how to simplify expressions with exponents calculator

To simplify the power of a quotient of two expressions, we can use the power of a quotient rule, which states that the power of a quotient of factors is the quotient of the powers of the factors. What would happen if [latex]m=n[/latex]? Simplify Calculator. Simplify expressions with positive exponents calculator - This Simplify expressions with positive exponents calculator helps to fast and easily solve any math. It requires one to be familiar with the concepts of arithmetic operations on algebraic expressions, fractions, and exponents. Whether you are a student working on a math assignment or a professional dealing with equations as part of your job, the Simplify Expression Calculator is an essential tool that can save you time and make solving equations much easier. After this lesson you'll be able to simplify expressions with exponents. When they are, the basic rules of exponents and exponential notation apply when writing and simplifying algebraic expressions that contain exponents. The denominator of the rational exponent is the index of the radical. On the other hand, x/2 + 1/2y is in a simplified form as fractions are in the reduced form and both are unlike terms. Notice that the exponent of the product is the sum of the exponents of the terms. Step 1: Enter an exponential expression below which you want to simplify. Simplifying expressions with exponents In the term , is the base and is the exponent. For instance, a pixel is the smallest unit of light that can be perceived and recorded by a digital camera. Solving equations mean finding the value of the unknown variable given. The mathematical concepts that are important in simplifying algebraic expressions are given below: The rules for simplifying expressions are given below: Follow the steps given below to learn how to simplify expressions: Equations refer to those statements that have an equal to "=" sign between the term(s) written on the left side and the term(s) written on the right side. This is amazing, it helped me so often already! A fully demonstrated steps by steps solution of a numerical (not a question), awesome makes life easy and has saved me an enormous amount of time the app is worth 20 dollars a month. An example of simplifying algebraic expressions is given below: Great learning in high school using simple cues. Here is an example: 2x^2+x (4x+3) However, when simplifying expressions containing exponents, don't feel like you must work only with, or straight from, these rules. Really a helpful situation where you can check answers after u solve a problem, and if your wrong, u can always fix it and learn from mistakes using this app, also thank you for the feature of calculating directly from the paper without typing. The cost of all 5 pencils = $5x. Contains a great and useful calculator, this is one of the best apps relating to education no other app compares with this app it helped me to understand my work better it even shows how it was worked out I recommend to 7 of my friends and they are happy about this app. Doing math equations is a great way to keep your mind sharp and improve your problem-solving skills. Free simplify calculator - simplify algebraic expressions step-by-step. Example 3: Daniel bought 5 pencils each costing $x, and Victoria bought 6 pencils each costing $x. Being a virtual student, it's been able to help study and understand and breakdown concepts that I was not previously aware of. To find the product of powersMultiplication of two or more