"2016-03-26T07:10:02+00:00","modifiedTime":"2016-03-26T07:10:02+00:00","timestamp":"2022-09-14T17:46:01+00:00"},"data":{"breadcrumbs":[{"name":"Academics & The Arts","_links":{"self":"https://dummies-api.dummies.com/v2/categories/33662"},"slug":"academics-the-arts","categoryId":33662},{"name":"Math","_links":{"self":"https://dummies-api.dummies.com/v2/categories/33720"},"slug":"math","categoryId":33720},{"name":"Algebra","_links":{"self":"https://dummies-api.dummies.com/v2/categories/33721"},"slug":"algebra","categoryId":33721}],"title":"Factor Negative Exponents Out of Algebraic Equations Using GCF","strippedTitle":"factor negative exponents out of algebraic equations using gcf","slug":"factor-negative-exponents-out-of-algebraic-equations-using-gcf","canonicalUrl":"","seo":{"metaDescription":"A useful method for solving algebraic equations that contain negative exponents is to factor out a negative greatest common factor, or GCF. For example, conside","noIndex":0,"noFollow":0},"content":"<p>A useful method for solving algebraic equations that contain negative exponents is to factor out a negative greatest common factor, or GCF. For example, consider the equation 3<i>x</i><sup> –3</sup> – 5<i>x</i><sup> –2</sup> = 0.</p>\n<p>This equation has a solution that you can find without switching to fractions right away. In general, equations that have no constant terms — all the terms have variables with exponents on them — work best with this technique.</p>\n<p>Here are the steps:</p>\n<ol class=\"level-one\">\n <li><p class=\"first-para\">Factor out the greatest common factor (GCF).</p>\n<p class=\"child-para\">In this case, the GCF is <i>x</i><sup> –3</sup>:</p>\n<p class=\"child-para\">3<i>x</i><sup>–3</sup> – 5<i>x</i><sup>–2</sup> = <i>x</i><sup>–3</sup>(3 – 5<i>x</i>) = 0</p>\n<p class=\"child-para\">Did you think the exponent of the greatest common factor was –2? Remember, –3 is smaller than –2. When you factor out a greatest common factor, you choose the smallest exponent out of all the choices and then divide each term by that common factor.</p>\n<p class=\"child-para\">The tricky part of the factoring is dividing 3<i>x </i><sup>–3</sup> and 5<i>x</i><sup> –2</sup> by <i>x </i><sup> –3</sup>. The rules of exponents say that when you divide two numbers with the same base, you subtract the exponents, so you have</p>\n<img src=\"https://www.dummies.com/wp-content/uploads/501705.image0.png\" height=\"49\" alt=\"image0.png\" width=\"345\"/>\n </li>\n <li><p class=\"first-para\">Set each term in the factored form equal to zero to solve for <i>x</i>.</p>\n<img src=\"https://www.dummies.com/wp-content/uploads/501706.image1.png\" height=\"77\" alt=\"image1.png\" width=\"148\"/>\n<p class=\"child-para\">but that can never be true. The numerator has to be 0 to have a fraction be equal to 0.</p>\n<img src=\"https://www.dummies.com/wp-content/uploads/501707.image2.png\" height=\"40\" alt=\"image2.png\" width=\"149\"/>\n </li>\n <li><p class=\"first-para\">Check your answer.</p>\n<p class=\"child-para\">The only one to consider in this example is </p>\n<img src=\"https://www.dummies.com/wp-content/uploads/501708.image3.png\" height=\"88\" alt=\"image3.png\" width=\"379\"/>\n<p class=\"child-para\">It works!</p>\n </li>\n</ol>","description":"<p>A useful method for solving algebraic equations that contain negative exponents is to factor out a negative greatest common factor, or GCF. For example, consider the equation 3<i>x</i><sup> –3</sup> – 5<i>x</i><sup> –2</sup> = 0.</p>\n<p>This equation has a solution that you can find without switching to fractions right away. In general, equations that have no constant terms — all the terms have variables with exponents on them — work best with this technique.</p>\n<p>Here are the steps:</p>\n<ol class=\"level-one\">\n <li><p class=\"first-para\">Factor out the greatest common factor (GCF).</p>\n<p class=\"child-para\">In this case, the GCF is <i>x</i><sup> –3</sup>:</p>\n<p class=\"child-para\">3<i>x</i><sup>–3</sup> – 5<i>x</i><sup>–2</sup> = <i>x</i><sup>–3</sup>(3 – 5<i>x</i>) = 0</p>\n<p class=\"child-para\">Did you think the exponent of the greatest common factor was –2? Remember, –3 is smaller than –2. When you factor out a greatest common factor, you choose the smallest exponent out of all the choices and then divide each term by that common factor.