1.2 Exponents and scientific notation (Page 3/9)

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Write each of the following products with a single base. Do not simplify further.

${({(3 y)}^{8})}^{3}$
${(t^{5})}^{7}$
${({(- g)}^{4})}^{4}$

${(3 y)}^{24}$
$t^{35}$
${(- g)}^{16}$

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Using the zero exponent rule of exponents

Return to the quotient rule. We made the condition that $m > n$ so that the difference $m - n$ would never be zero or negative. What would happen if $m = n ?$ In this case, we would use the zero exponent rule of exponents to simplify the expression to 1. To see how this is done, let us begin with an example.

\frac{t^{8}}{t^{8}} = \frac{t^{8}}{t^{8}} = 1

If we were to simplify the original expression using the quotient rule, we would have

\frac{t^{8}}{t^{8}} = t^{8 - 8} = t^{0}

If we equate the two answers, the result is $t^{0} = 1.$ This is true for any nonzero real number, or any variable representing a real number.

a^{0} = 1

The sole exception is the expression $0^{0} .$ This appears later in more advanced courses, but for now, we will consider the value to be undefined.

A General Note

The zero exponent rule of exponents

For any nonzero real number $a,$ the zero exponent rule of exponents states that

a^{0} = 1

Using the zero exponent rule

Simplify each expression using the zero exponent rule of exponents.

$\frac{c^{3}}{c^{3}}$
$\frac{−3 x^{5}}{x^{5}}$
$\frac{{(j^{2} k)}^{4}}{(j^{2} k) \cdot {(j^{2} k)}^{3}}$
$\frac{5 {(r s^{2})}^{2}}{{(r s^{2})}^{2}}$

Use the zero exponent and other rules to simplify each expression.

$\begin{matrix} \frac{c^{3}}{c^{3}} & = & c^{3 - 3} \\ = & c^{3 - 3} \\ = & c^{3 - 3} \end{matrix}$
$\begin{matrix} \frac{−3 x^{5}}{x^{5}} & = & −3 \cdot \frac{x^{5}}{x^{5}} \\ = & −3 \cdot x^{5 - 5} \\ = & −3 \cdot x^{0} \\ = & −3 \cdot 1 \\ = & −3 \end{matrix}$
$\begin{matrix} \frac{{(j^{2} k)}^{4}}{(j^{2} k) \cdot {(j^{2} k)}^{3}} & = & \frac{{(j^{2} k)}^{4}}{{(j^{2} k)}^{1 + 3}} & Use the product rule in the denominator . \\ = & \frac{{(j^{2} k)}^{4}}{{(j^{2} k)}^{4}} & Simplify . \\ = & {(j^{2} k)}^{4 - 4} & Use the quotient rule . \\ = & {(j^{2} k)}^{0} & Simplify . \\ = & 1 \end{matrix}$
$\begin{matrix} \frac{5 {(r s^{2})}^{2}}{{(r s^{2})}^{2}} & = & 5 {(r s^{2})}^{2 - 2} & Use the quotient rule . \\ = & 5 {(r s^{2})}^{0} & Simplify . \\ = & 5 \cdot 1 & Use the zero exponent rule . \\ = & 5 & Simplify . \end{matrix}$

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Simplify each expression using the zero exponent rule of exponents.

$\frac{t^{7}}{t^{7}}$
$\frac{{(d e^{2})}^{11}}{2 {(d e^{2})}^{11}}$
$\frac{w^{4} \cdot w^{2}}{w^{6}}$
$\frac{t^{3} \cdot t^{4}}{t^{2} \cdot t^{5}}$

$1$
$\frac{1}{2}$
$1$
$1$

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Using the negative rule of exponents

Another useful result occurs if we relax the condition that $m > n$ in the quotient rule even further. For example, can we simplify $\frac{h^{3}}{h^{5}} ?$ When $m < n$ —that is, where the difference $m - n$ is negative—we can use the negative rule of exponents to simplify the expression to its reciprocal.

Divide one exponential expression by another with a larger exponent. Use our example, $\frac{h^{3}}{h^{5}} .$

\begin{matrix} \frac{h^{3}}{h^{5}} & = & \frac{h \cdot h \cdot h}{h \cdot h \cdot h \cdot h \cdot h} \\ = & \frac{h \cdot h \cdot h}{h \cdot h \cdot h \cdot h \cdot h} \\ = & \frac{1}{h \cdot h} \\ = & \frac{1}{h^{2}} \end{matrix}

If we were to simplify the original expression using the quotient rule, we would have

\begin{matrix} \frac{h^{3}}{h^{5}} & = & h^{3 - 5} \\ = & h^{−2} \end{matrix}

Putting the answers together, we have $h^{−2} = \frac{1}{h^{2}} .$ This is true for any nonzero real number, or any variable representing a nonzero real number.

A factor with a negative exponent becomes the same factor with a positive exponent if it is moved across the fraction bar—from numerator to denominator or vice versa.

\begin{matrix} a^{- n} = \frac{1}{a^{n}} & and & a^{n} = \frac{1}{a^{- n}} \end{matrix}

We have shown that the exponential expression $a^{n}$ is defined when $n$ is a natural number, 0, or the negative of a natural number. That means that $a^{n}$ is defined for any integer $n .$ Also, the product and quotient rules and all of the rules we will look at soon hold for any integer $n .$

A General Note

The negative rule of exponents

For any nonzero real number $a$ and natural number $n,$ the negative rule of exponents states that

a^{- n} = \frac{1}{a^{n}}

Using the negative exponent rule

Write each of the following quotients with a single base. Do not simplify further. Write answers with positive exponents.

$\frac{θ^{3}}{θ^{10}}$
$\frac{z^{2} \cdot z}{z^{4}}$
$\frac{{(−5 t^{3})}^{4}}{{(−5 t^{3})}^{8}}$

$\frac{θ^{3}}{θ^{10}} = θ^{3 - 10} = θ^{−7} = \frac{1}{θ^{7}}$
$\frac{z^{2} \cdot z}{z^{4}} = \frac{z^{2 + 1}}{z^{4}} = \frac{z^{3}}{z^{4}} = z^{3 - 4} = z^{−1} = \frac{1}{z}$
$\frac{{(−5 t^{3})}^{4}}{{(−5 t^{3})}^{8}} = {(−5 t^{3})}^{4 - 8} = {(−5 t^{3})}^{−4} = \frac{1}{{(−5 t^{3})}^{4}}$

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Questions & Answers

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Source: OpenStax, College algebra. OpenStax CNX. Feb 06, 2015 Download for free at https://legacy.cnx.org/content/col11759/1.3

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