Simplifying Complex Expressions II
Learning Outcomes
- Simplify complex expressions using a combination of exponent rules
- Simplify quotients that require a combination of the properties of exponents
Simplify expressions using a combination of exponent rules
Once the rules of exponents are understood, you can begin simplifying more complicated expressions. There are many applications and formulas that make use of exponents, and sometimes expressions can get pretty cluttered. We already looked at how to simplify exponential expressions in the previous section, but we are now going to show some more complex examples of exponential expressions and look at some strategies for how we can successfully use the properties of exponents to simplify these expressions. Simplifying an expression before evaluating can often make the computation easier, as you will see in the following example which makes use of the quotient rule to simplify before substituting [latex]4[/latex] for [latex]x[/latex].Example
Evaluate [latex] \displaystyle \frac{24{{x}^{8}}}{2{{x}^{5}}}[/latex] when [latex]x=4[/latex].Answer: Separate into numerical and variable factors. [latex-display] \displaystyle \left( \frac{24}{2} \right)\left( \frac{{{x}^{8}}}{{{x}^{5}}} \right)[/latex-display] Divide coefficients, and subtract the exponents of the variables. [latex-display] \displaystyle 12\left( {{x}^{8-5}} \right)[/latex-display] Simplify. [latex-display] \displaystyle 12{{x}^{3}}[/latex-display] Substitute the value [latex]4[/latex] for the variable [latex]x[/latex]. [latex-display] \displaystyle (12)({{4}^{3}})=12\cdot 64[/latex-display]
Answer
[latex-display] \displaystyle \frac{24{{x}^{8}}}{2{{x}^{5}}}[/latex] = [latex]768[/latex-display]Example
Evaluate [latex] \displaystyle \frac{24{{x}^{8}}{{y}^{2}}}{{{(2{{x}^{3}}y)}^{2}}}[/latex] when [latex]x=4[/latex] and [latex]y=-2[/latex].Answer: In the denominator, notice that a product is being raised to a power. Use the rules of exponents to simplify the denominator.
[latex] \displaystyle{\left(2{x}^{3}y\right)}^{2}={2}^{2}{x}^{3\cdot 2}{y}^{2}={2}^{2}{x}^{6}{y}^{2}={4x^{6}y^{2}}[/latex]
Here is the fraction with a simplified denominator:[latex]\frac{24x^{8}y^{2}}{4x^{6}y^{2}}[/latex]
Separate into numerical and variable factors to simplify further.[latex] \displaystyle \left( \frac{24}{4} \right)\left( \frac{{{x}^{8}}}{{{x}^{6}}} \right)\left( \frac{{{y}^{2}}}{{{y}^{2}}}\right)[/latex]
Divide coefficients, use the Quotient Rule to divide the variables—subtract the exponents.[latex] \displaystyle 6\left( {{x}^{8-6}} \right)\left( {{y}^{2-2}} \right)[/latex]
Simplify. Remember that [latex]y^{0}[/latex] is [latex]1[/latex].[latex] \displaystyle 6{{x}^{2}}{{y}^{0}}=6{{x}^{2}}[/latex]
Substitute the value [latex]4[/latex] for the variable [latex]x[/latex].[latex] \displaystyle (6)({{4}^{2}})=6\cdot 16[/latex]
Answer
[latex-display] \displaystyle \frac{24{{x}^{8}}{{y}^{2}}}{{{(2{{x}^{3}}y)}^{2}}}=96[/latex] when [latex]x=4[/latex] and [latex]y=-2[/latex-display]Try It
[ohm_question]2856[/ohm_question]Example
Simplify. [latex]a^{2}\left(a^{5}\right)^{3}[/latex]Answer: Raise [latex]a^{5}[/latex] to the power of [latex]3[/latex] by multiplying the exponents together (the Power Rule).