</p>\n<p class=\"child-para\">The tricky part of the factoring is dividing 3<i>x </i><sup>–3</sup> and 5<i>x</i><sup> –2</sup> by <i>x </i><sup> –3</sup>. The rules of exponents say that when you divide two numbers with the same base, you subtract the exponents, so you have</p>\n<img src=\"https://www.dummies.com/wp-content/uploads/501705.image0.png\" height=\"49\" alt=\"image0.png\" width=\"345\"/>\n </li>\n <li><p class=\"first-para\">Set each term in the factored form equal to zero to solve for <i>x</i>.</p>\n<img src=\"https://www.dummies.com/wp-content/uploads/501706.image1.png\" height=\"77\" alt=\"image1.png\" width=\"148\"/>\n<p class=\"child-para\">but that can never be true. The numerator has to be 0 to have a fraction be equal to 0.</p>\n<img src=\"https://www.dummies.com/wp-content/uploads/501707.image2.png\" height=\"40\" alt=\"image2.png\" width=\"149\"/>\n </li>\n <li><p class=\"first-para\">Check your answer.</p>\n<p class=\"child-para\">The only one to consider in this example is </p>\n<img src=\"https://www.dummies.com/wp-content/uploads/501708.image3.png\" height=\"88\" alt=\"image3.png\" width=\"379\"/>\n<p class=\"child-para\">It works!</p>\n </li>\n</ol>","blurb":"","authors":[{"authorId":8985,"name":"Mary Jane Sterling","slug":"mary-jane-sterling","description":" <p><b>Mary Jane Sterling</b> is the author of <i>Algebra I For Dummies, Algebra Workbook For Dummies,</i> and many other <i>For Dummies</i> books. She taught at Bradley University in Peoria, Illinois for more than 30 years, teaching algebra, business calculus, geometry, and finite mathematics. ","hasArticle":false,"_links":{"self":"https://dummies-api.dummies.com/v2/authors/8985"}}],"primaryCategoryTaxonomy":{"categoryId":33721,"title":"Algebra","slug":"algebra","_links":{"self":"https://dummies-api.dummies.com/v2/categories/33721"}},"secondaryCategoryTaxonomy":{"categoryId":0,"title":null,"slug":null,"_links":null},"tertiaryCategoryTaxonomy":{"categoryId":0,"title":null,"slug":null,"_links":null},"trendingArticles":null,"inThisArticle":[],"relatedArticles":{"fromBook":[{"articleId":207507,"title":"Algebra II For Dummies Cheat Sheet","slug":"algebra-ii-for-dummies-cheat-sheet","categoryList":["academics-the-arts","math","algebra"],"_links":{"self":"https://dummies-api.dummies.com/v2/articles/207507"}},{"articleId":196396,"title":"Algebraic Permutations and Combinations","slug":"algebraic-permutations-and-combinations","categoryList":["academics-the-arts","math","algebra"],"_links":{"self":"https://dummies-api.dummies.com/v2/articles/196396"}},{"articleId":196395,"title":"Algebra’s Quadratic Formula","slug":"algebras-quadratic-formula","categoryList":["academics-the-arts","math","algebra"],"_links":{"self":"https://dummies-api.dummies.com/v2/articles/196395"}},{"articleId":196394,"title":"Rules for Radicals — the Algebraic Kind","slug":"rules-for-radicals-the-algebraic-kind","categoryList":["academics-the-arts","math","algebra"],"_links":{"self":"https://dummies-api.dummies.com/v2/articles/196394"}},{"articleId":196389,"title":"Algebra Equations for Multiplying Binomials","slug":"algebra-equations-for-multiplying-binomials","categoryList":["academics-the-arts","math","algebra"],"_links":{"self":"https://dummies-api.dummies.com/v2/articles/196389"}}],"fromCategory":[{"articleId":255800,"title":"Applying the Distributive Property: Algebra Practice Questions","slug":"applying-the-distributive-property-algebra-practice-questions","categoryList":["academics-the-arts","math","algebra"],"_links":{"self":"https://dummies-api.dummies.com/v2/articles/255800"}},{"articleId":245778,"title":"Converting Improper and Mixed Fractions: Algebra Practice Questions","slug":"converting-improper-mixed-fractions-algebra-practice-questions","categoryList":["academics-the-arts","math","algebra"],"_links":{"self":"https://dummies-api.dummies.com/v2/articles/245778"}},{"articleId":210251,"title":"How to Calculate Limits with Algebra","slug":"how-to-calculate-limits-with-algebra","categoryList":["academics-the-arts","math","algebra"],"_links":{"self":"https://dummies-api.dummies.com/v2/articles/210251"}},{"articleId":210250,"title":"Understanding the Vocabulary of Algebra","slug":"understanding-the-vocabulary-of-algebra","categoryList":["academics-the-arts","math","algebra"],"_links":{"self":"https://dummies-api.dummies.com/v2/articles/210250"}},{"articleId":210249,"title":"Understanding Algebraic