values in exponential form that have the same base-. This will give us (8p)^3q^4 in the bottom or denominator, but our top or numerator will stay the same. In this case, we would use the zero exponent rule of exponents to simplify the expression to 1. The calculator will show you each step with easy-to-understand explanations . For any nonzero real number [latex]a[/latex], the zero exponent rule of exponents states that. To simplify algebraic expressions, follow the steps given below: Let us take an example for a better understanding. Homework is a necessary part of school that helps students review and practice what they have learned in class. In this example, we simplify (2x)+48+3 (2x)+8. Solution: From the given statement, the expression formed is (k + 8)(16 - k). To simplify an algebraic expression means to rewrite it in a simpler form, without changing its value. The rules for exponents may be combined to simplify expressions. Use the distributive property to multiply any two polynomials. For example, the expression 4x + 3y + 6x can be simplified by factoring out the common factor 2x to get x(4 + 6) + 3y = 10x + 3y. Write answers with positive exponents. She holds a master's degree in Learning and Technology. MathHelp.com Simplifying Expressions Simplify a6 a5 The rules tell me to add the exponents. The power of a quotient of factors is the same as the quotient of the powers of the same factors. Example: 2x-1=y,2y+3=x New Example Keyboard Solve e i s c t l L Search Engine users found our website today by entering these keyword phrases : simplify rational or radical expressions with our free step-by-step math calculator. Find the total cost of buying pencils by both of them. a n = a a . Simplify Expressions With Negative Exponents. There are rules in algebra for simplifying exponents with different and same bases that we can use. Typing Exponents. The simplification calculator allows you to take a simple or complex expression and simplify and reduce the expression to it's simplest form. Quick-Start Guide Enter an equation in the box, then click "SIMPLIFY". That means that [latex]{a}^{n}[/latex] is defined for any integer [latex]n[/latex]. What are the steps for simplifying expressions. You can use the keyboard to enter exponents, fractions, and parentheses, among others. If there is a negative sign just outside parentheses, change the sign of all the terms written inside that bracket to simplify it. Example: Simplify the expression: 3/4x + y/2 (4x + 7). Look at the image given below showing another simplifying expression example. For example, 1/2 (x + 4) can be simplified as x/2 + 2. It is often simpler to work directly from the meaning of exponents. Simplifying dividing algebraic expressions, solve 3x3 systems of linear equations with TI-84 calculator, solving parabola functions, Easiest way to Factor a third-degree polynomial. This tool is designed to take the frustration out of algebra by helping you to simplify and reduce your expressions to their simplest form. Before learning about simplifying expressions, let us quickly go through the meaning of expressions in math. Looking for a quick and easy way to get help with your homework? With a negative exponent, this causes the expression to reciprocate and change exponent to positive, so start with 1/ (4096)^ (5/6) = 1/4^5 = 1/1024. When you enter an expression into the calculator, the calculator will simplify the Exponents are supported on variables using the ^ (caret) symbol. When simplifying expressions with exponents, rather than trying to