Equations With Radicals and Rational Exponents
Learning Outcomes
- Solve a radical equation, identify extraneous solution.
- Solve an equation with rational exponents.
A General Note: Radical Equations
An equation containing terms with a variable in the radicand is called a radical equation.How To: Given a radical equation, solve it
- Isolate the radical expression on one side of the equal sign. Put all remaining terms on the other side.
- If the radical is a square root, then square both sides of the equation. If it is a cube root, then raise both sides of the equation to the third power. In other words, for an nth root radical, raise both sides to the nth power. Doing so eliminates the radical symbol.
- Solve the resulting equation.
- If a radical term still remains, repeat steps 1–2.
- Check solutions by substituting them into the original equation.
recall multiplying polynomial expressions
When squaring (or raising to any power) both sides of an equation as in step (2) above, don't forget to apply the properties of exponents carefully and distribute all the terms appropriately. [latex-display]\left(x + 3\right)^2 \neq x^2+9[/latex-display] [latex-display]\left(x + 3\right)^2 = \left(x+3\right)\left(x+3\right)=x^2+6x+9[/latex-display] The special form for perfect square trinomials comes in handy when solving radical equations. [latex-display]\left(a + b\right)^2 = a^2 + 2ab + b^2[/latex-display] [latex-display]\left(a - b\right)^2 = a^2 - 2ab + b^2[/latex-display] This enables us to square binomials containing radicals by following the form. [latex-display]\begin{align} \left(x - \sqrt{3x - 7}\right)^2 &= x^2 - 2\sqrt{3x-7}+\left(\sqrt{3x-7}\right)^2 \\ &=x^2 - 2\sqrt{3x-7}+3x-7\end{align}[/latex-display]Example: Solving an Equation with One Radical
Solve [latex]\sqrt{15 - 2x}=x[/latex].Answer: The radical is already isolated on the left side of the equal sign, so proceed to square both sides.
Try It
Solve the radical equation: [latex]\sqrt{x+3}=3x - 1[/latex]Answer: [latex]x=1[/latex]; extraneous solution [latex]x=-\frac{2}{9}[/latex]
[ohm_question]2118[/ohm_question]Example: Solving a Radical Equation Containing Two Radicals
Solve [latex]\sqrt{2x+3}+\sqrt{x - 2}=4[/latex].Answer: As this equation contains two radicals, we isolate one radical, eliminate it, and then isolate the second radical.
Try It
Solve the equation with two radicals: [latex]\sqrt{3x+7}+\sqrt{x+2}=1[/latex].Answer: [latex-display]x=-2[/latex]; extraneous solution [latex]x=-1[/latex-display]
[ohm_question]2608[/ohm_question]Solve Equations With Rational Exponents
Rational exponents are exponents that are fractions, where the numerator is a power and the denominator is a root. For example, [latex]{16}^{\frac{1}{2}}[/latex] is another way of writing [latex]\sqrt{16}[/latex] and [latex]{8}^{\frac{2}{3}}[/latex] is another way of writing [latex]\left(\sqrt[3]{8}\right)^2[/latex].We can solve equations in which a variable is raised to a rational exponent by raising both sides of the equation to the reciprocal of the exponent. The reason we raise the equation to the reciprocal of the exponent is because we want to eliminate the exponent on the variable term, and a number multiplied by its reciprocal equals 1. For example, [latex]\frac{2}{3}\left(\frac{3}{2}\right)=1[/latex].
recall rewriting expressions containing exponents
Recall the properties used to simplify expressions containing exponents. They work the same whether the exponent is an integer or a fraction. It is helpful to remind yourself of these properties frequently throughout the course. They will by handy from now on in all the mathematics you'll do.Product Rule: [latex]{a}^{m}\cdot {a}^{n}={a}^{m+n}[/latex]
Quotient Rule: [latex]\dfrac{{a}^{m}}{{a}^{n}}={a}^{m-n}[/latex]
Power Rule: [latex]{\left({a}^{m}\right)}^{n}={a}^{m\cdot n}[/latex]
Zero Exponent: [latex]{a}^{0}=1[/latex]
Negative Exponent: [latex]{a}^{-n}=\dfrac{1}{{a}^{n}} \text{ and } {a}^{n}=\dfrac{1}{{a}^{-n}}[/latex]
Power of a Product: [latex]\left(ab\right)^n=a^nb^n[/latex]
Power of a Quotient: [latex]\left(\dfrac{a}{b}\right)^n=\dfrac{a^n}{b^n}[/latex]
A General Note: Rational Exponents
A rational exponent indicates a power in the numerator and a root in the denominator. There are multiple ways of writing an expression, a variable, or a number with a rational exponent:Example: Evaluating a Number Raised to a Rational Exponent
Evaluate [latex]{8}^{\frac{2}{3}}[/latex].Answer: Whether we take the root first or the power first depends on the number. It is easy to find the cube root of 8, so rewrite [latex]{8}^{\frac{2}{3}}[/latex] as [latex]{\left({8}^{\frac{1}{3}}\right)}^{2}[/latex].
Try It
Evaluate [latex]{64}^{-\frac{1}{3}}[/latex].Answer: [latex]\frac{1}{4}[/latex]
[ohm_question]2552[/ohm_question]Example: Solving an Equation involving a Variable raised to a Rational Exponent
Solve the equation in which a variable is raised to a rational exponent: [latex]{x}^{\frac{5}{4}}=32[/latex].Answer: The way to remove the exponent on x is by raising both sides of the equation to a power that is the reciprocal of [latex]\frac{5}{4}[/latex], which is [latex]\frac{4}{5}[/latex].
Try It
Solve the equation [latex]{x}^{\frac{3}{2}}=125[/latex].Answer: [latex]25[/latex]
[ohm_question]38391[/ohm_question]Recall factoring when the gcf is a variable
Remember, when factoring a GCF (greatest common factor) from a polynomial expression, factor out the smallest power of the variable present in each term. This works whether the exponent on the variable is an integer or a fraction.Example: Solving an Equation Involving Rational Exponents and Factoring
Solve [latex]3{x}^{\frac{3}{4}}={x}^{\frac{1}{2}}[/latex].Answer: This equation involves rational exponents as well as factoring rational exponents. Let us take this one step at a time. First, put the variable terms on one side of the equal sign and set the equation equal to zero.
Try It
Solve: [latex]{\left(x+5\right)}^{\frac{3}{2}}=8[/latex].Answer: [latex]-1[/latex]
[ohm_question]38406[/ohm_question]Licenses & Attributions
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