Variables","slug":"understanding-algebraic-variables","categoryList":["academics-the-arts","math","algebra"],"_links":{"self":"https://dummies-api.dummies.com/v2/articles/210249"}}]},"hasRelatedBookFromSearch":false,"relatedBook":{"bookId":281940,"slug":"algebra-ii-for-dummies-2nd-edition","isbn":"9781119543145","categoryList":["academics-the-arts","math","algebra"],"amazon":{"default":"https://www.amazon.com/gp/product/1119543142/ref=as_li_tl?ie=UTF8&tag=wiley01-20","ca":"https://www.amazon.ca/gp/product/1119543142/ref=as_li_tl?ie=UTF8&tag=wiley01-20","indigo_ca":"http://www.tkqlhce.com/click-9208661-13710633?url=https://www.chapters.indigo.ca/en-ca/books/product/1119543142-item.html&cjsku=978111945484","gb":"https://www.amazon.co.uk/gp/product/1119543142/ref=as_li_tl?ie=UTF8&tag=wiley01-20","de":"https://www.amazon.de/gp/product/1119543142/ref=as_li_tl?ie=UTF8&tag=wiley01-20"},"image":{"src":"https://www.dummies.com/wp-content/uploads/algebra-ii-for-dummies-2nd-edition-cover-9781119543145-203x255.jpg","width":203,"height":255},"title":"Algebra II For Dummies","testBankPinActivationLink":"","bookOutOfPrint":true,"authorsInfo":"<p><p><b><b data-author-id=\"8985\">Mary Jane Sterling</b></b> is the author of <i>Algebra I For Dummies, Algebra Workbook For Dummies,</i> and many other <i>For Dummies</i> books. She taught at Bradley University in Peoria, Illinois for more than 30 years, teaching algebra, business calculus, geometry, and finite mathematics.</p>","authors":[{"authorId":8985,"name":"Mary Jane Sterling","slug":"mary-jane-sterling","description":" <p><b>Mary Jane Sterling</b> is the author of <i>Algebra I For Dummies, Algebra Workbook For Dummies,</i> and many other <i>For Dummies</i> books. She taught at Bradley University in Peoria, Illinois for more than 30 years, teaching algebra, business calculus, geometry, and finite mathematics. 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For example, consider the equation 3x –3 – 5x –2 = 0.\nThis equation has a solution that you can find without switching to fractions right away. In general, equations that have no constant terms — all the terms have variables with exponents on them — work best with this technique.\nHere are the steps:\n\n Factor out the greatest common factor (GCF).\nIn this case, the GCF is x –3:\n3x–3 – 5x–2 = x–3(3 – 5x) = 0\nDid you think the exponent of the greatest common factor was –2? Remember, –3 is smaller than –2. When you factor out a greatest common factor, you choose the smallest exponent out of all the choices and then divide each term by that common factor.\nThe tricky part of the factoring is dividing 3x –3 and 5x –2 by x –3. The rules of exponents say that when you divide two numbers with the same base, you subtract the exponents, so you have\n\n \n Set each term in the factored form equal to zero to solve for x.\n\nbut that can never be true. The numerator has to be 0 to have a fraction be equal to 0.\n\n \n Check your answer.\nThe only one to consider in this example is \n\nIt works!\n \n","item_vector":null},"titleHighlight":null,"descriptionHighlights":null,"headers":null,"categoryList":["academics-the-arts","math","algebra"],"title":"Factor Negative Exponents Out of Algebraic Equations Using GCF","slug":"factor-negative-exponents-out-of-algebraic-equations-using-gcf","articleId":138676},{"objectType":"article","id":194265,"data":{"title":"How to Factor an Expression Taking out the Greatest Common Factor","slug":"how-to-factor-an-expression-taking-out-the-greatest-common-factor","update_time":"2016-03-26T21:47:12+00:00","object_type":"article","image":null,"breadcrumbs":[{"name":"Academics & The Arts","slug":"academics-the-arts","categoryId":33662},{"name":"Math","slug":"math","categoryId":33720},{"name":"Algebra","slug":"algebra","categoryId":33721}],"description":"You can factor a quadratic expression to make it easier to work with. Some quadratic expressions can be made better by finding a greatest common factor (GCF). If the terms in the quadratic expression have something in common, then that can be factored out, leaving the expression easier to deal with.\nExample 1: Factor the quadratic expression, \n\n\n Rewrite the expression in decreasing powers of x.\n\n \n Find the GCF.\nAlthough the expression contains large numbers, each number can be evenly divided by 800.\n \n Factor out the GCF.\n\n \n\nExample 2: Factor the quadratic expression: \n\nThis more complicated example uses four different variables with powers of 2.\n\n Rewrite the expression in decreasing powers of x.