work robotically from the rules, instead think about what the exponents mean. I highly recommend you use this site! For instance, consider [latex]{\left(pq\right)}^{3}[/latex]. Simplifying radical expressions calculator This calculator simplifies expressions that contain radicals. Example 2: Simplify the expression: 4ps - 2s - 3(ps +1) - 2s . Example of Dividing Monomials When you divide monomial expressions, subtract the exponents of like bases. When simplifying math expressions, you can't simply proceed from left to right, multiplying, adding, subtracting, and so on as you go. Note: exponents must be positive integers . The expression inside the parentheses is multiplied twice because it has an exponent of 2. Simplify simplify rational or radical expressions with our free step-by-step math calculator. Along with PEMDAS, exponent rules, and the knowledge about operations on expressions also need to be used while simplifying algebraic expressions. succeed. 1 comment ( 7 votes) Upvote Downvote Flag more htom 2 years ago well what if something was like 1/2 to the power of 7 how would you solve that? But there is support available in the form of. To simplify your expression using the Simplify Calculator, type in your expression like 2(5x+4)-3x. Use our example, [latex]\frac{{h}^{3}}{{h}^{5}}[/latex]. Distributive property can be used to simplify the. Simplify each expression using the zero exponent rule of exponents. Simplify radical,rational expression with Step. Be careful to distinguish between uses of the product rule and the power rule. Here's an example: Enter 10, press the exponent key, then press 5 and enter. Free simplify calculator - simplify algebraic expressions step-by-step. Check out our online math support services! If there is a 'plus' or a positive sign outside the bracket, just remove the bracket and write the terms as it is, retaining their original signs. For any real numbers [latex]a[/latex] and [latex]b[/latex], where [latex]b\neq0[/latex], and any integer [latex]n[/latex], the power of a quotient rule of exponents states that. How to Simplify an Expression with Parentheses & Exponents, Power of Powers: Simplifying Exponential Expressions, Graphing Systems of Equations | Overview, Process & Examples, Negative Exponents: Writing Powers of Fractions and Decimals. 16/8 is 2/1 times p^(1-3) times q^(2-4) times r^9. Simplifies expressions step-by-step and shows the work! Simplifying mathematical expressions implies rewriting the same algebraic statement compactly with no like terms. . For any real number [latex]a[/latex] and natural numbers [latex]m[/latex] and [latex]n[/latex], the product rule of exponents states that. We know from our exponent properties that x^-4 is 1 / x^4 times y^5. In just five seconds, you can get the answer to any question you have. We can use the product rule of exponents to simplify expressions that are a product of two numbers or expressions with the same base but different exponents. The calculator will then show you the simplified version of the expression, along with a step-by-step breakdown of the simplification process. Typing Exponents Type ^ for exponents like x^2 for "x squared". It can also perceive a color depth (gradations in colors) of up to 48 bits per frame, and can shoot the equivalent of 24 frames per second. There are many ways to improve your writing skills, but one of the most effective is to practice regularly. This is true for any nonzero real number, or any variable representing a nonzero real number. Distributive property states that