[latex] \displaystyle {{a}^{2}}{{a}^{5\cdot 3}}[/latex]
Since the exponents share the same base, a, they can be combined (the Product Rule).[latex] \displaystyle {{a}^{2}}{{a}^{15}}\\{{a}^{2+15}}[/latex]
Answer
[latex-display] \displaystyle {{a}^{2}}{{({{a}^{5}})}^{3}}={{a}^{17}}[/latex-display]Try It
[ohm_question]15516[/ohm_question]Example
Simplify. [latex] \displaystyle \frac{{{a}^{2}}{{({{a}^{5}})}^{3}}}{8{{a}^{8}}}[/latex]Answer: Use the order of operations. Parentheses, Exponents, Multiply/ Divide, Add/ Subtract There is nothing inside parentheses or brackets that we can simplify further, so we will evaluate exponents first. Use the Power Rule to simplify [latex]\left(a^{5}\right)^{3}[/latex].
[latex]\left(a^{5}\right)^{3}=a^{5\cdot{3}}=a^{15}[/latex]
The expression now looks like this:
[latex] \displaystyle\frac{{{a}^{2}}{{a}^{15}}}{8{{a}^{8}}}[/latex]
Now we can multiply, using the Product Rule to simplify the numerator because the bases are the same.[latex] \displaystyle{{a}^{2}}{{a}^{15}}=a^{17}[/latex], and the expression looks like this:
[latex]\displaystyle\frac{{{{a}^{17}}}}{{8{{a}^{8}}}}[/latex]
Now we can divide using the Quotient Rule.[latex] \displaystyle \frac{{{a}^{17-8}}}{8}[/latex]
Answer
[latex-display] \displaystyle \frac{{{a}^{2}}{{({{a}^{5}})}^{3}}}{8{{a}^{8}}}=\frac{{{a}^{9}}}{8}[/latex-display]Try It
[ohm_question]14055[/ohm_question]Simplify Expressions With Negative Exponents
Now we will add the last layer to our exponent simplifying skills and practice simplifying compound expressions that have negative exponents in them. It is standard convention to write exponents as positive because it is easier for the user to understand the value associated with positive exponents, rather than negative exponents. Use the following summary of negative exponents to help you simplify expressions with negative exponents.Rules for Negative Exponents
With a, b, m, and n not equal to zero, and m and n as integers, the following rules apply:[latex]a^{-m}=\frac{1}{a^{m}}[/latex]
[latex]\frac{1}{a^{-m}}=a^{m}[/latex]
[latex]\frac{a^{-n}}{b^{-m}}=\frac{b^m}{a^n}[/latex]
- Rewrite negative exponents as positive exponents
- Apply the product rule to eliminate any "outer" layer exponents such as in the following term: [latex]\left(5y^3\right)^2[/latex]
Rewrite with positive Exponents First | Description of Steps Taken | Apply the Product Rule for Exponents First | Description of Steps Taken |
[latex] \frac{\left(4x^{3}\right)^{5}}{\left(2x^{2}\right)^{4}}[/latex] | move the term [latex]{{\left( 2{{x}^{2}} \right)}^{-4}}[/latex] to the denominator with a positive exponent | [latex] \left(4^5x^{15}\right)\left(2^{-4}x^{-8}\right)[/latex] | Apply the exponent of 5 to each term in expression on the left, and the exponent of -4 to each term in the expression on the right. |
[latex]\frac{\left(4^5x^{15}\right)}{\left(2^4x^{8}\right)}[/latex] | Use the product rule to apply the outer exponents to the terms inside each set of parentheses. | [latex]\left(4^5\right)\left(2^{-4}\right)\left(x^{15}\cdot{x^{-8}}\right)[/latex] | Regroup the numerical terms and the variables to make combining like terms easier |