\nOnly the x appears in a term with a power of one. So, you may choose to write this as a quadratic in x.\n\n \n Find the GCF.\n\n \n Factor out the GCF.\n\n \n","item_vector":null},"titleHighlight":null,"descriptionHighlights":null,"headers":null,"categoryList":["academics-the-arts","math","algebra"],"title":"How to Factor an Expression Taking out the Greatest Common Factor","slug":"how-to-factor-an-expression-taking-out-the-greatest-common-factor","articleId":194265},{"objectType":"article","id":167671,"data":{"title":"Factoring in Algebra I","slug":"factoring-in-algebra-i","update_time":"2016-03-26T15:09:09+00:00","object_type":"article","image":null,"breadcrumbs":[{"name":"Academics & The Arts","slug":"academics-the-arts","categoryId":33662},{"name":"Math","slug":"math","categoryId":33720},{"name":"Algebra","slug":"algebra","categoryId":33721}],"description":"Factoring algebraic expressions is one of the most important techniques you need to practice. Not much else can be done in terms of solving equations, graphing functions and conics, and working on math applications if you can't pull out a common factor and simplify an expression. Factoring is crucial, essential, and basic to algebra.\n\n Make sure you apply divisibility rules correctly.\n \n Write a prime factorization with the correct exponents on the prime factors.\n \n Check that the terms divided after dividing out a greatest common factor (GCF) don't still have a common factor.\n \n Reduce only factors, not terms.\n \n Write fractional answers with correct grouping symbols to distinguish remaining factors.\n \n\nFactoring Binomials\nA binomial is an expression with two terms. The terms can be separated by addition or subtraction. You have four possibilities for factoring binomials: \n\n Factor out a greatest common factor.\n \n Factor as the difference of perfect squares.\n \n Factor as the difference of perfect cubes.\n \n Factor as the sum of perfect cubes.\n \n\nIf one of these methods doesn't work, then the binomial doesn't factor by using real numbers.\nFactoring Quadratic Trinomials\nYou can factor trinomials with the form ax2 + bx + c in one of two ways: \n\n Factor out a greatest common factor.\n \n Find two binomials whose product is that trinomial. \n \n\nWhen finding the two binomials whose product is a particular trinomial, you work from the factors of the constant term and the factors of the coefficient of the lead term to create a sum or difference that matches the coefficient of the middle term. This technique can be expanded to trinomials that have the same general format but with exponents that are multiples of the basic trinomial.","item_vector":null},"titleHighlight":null,"descriptionHighlights":null,"headers":null,"categoryList":["academics-the-arts","math","algebra"],"title":"Factoring in Algebra I","slug":"factoring-in-algebra-i","articleId":167671},{"objectType":"article","id":167860,"data":{"title":"How to Find a Greatest Common Factor in a Polynomial","slug":"how-to-find-a-greatest-common-factor-in-a-polynomial","update_time":"2016-03-26T15:11:09+00:00","object_type":"article","image":null,"breadcrumbs":[{"name":"Academics & The Arts","slug":"academics-the-arts","categoryId":33662},{"name":"Math","slug":"math","categoryId":33720},{"name":"Pre-Calculus","slug":"pre-calculus","categoryId":33727}],"description":"No matter how many terms a polynomial has, you always want to check for a greatest common factor (GCF) first. If the polynomial has a GCF, factoring the rest of the polynomial is much easier because once you factor out the GCF, the remaining terms will be less cumbersome. If the GCF includes a variable, your job becomes even easier.\nWhen solving for x in a polynomial equation, if you forget to factor out the GCF, you may miss a solution, and that could mix you up in more ways than one! Without that solution, you could end up with an incorrect graph for your polynomial. And then all your work would be for nothing!\nTo factor the polynomial 6x4 – 12x3 + 4x2, for example, follow these steps:\n\n Break down every term into prime factors.\nThis step expands the original expression to \n\n \n Look for factors that appear in every single term to determine the GCF.\nIn this example, you can see one 2 and two x’s in every term: \n\nThe GCF here is 2x2.\n \n Factor the GCF out from every term in front of parentheses and group the remnants inside the parentheses.