an expression given in the form of x (y + z) can be simplified as xy + xz. What does this mean? Step 2: Click "Simplify" to get a simplified version of the entered expression. Use this, i was struggling with simplifying but this calculator has everything needed, this app was amazing and the best responses and the best Solutions I would refer this to everyone . Now, to multiply fractions, we multiply the numerators and the denominators separately. Go! There are several steps you can follow to simplify an algebraic expression: Combine like terms: The first step in simplifying an expression is to look for terms with the same variables and exponents and combine them using the appropriate operations. Multiplying Exponents | How to Multiply Exponents With Different Bases. Let us learn more about simplifying expressions in this article. In the term , is the base and is the exponent. Exponent Calculator - Simplify Exponential Expression. Addition & Subtraction of Rational Exponents, Adding & Subtracting Rational Expressions | Formula & Examples, Algebra Word Problems Help & Answers | How to Solve Word Problems, Multiplying Radical Expressions | Variables, Square Roots & Binomials, Simplifying Algebraic Expressions | Overview, Formulas & Examples. Exponents . Simplifying expressions mean rewriting the same algebraic expression with no like terms and in a compact manner. Expressions refer to mathematical statements having a minimum of two terms containing either numbers, variables, or both connected through an addition/subtraction operator in between. How to Define a Zero and Negative Exponent, How to Simplify Expressions with Exponents, Simplifying Expressions with Rational Exponents, How to Graph Cubics, Quartics, Quintics and Beyond, How to Add, Subtract and Multiply Polynomials, How to Divide Polynomials with Long Division, How to Use Synthetic Division to Divide Polynomials, Remainder Theorem & Factor Theorem: Definition & Examples, Dividing Polynomials with Long and Synthetic Division: Practice Problems, Practice Problem Set for Exponents and Polynomials, Introduction to Statistics: Tutoring Solution, Study.com ACT® Test Prep: Help and Review, Prentice Hall Algebra 2: Online Textbook Help, College Preparatory Mathematics: Help and Review, McDougal Littell Pre-Algebra: Online Textbook Help, High School Algebra II: Homeschool Curriculum, How to Write a Numerical Expression? How to Solve Exponents Download Article methods 1 Solving Basic Exponents 2 Adding, Subtracting and Multiplying Exponents 3 Solving Fractional Exponents Other Sections Related Articles References Article Summary Co-authored by David Jia Last Updated: February 27, 2023 Exponents are used when a number is multiplied by itself. I would definitely recommend Study.com to my colleagues. simplify rational or radical expressions with our free step-by-step math First Law of Exponents If a and b are positive integers and x is a real number. Quotients of exponential expressions with the same base can be simplified by subtracting exponents. Absolutely amazing implementation Amazing features going way beyond a calculator Unbelievably user friendly, it has saved me many times. In addition to its practical benefits, simplifying expressions is also a great way to develop your problem-solving skills. Simplify expressions with positive exponents calculator - Math can be a challenging subject for many learners. This step is important when you first begin because you can see exactly what we are doing. It appears from the last two steps that we can use the