[latex]\left(\frac{4^5}{2^4}\right)\left(\frac{x^{15}}{x^{8}}\right)[/latex] | Regroup the numerical terms and the variables to make combining like terms easier | [latex]\left(4^5\right)\left(2^{-4}\right)\left(x^{15-8}\right)[/latex] | Use the rule for multiplying terms with exponents to simplify the x terms |
[latex]\left(\frac{4^5}{2^4}\right)\left(x^{15-8}\right)[/latex] | Use the quotient rule to simplify the x terms | [latex]\left(\frac{4^5}{2^4}\right)\left(x^{7}\right)[/latex] | Rewrite all the negative exponents with positive exponents |
[latex]\left(\frac{1,024}{16}\right)\left(x^{7}\right)[/latex] | Expand the numerical terms | [latex]\left(\frac{1,024}{16}\right)\left(x^{7}\right)[/latex] | Expand the numerical terms |
[latex]64x^{7}[/latex] | Divide the numerical terms | [latex]64x^{7}[/latex] | Divide the numerical terms |
Example
Simplify [latex]\frac{\left(t^{3}\right)^2}{\left(t^2\right)^{-8}}[/latex] Write your answer with positive exponents.Answer: We can either rewrite this expression with positive exponents first or use the Product Raised to a Power Rule first. Let's start by simplifying the numerator and denominator using the Product Raised to a Power Rule. Numerator: [latex]\left(t^{3}\right)^2=t^{3\cdot{2}}=t^6[/latex] Denominator: [latex]\left(t^2\right)^{-8}=t^{2\cdot{-8}}=t^{-16}[/latex] Now the expression looks like this:
[latex]\frac{t^6}{t^{-16}}[/latex]
We can use the quotient rule because we have the same base. Quotient Rule: [latex]\frac{t^6}{t^{-16}}=t^{6-\left(-16\right)}=t^{6+16}=t^{22}[/latex]Answer
[latex-display]\frac{\left(t^{3}\right)^2}{\left(t^2\right)^{-8}}=t^{22}[/latex-display]Try It
[ohm_question]133473[/ohm_question]Example
Simplify [latex]\frac{\left(5x\right)^{-2}y}{x^3y^{-1}}[/latex] Write your answer with positive exponents.Answer: This time, let's start by rewriting the terms in the expression so they have positive exponents. The terms with negative exponents in the top will go to the bottom of the fraction, and the terms with negative exponents in the bottom will go to the top.
[latex]\begin{array}{c}\frac{\left(5x\right)^{-2}y}{x^3y^{-1}}\\\text{ }\\=\frac{\left({y^{1}}\right)y}{x^3\left(5x\right)^{2}}\end{array}[/latex]
Note how we left the single [latex]y[/latex] term in the top because it did not have a negative exponent on it, and we left the [latex]x^3[/latex] term in the bottom because it did not have a negative exponent on it. Now we can apply the Product Raised to a Power Rule:[latex]\frac{yy^{1}}{5^{2}x^3x^{2}}[/latex]
Use the product rule to simplify further:[latex]\frac{yy^{1}}{5^{2}x^3x^{2}}=\frac{y^2}{25x^{3+2}}=\frac{y^2}{25x^5}[/latex]
We can't simplify any further, so our answer is
Answer
[latex-display]\frac{\left(5x\right)^{-2}y}{x^3y^{-1}}=\frac{y^2}{25x^5}[/latex-display]Contribute!
Licenses & Attributions
CC licensed content, Original
- Simplify and Evaluate Compound Exponential Expressions. Authored by: James Sousa (Mathispower4u.com) for Lumen Learning. License: CC BY: Attribution.
- Simplify Compound Exponential Expressions 1. Authored by: James Sousa (Mathispower4u.com) for Lumen Learning. License: CC BY: Attribution.
- Revision and Adaptation. Provided by: Lumen Learning License: CC BY: Attribution.
CC licensed content, Shared previously
- Unit 11: Exponents and Polynomials, from Developmental Math: An Open Program. Provided by: Monterey Institute of Technology Located at: https://www.nroc.org/. License: CC BY: Attribution.