\nYou now have \n\n \n Multiply each term to simplify.\nThe simplified form of the expression you find in Step 3 is 2x2(3x2 – 6x + 2).\nTo see if you factored correctly, distribute the GCF and see if you obtain your original polynomial. If you multiply the 2x2 inside the parentheses, you get 6x4 – 12x3 + 4x2. You can now say with confidence that 2x2 is the GCF. \n \n","item_vector":null},"titleHighlight":null,"descriptionHighlights":null,"headers":null,"categoryList":["academics-the-arts","math","pre-calculus"],"title":"How to Find a Greatest Common Factor in a Polynomial","slug":"how-to-find-a-greatest-common-factor-in-a-polynomial","articleId":167860},{"objectType":"article","id":191195,"data":{"title":"How to Find the Greatest Common Factor (GCF)","slug":"how-to-find-the-greatest-common-factor-2","update_time":"2021-07-09T16:59:40+00:00","object_type":"article","image":null,"breadcrumbs":[{"name":"Academics & The Arts","slug":"academics-the-arts","categoryId":33662},{"name":"Math","slug":"math","categoryId":33720},{"name":"Pre-Algebra","slug":"pre-algebra","categoryId":33726}],"description":"The greatest common factor (GCF) of a set of numbers is the largest number that is a factor of all those numbers. For example, the GCF of the numbers 4 and 6 is 2 because 2 is the greatest number that’s a factor of both 4 and 6. Here you will learn two ways to find the GCF.\r\nMethod 1: Use a list of factors to find the GCF\r\nThis method for finding the GCF is quicker when you’re dealing with smaller numbers. To find the GCF of a set of numbers, list all the factors of each number. The greatest factor appearing on every list is the GCF. For example, to find the GCF of 6 and 15, first list all the factors of each number.\r\n\r\nFactors of 6: 1, 2, 3, 6\r\n\r\nFactors of 15: 1, 3, 5, 15\r\n\r\nBecause 3 is the greatest factor that appears on both lists, 3 is the GCF of 6 and 15.\r\n\r\nAs another example, suppose you want to find the GCF of 9, 20, and 25. Start by listing the factors of each:\r\n\r\nFactors of 9: 1, 3, 9\r\n\r\nFactors of 20: 1, 2, 4, 5, 10, 20\r\n\r\nFactors of 25: 1, 5, 25\r\n\r\nIn this case, the only factor that appears on all three lists is 1, so 1 is the GCF of 9, 20, and 25.\r\nMethod 2: Use prime factorization to find the GCF\r\nYou can use prime factorization to find the GCF of a set of numbers. This often works better for large numbers, where generating lists of all factors can be time-consuming.\r\n\r\nHere’s how to find the GCF of a set of numbers using prime factorization:\r\n\r\n \t\r\nList the prime factors of each number.\r\n\r\n \t\r\nCircle every common prime factor — that is, every prime factor that’s a factor of every number in the set.\r\n\r\n \t\r\nMultiply all the circled numbers.\r\nThe result is the GCF.\r\n\r\n\r\nFor example, suppose you want to find the GCF of 28, 42, and 70. Step 1 says to list the prime factors of each number. Step 2 says to circle every prime factor that’s common to all three numbers (as shown in the following figure).\r\n\r\n\r\n\r\nAs you can see, the numbers 2 and 7 are common factors of all three numbers. Multiply these circled numbers together:\r\n\r\n2 · 7 = 14\r\n\r\nThus, the GCF of 28, 42, and 70 is 14.\r\nKnowing how to find the GCF of a set of numbers is important when you begin reducing fractions to lowest terms.","item_vector":null},"titleHighlight":null,"descriptionHighlights":null,"headers":null,"categoryList":["academics-the-arts","math","pre-algebra"],"title":"How to Find the Greatest Common Factor (GCF)","slug":"how-to-find-the-greatest-common-factor-2","articleId":191195}]},"relatedArticlesStatus":"success"},"routeState":{"name":"Article3","path":"/article/academics-the-arts/math/algebra/factor-negative-exponents-out-of-algebraic-equations-using-gcf-138676/","hash":"","query":{},"params":{"category1":"academics-the-arts","category2":"math","category3":"algebra","article":"factor-negative-exponents-out-of-algebraic-equations-using-gcf-138676"},"fullPath":"/article/academics-the-arts/math/algebra/factor-negative-exponents-out-of-algebraic-equations-using-gcf-138676/","meta":{"routeType":"article","breadcrumbInfo":{"suffix":"Articles","baseRoute":"/category/articles"},"prerenderWithAsyncData":true},"from":{"name":null,"path":"/","hash":"","query":{},"params":{},"fullPath":"/","meta":{}}},"dropsState":{"submitEmailResponse":false,"status":"initial"},"profileState":{"auth":{},"userOptions":{},"status":"success"}}