power of a product rule as a power of a quotient rule. We strive to deliver products of the highest quality to our customers. This is in simplified form using positive exponents. Write answers with positive exponents. For any real number [latex]a[/latex] and natural numbers [latex]m[/latex] and [latex]n[/latex], such that [latex]m>n[/latex], the quotient rule of exponents states that. Simplifying Expressions with Distributive Property, Addition and subtraction of algebraic expressions. You can have more time for your hobbies by making small changes to your daily routine. The calculator will then show you the simplified version of the expression, along with a step-by-step breakdown of the simplification process. Therefore, 4(2a + 3a + 4) + 6b is simplified as 20a + 6b + 16. With Cuemath, you will learn visually and be surprised by the outcomes. Being able to simplify expressions not only makes solving equations easier, but it also helps to improve your understanding of math concepts and how they apply to real-world problems. Here are the basic steps to follow to simplify an algebraic expression: remove parentheses by multiplying factors use exponent rules to remove parentheses in terms with exponents combine like terms by adding coefficients combine the constants Let's work through an example. Do not simplify further. To simplify an expression with fractions find a common denominator and then combine the numerators. Using b x b y = b x + y Simplify More ways to get app Simplify Calculator Since we have y ^8 divided by y ^3, we subtract their exponents. What our customers say Math app provides students with the tools they need to understand and solve their math problems, this app has been very helpful. Simplifying algebraic expressions is a fundamental skill that is essential for anyone working with math, whether you are a student or a professional. As a college student who struggles with algebra like, bUT SOMETIMES THERE ARE SOME PROBLEMS. How to Use the Negative Our first step is to simplify (2p)^3. Simplification can also help to improve your understanding of math concepts. To simplify expressions, one must combine all like terms and solve all specified brackets, if any, until they are left with unlike terms that cannot be further reduced in the simplified expression. [latex]{\left({e}^{-2}{f}^{2}\right)}^{7}=\frac{{f}^{14}}{{e}^{14}}[/latex], [latex]\begin{array}{ccc}\hfill {\left({e}^{-2}{f}^{2}\right)}^{7}& =& {\left(\frac{{f}^{2}}{{e}^{2}}\right)}^{7}\hfill \\ & =& \frac{{f}^{14}}{{e}^{14}}\hfill \end{array}[/latex], [latex]\begin{array}{ccc}\hfill {\left({e}^{-2}{f}^{2}\right)}^{7}& =& {\left(\frac{{f}^{2}}{{e}^{2}}\right)}^{7}\hfill \\ & =& \frac{{\left({f}^{2}\right)}^{7}}{{\left({e}^{2}\right)}^{7}}\hfill \\ & =& \frac{{f}^{2\cdot 7}}{{e}^{2\cdot 7}}\hfill \\ & =& \frac{{f}^{14}}{{e}^{14}}\hfill \end{array}[/latex], [latex]{\left(\frac{a}{b}\right)}^{n}=\frac{{a}^{n}}{{b}^{n}}[/latex], CC licensed content, Specific attribution, http://cnx.org/contents/9b08c294-057f-4201-9f48-5d6ad992740d@5.2, http://cnx.org/contents/9b08c294-057f-4201-9f48-5d6ad992740d@3.278:1/Preface, [latex]\left(3a\right)^{7}\cdot\left(3a\right)^{10} [/latex], [latex]\left(\left(3a\right)^{7}\right)^{10} [/latex], [latex]\left(3a\right)^{7\cdot10} [/latex], [latex]{\left(a\cdot b\right)}^{n}={a}^{n}\cdot {b}^{n}[/latex], [latex]\left(-3\right)^{5}\cdot \left(-3\right)[/latex], [latex]{x}^{2}\cdot {x}^{5}\cdot {x}^{3}[/latex], [latex]{t}^{5}\cdot {t}^{3}={t}^{5+3}={t}^{8}[/latex], [latex]{\left(-3\right)}^{5}\cdot \left(-3\right)={\left(-3\right)}^{5}\cdot {\left(-3\right)}^{1}={\left(-3\right)}^{5+1}={\left(-3\right)}^{6}[/latex], [latex]{\left(\frac{2}{y}\right)}^{4}\cdot \left(\frac{2}{y}\right)[/latex], [latex]{t}^{3}\cdot {t}^{6}\cdot {t}^{5}[/latex], [latex]{\left(\frac{2}{y}\right)}^{5}[/latex], [latex]\frac{{\left(-2\right)}^{14}}{{\left(-2\right)}^{9}}[/latex], [latex]\frac{{\left(z\sqrt{2}\right)}^{5}}{z\sqrt{2}}[/latex], [latex]\frac{{\left(-2\right)}^{14}}{{\left(-2\right)}^{9}}={\left(-2\right)}^{14 - 9}={\left(-2\right)}^{5}[/latex], [latex]\frac{{t}^{23}}{{t}^{15}}={t}^{23 - 15}={t}^{8}[/latex], [latex]\frac{{\left(z\sqrt{2}\right)}^{5}}{z\sqrt{2}}={\left(z\sqrt{2}\right)}^{5 - 1}={\left(z\sqrt{2}\right)}^{4}[/latex], [latex]\frac{{\left(-3\right)}^{6}}{-3}[/latex], [latex]\frac{{\left(e{f}^{2}\right)}^{5}}{{\left(e{f}^{2}\right)}^{3}}[/latex], [latex]{\left(e{f}^{2}\right)}^{2}[/latex], [latex]{\left({x}^{2}\right)}^{7}[/latex], [latex]{\left({\left(2t\right)}^{5}\right)}^{3}[/latex], [latex]{\left({\left(-3\right)}^{5}\right)}^{11}[/latex], [latex]{\left({x}^{2}\right)}^{7}={x}^{2\cdot 7}={x}^{14}[/latex], [latex]{\left({\left(2t\right)}^{5}\right)}^{3}={\left(2t\right)}^{5\cdot 3}={\left(2t\right)}^{15}[/latex], [latex]{\left({\left(-3\right)}^{5}\right)}^{11}={\left(-3\right)}^{5\cdot 11}={\left(-3\right)}^{55}[/latex], [latex]{\left({\left(3y\right)}^{8}\right)}^{3}[/latex], [latex]{\left({t}^{5}\right)}^{7}[/latex], [latex]{\left({\left(-g\right)}^{4}\right)}^{4}[/latex], [latex]\frac{{\left({j}^{2}k\right)}^{4}}{\left({j}^{2}k\right)\cdot {\left({j}^{2}k\right)}^{3}}[/latex], [latex]\frac{5{\left(r{s}^{2}\right)}^{2}}{{\left(r{s}^{2}\right)}^{2}}[/latex], [latex]\begin{array}\text{ }\frac{c^{3}}{c^{3}} \hfill& =c^{3-3} \\ \hfill& =c^{0} \\ \hfill& =1\end{array}[/latex], [latex]\begin{array}{ccc}\hfill \frac{-3{x}^{5}}{{x}^{5}}& =& -3\cdot \frac{{x}^{5}}{{x}^{5}}\hfill \\ & =& -3\cdot {x}^{5 - 5}\hfill \\ & =& -3\cdot {x}^{0}\hfill \\ & =& -3\cdot 1\hfill \\ & =& -3\hfill \end{array}[/latex], [latex]\begin{array}{cccc}\hfill \frac{{\left({j}^{2}k\right)}^{4}}{\left({j}^{2}k\right)\cdot {\left({j}^{2}k\right)}^{3}}& =& \frac{{\left({j}^{2}k\right)}^{4}}{{\left({j}^{2}k\right)}^{1+3}}\hfill & \text{Use the product rule in the denominator}.\hfill \\ & =& \frac{{\left({j}^{2}k\right)}^{4}}{{\left({j}^{2}k\right)}^{4}}\hfill & \text{Simplify}.\hfill \\ & =& {\left({j}^{2}k\right)}^{4 - 4}\hfill & \text{Use the quotient rule}.\hfill \\ & =& {\left({j}^{2}k\right)}^{0}\hfill & \text{Simplify}.\hfill \\ & =& 1& \end{array}[/latex], [latex]\begin{array}{cccc}\hfill \frac{5{\left(r{s}^{2}\right)}^{2}}{{\left(r{s}^{2}\right)}^{2}}& =& 5{\left(r{s}^{2}\right)}^{2 - 2}\hfill & \text{Use the quotient rule}.\hfill \\ & =& 5{\left(r{s}^{2}\right)}^{0}\hfill & \text{Simplify}.\hfill \\ & =& 5\cdot 1\hfill & \text{Use the zero exponent rule}.\hfill \\ & =& 5\hfill & \text{Simplify}.\hfill \end{array}[/latex], [latex]\frac{{\left(d{e}^{2}\right)}^{11}}{2{\left(d{e}^{2}\right)}^{11}}[/latex], [latex]\frac{{w}^{4}\cdot {w}^{2}}{{w}^{6}}[/latex], [latex]\frac{{t}^{3}\cdot {t}^{4}}{{t}^{2}\cdot {t}^{5}}[/latex], [latex]\frac{{\theta }^{3}}{{\theta }^{10}}[/latex], [latex]\frac{{z}^{2}\cdot z}{{z}^{4}}[/latex], [latex]\frac{{\left(-5{t}^{3}\right)}^{4}}{{\left(-5{t}^{3}\right)}^{8}}[/latex], [latex]\frac{{\theta }^{3}}{{\theta }^{10}}={\theta }^{3 - 10}={\theta }^{-7}=\frac{1}{{\theta }^{7}}[/latex], [latex]\frac{{z}^{2}\cdot z}{{z}^{4}}=\frac{{z}^{2+1}}{{z}^{4}}=\frac{{z}^{3}}{{z}^{4}}={z}^{3 - 4}={z}^{-1}=\frac{1}{z}[/latex], [latex]\frac{{\left(-5{t}^{3}\right)}^{4}}{{\left(-5{t}^{3}\right)}^{8}}={\left(-5{t}^{3}\right)}^{4 - 8}={\left(-5{t}^{3}\right)}^{-4}=\frac{1}{{\left(-5{t}^{3}\right)}^{4}}[/latex], [latex]\frac{{\left(-3t\right)}^{2}}{{\left(-3t\right)}^{8}}[/latex], [latex]\frac{{f}^{47}}{{f}^{49}\cdot f}[/latex], [latex]\frac{1}{{\left(-3t\right)}^{6}}[/latex], [latex]{\left(-x\right)}^{5}\cdot {\left(-x\right)}^{-5}[/latex], [latex]\frac{-7z}{{\left(-7z\right)}^{5}}[/latex], [latex]{b}^{2}\cdot {b}^{-8}={b}^{2 - 8}={b}^{-6}=\frac{1}{{b}^{6}}[/latex], [latex]{\left(-x\right)}^{5}\cdot {\left(-x\right)}^{-5}={\left(-x\right)}^{5 - 5}={\left(-x\right)}^{0}=1[/latex], [latex]\frac{-7z}{{\left(-7z\right)}^{5}}=\frac{{\left(-7z\right)}^{1}}{{\left(-7z\right)}^{5}}={\left(-7z\right)}^{1 - 5}={\left(-7z\right)}^{-4}=\frac{1}{{\left(-7z\right)}^{4}}[/latex], [latex]\frac{{25}^{12}}{{25}^{13}}[/latex], [latex]{t}^{-5}=\frac{1}{{t}^{5}}[/latex], [latex]{\left(a{b}^{2}\right)}^{3}[/latex], [latex]{\left(-2{w}^{3}\right)}^{3}[/latex], [latex]\frac{1}{{\left(-7z\right)}^{4}}[/latex], [latex]{\left({e}^{-2}{f}^{2}\right)}^{7}[/latex], [latex]{\left(a{b}^{2}\right)}^{3}={\left(a\right)}^{3}\cdot {\left({b}^{2}\right)}^{3}={a}^{1\cdot 3}\cdot {b}^{2\cdot 3}={a}^{3}{b}^{6}[/latex], [latex]2{t}^{15}={\left(2\right)}^{15}\cdot {\left(t\right)}^{15}={2}^{15}{t}^{15}=32,768{t}^{15}[/latex], [latex]{\left(-2{w}^{3}\right)}^{3}={\left(-2\right)}^{3}\cdot {\left({w}^{3}\right)}^{3}=-8\cdot {w}^{3\cdot 3}=-8{w}^{9}[/latex], [latex]\frac{1}{{\left(-7z\right)}^{4}}=\frac{1}{{\left(-7\right)}^{4}\cdot {\left(z\right)}^{4}}=\frac{1}{2,401{z}^{4}}[/latex], [latex]{\left({e}^{-2}{f}^{2}\right)}^{7}={\left({e}^{-2}\right)}^{7}\cdot {\left({f}^{2}\right)}^{7}={e}^{-2\cdot 7}\cdot {f}^{2\cdot 7}={e}^{-14}{f}^{14}=\frac{{f}^{14}}{{e}^{14}}[/latex], [latex]{\left({g}^{2}{h}^{3}\right)}^{5}[/latex], [latex]{\left(-3{y}^{5}\right)}^{3}[/latex], [latex]\frac{1}{{\left({a}^{6}{b}^{7}\right)}^{3}}[/latex], [latex]{\left({r}^{3}{s}^{-2}\right)}^{4}[/latex], [latex]\frac{1}{{a}^{18}{b}^{21}}[/latex], [latex]{\left(\frac{4}{{z}^{11}}\right)}^{3}[/latex], [latex]{\left(\frac{p}{{q}^{3}}\right)}^{6}[/latex], [latex]{\left(\frac{-1}{{t}^{2}}\right)}^{27}[/latex], [latex]{\left({j}^{3}{k}^{-2}\right)}^{4}[/latex], [latex]{\left({m}^{-2}{n}^{-2}\right)}^{3}[/latex], [latex]{\left(\frac{4}{{z}^{11}}\right)}^{3}=\frac{{\left(4\right)}^{3}}{{\left({z}^{11}\right)}^{3}}=\frac{64}{{z}^{11\cdot 3}}=\frac{64}{{z}^{33}}[/latex], [latex]{\left(\frac{p}{{q}^{3}}\right)}^{6}=\frac{{\left(p\right)}^{6}}{{\left({q}^{3}\right)}^{6}}=\frac{{p}^{1\cdot 6}}{{q}^{3\cdot 6}}=\frac{{p}^{6}}{{q}^{18}}[/latex], [latex]{\\left(\frac{-1}{{t}^{2}}\\right)}^{27}=\frac{{\\left(-1\\right)}^{27}}{{\\left({t}^{2}\\right)}^{27}}=\frac{-1}{{t}^{2\cdot 27}}=\frac{-1}{{t}^{54}}=-\frac{1}{{t}^{54}}[/latex], [latex]{\left({j}^{3}{k}^{-2}\right)}^{4}={\left(\frac{{j}^{3}}{{k}^{2}}\right)}^{4}=\frac{{\left({j}^{3}\right)}^{4}}{{\left({k}^{2}\right)}^{4}}=\frac{{j}^{3\cdot 4}}{{k}^{2\cdot 4}}=\frac{{j}^{12}}{{k}^{8}}[/latex], [latex]{\left({m}^{-2}{n}^{-2}\right)}^{3}={\left(\frac{1}{{m}^{2}{n}^{2}}\right)}^{3}=\frac{{\left(1\right)}^{3}}{{\left({m}^{2}{n}^{2}\right)}^{3}}=\frac{1}{{\left({m}^{2}\right)}^{3}{\left({n}^{2}\right)}^{3}}=\frac{1}{{m}^{2\cdot 3}\cdot {n}^{2\cdot 3}}=\frac{1}{{m}^{6}{n}^{6}}[/latex], [latex]{\left(\frac{{b}^{5}}{c}\right)}^{3}[/latex], [latex]{\left(\frac{5}{{u}^{8}}\right)}^{4}[/latex], [latex]{\left(\frac{-1}{{w}^{3}}\right)}^{35}[/latex], [latex]{\left({p}^{-4}{q}^{3}\right)}^{8}[/latex], [latex]{\left({c}^{-5}{d}^{-3}\right)}^{4}[/latex], [latex]\frac{1}{{c}^{20}{d}^{12}}[/latex], [latex]{\left(6{m}^{2}{n}^{-1}\right)}^{3}[/latex], [latex]{17}^{5}\cdot {17}^{-4}\cdot {17}^{-3}[/latex], [latex]{\left(\frac{{u}^{-1}v}{{v}^{-1}}\right)}^{2}[/latex], [latex]\left(-2{a}^{3}{b}^{-1}\right)\left(5{a}^{-2}{b}^{2}\right)[/latex], [latex]{\left({x}^{2}\sqrt{2}\right)}^{4}{\left({x}^{2}\sqrt{2}\right)}^{-4}[/latex], [latex]\frac{{\left(3{w}^{2}\right)}^{5}}{{\left(6{w}^{-2}\right)}^{2}}[/latex], [latex]\begin{array}{cccc}\hfill {\left(6{m}^{2}{n}^{-1}\right)}^{3}& =& {\left(6\right)}^{3}{\left({m}^{2}\right)}^{3}{\left({n}^{-1}\right)}^{3}\hfill & \text{The power of a product rule}\hfill \\ & =& {6}^{3}{m}^{2\cdot 3}{n}^{-1\cdot 3}\hfill & \text{The power rule}\hfill \\ & =& \text{ }216{m}^{6}{n}^{-3}\hfill & \text{Simplify}.\hfill \\ & =& \frac{216{m}^{6}}{{n}^{3}}\hfill & \text{The negative exponent rule}\hfill \end{array}[/latex], [latex]\begin{array}{cccc}\hfill {17}^{5}\cdot {17}^{-4}\cdot {17}^{-3}& =& {17}^{5 - 4-3}\hfill & \text{The product rule}\hfill \\ & =& {17}^{-2}\hfill & \text{Simplify}.\hfill \\ & =& \frac{1}{{17}^{2}}\text{ or }\frac{1}{289}\hfill & \text{The negative exponent rule}\hfill \end{array}[/latex], [latex]\begin{array}{cccc}\hfill {\left(\frac{{u}^{-1}v}{{v}^{-1}}\right)}^{2}& =& \frac{{\left({u}^{-1}v\right)}^{2}}{{\left({v}^{-1}\right)}^{2}}\hfill & \text{The power of a quotient rule}\hfill \\ & =& \frac{{u}^{-2}{v}^{2}}{{v}^{-2}}\hfill & \text{The power of a product rule}\hfill \\ & =& {u}^{-2}{v}^{2-\left(-2\right)}& \text{The quotient rule}\hfill \\ & =& {u}^{-2}{v}^{4}\hfill & \text{Simplify}.\hfill \\ & =& \frac{{v}^{4}}{{u}^{2}}\hfill & \text{The negative exponent rule}\hfill \end{array}[/latex], [latex]\begin{array}{cccc}\hfill \left(-2{a}^{3}{b}^{-1}\right)\left(5{a}^{-2}{b}^{2}\right)& =& -2\cdot 5\cdot {a}^{3}\cdot {a}^{-2}\cdot {b}^{-1}\cdot {b}^{2}\hfill & \text{Commutative and associative laws of multiplication}\hfill \\ & =& -10\cdot {a}^{3 - 2}\cdot {b}^{-1+2}\hfill & \text{The product rule}\hfill \\ & =& -10ab\hfill & \text{Simplify}.\hfill \end{array}[/latex], [latex]\begin{array}{cccc}\hfill {\left({x}^{2}\sqrt{2}\right)}^{4}{\left({x}^{2}\sqrt{2}\right)}^{-4}& =& {\left({x}^{2}\sqrt{2}\right)}^{4 - 4}\hfill & \text{The product rule}\hfill \\ & =& \text{ }{\left({x}^{2}\sqrt{2}\right)}^{0}\hfill & \text{Simplify}.\hfill \\ & =& 1\hfill & \text{The zero exponent rule}\hfill \end{array}[/latex], [latex]\begin{array}{cccc}\hfill \frac{{\left(3{w}^{2}\right)}^{5}}{{\left(6{w}^{-2}\right)}^{2}}& =& \frac{{\left(3\right)}^{5}\cdot {\left({w}^{2}\right)}^{5}}{{\left(6\right)}^{2}\cdot {\left({w}^{-2}\right)}^{2}}\hfill & \text{The power of a product rule}\hfill \\ & =& \frac{{3}^{5}{w}^{2\cdot 5}}{{6}^{2}{w}^{-2\cdot 2}}\hfill & \text{The power rule}\hfill \\ & =& \frac{243{w}^{10}}{36{w}^{-4}}\hfill & \text{Simplify}.\hfill \\ & =& \frac{27{w}^{10-\left(-4\right)}}{4}\hfill & \text{The quotient rule and reduce fraction}\hfill \\ & =& \frac{27{w}^{14}}{4}\hfill & \text{Simplify}.\hfill \end{array}[/latex], [latex]{\left(2u{v}^{-2}\right)}^{-3}[/latex], [latex]{x}^{8}\cdot {x}^{-12}\cdot x[/latex], [latex]{\left(\frac{{e}^{2}{f}^{-3}}{{f}^{-1}}\right)}^{2}[/latex], [latex]\left(9{r}^{-5}{s}^{3}\right)\left(3{r}^{6}{s}^{-4}\right)[/latex], [latex]{\left(\frac{4}{9}t{w}^{-2}\right)}^{-3}{\left(\frac{4}{9}t{w}^{-2}\right)}^{3}[/latex], [latex]\frac{{\left(2{h}^{2}k\right)}^{4}}{{\left(7{h}^{-1}{k}^{2}\right)}^{2}}[/latex].