Factor Negative Exponents Out of Algebraic Equations Using GCF

By: Mary Jane Sterling and

Updated: 03-26-2016

From The Book: Algebra II For Dummies

Algebra II For Dummies

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A useful method for solving algebraic equations that contain negative exponents is to factor out a negative greatest common factor, or GCF. For example, consider the equation 3x^–3 – 5x^–2 = 0.

This equation has a solution that you can find without switching to fractions right away. In general, equations that have no constant terms — all the terms have variables with exponents on them — work best with this technique.

Here are the steps:

Factor out the greatest common factor (GCF).

In this case, the GCF is x^–3:

3x^–3 – 5x^–2 = x^–3(3 – 5x) = 0

Did you think the exponent of the greatest common factor was –2? Remember, –3 is smaller than –2. When you factor out a greatest common factor, you choose the smallest exponent out of all the choices and then divide each term by that common factor.

The tricky part of the factoring is dividing 3x ^–3 and 5x^–2 by x ^–3. The rules of exponents say that when you divide two numbers with the same base, you subtract the exponents, so you have
Set each term in the factored form equal to zero to solve for x.

but that can never be true. The numerator has to be 0 to have a fraction be equal to 0.
Check your answer.

The only one to consider in this example is

It works!

About This Article

This article is from the book:

Algebra II For Dummies ,

About the book author:

Mary Jane Sterling is the author of Algebra I For Dummies, Algebra Workbook For Dummies, and many other For Dummies books. She taught at Bradley University in Peoria, Illinois for more than 30 years, teaching algebra, business calculus, geometry, and finite mathematics.

This article can be found in the category:

Algebra ,