6.5 Divide monomials (Page 4/4)

Elementary algebra Page 4 / 4

Simplify: $\frac{{(2 x^{4})}^{5}}{{(4 x^{3})}^{2} {(x^{3})}^{5}} .$

$\frac{2}{x}$

Divide monomials

You have now been introduced to all the properties of exponents and used them to simplify expressions. Next, you’ll see how to use these properties to divide monomials. Later, you’ll use them to divide polynomials.

Find the quotient: $56 x^{7} \div 8 x^{3} .$

Solution

$\begin{matrix} 56 x^{7} \div 8 x^{3} \\ Rewrite as a fraction. & \frac{56 x^{7}}{8 x^{3}} \\ Use fraction multiplication. & \frac{56}{8} \cdot \frac{x^{7}}{x^{3}} \\ Simplify and use the Quotient Property. & 7 x^{4} \end{matrix}$

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Find the quotient: $42 y^{9} \div 6 y^{3} .$

$7 y^{6}$

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Find the quotient: $48 z^{8} \div 8 z^{2} .$

$6 z^{6}$

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Find the quotient: $\frac{45 a^{2} b^{3}}{−5 a b^{5}} .$

Solution

When we divide monomials with more than one variable, we write one fraction for each variable.

$\begin{matrix} \frac{45 a^{2} b^{3}}{−5 a b^{5}} \\ Use fraction multiplication. & \frac{45}{−5} \cdot \frac{a^{2}}{a} \cdot \frac{b^{3}}{b^{5}} \\ Simplify and use the Quotient Property. & −9 \cdot a \cdot \frac{1}{b^{2}} \\ Multiply. & - \frac{9 a}{b^{2}} \end{matrix}$

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Find the quotient: $\frac{−72 a^{7} b^{3}}{8 a^{12} b^{4}} .$

$- \frac{9}{a^{5} b}$

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Find the quotient: $\frac{−63 c^{8} d^{3}}{7 c^{12} d^{2}} .$

$\frac{−9 d}{c^{4}}$

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Find the quotient: $\frac{24 a^{5} b^{3}}{48 a b^{4}} .$

Solution

$\begin{matrix} \frac{24 a^{5} b^{3}}{48 a b^{4}} \\ Use fraction multiplication. & \frac{24}{48} \cdot \frac{a^{5}}{a} \cdot \frac{b^{3}}{b^{4}} \\ Simplify and use the Quotient Property. & \frac{1}{2} \cdot a^{4} \cdot \frac{1}{b} \\ Multiply. & \frac{a^{4}}{2 b} \end{matrix}$

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Find the quotient: $\frac{16 a^{7} b^{6}}{24 a b^{8}} .$

$\frac{2 a^{6}}{3 b^{2}}$

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Find the quotient: $\frac{27 p^{4} q^{7}}{−45 p^{12} q} .$

$- \frac{3 q^{6}}{5 p^{8}}$

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Once you become familiar with the process and have practiced it step by step several times, you may be able to simplify a fraction in one step.

Find the quotient: $\frac{14 x^{7} y^{12}}{21 x^{11} y^{6}} .$

Solution

Be very careful to simplify $\frac{14}{21}$ by dividing out a common factor, and to simplify the variables by subtracting their exponents.

$\begin{matrix} \frac{14 x^{7} y^{12}}{21 x^{11} y^{6}} \\ Simplify and use the Quotient Property. & \frac{2 y^{6}}{3 x^{4}} \end{matrix}$

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Find the quotient: $\frac{28 x^{5} y^{14}}{49 x^{9} y^{12}} .$

$\frac{4 y^{2}}{7 x^{4}}$

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Find the quotient: $\frac{30 m^{5} n^{11}}{48 m^{10} n^{14}} .$

$\frac{5}{8 m^{5} n^{3}}$

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In all examples so far, there was no work to do in the numerator or denominator before simplifying the fraction. In the next example, we’ll first find the product of two monomials in the numerator before we simplify the fraction. This follows the order of operations. Remember, a fraction bar is a grouping symbol.

Find the quotient: $\frac{(6 x^{2} y^{3}) (5 x^{3} y^{2})}{(3 x^{4} y^{5})} .$

Solution

$\begin{matrix} \frac{(6 x^{2} y^{3}) (5 x^{3} y^{2})}{(3 x^{4} y^{5})} \\ Simplify the numerator. & \frac{30 x^{5} y^{5}}{3 x^{4} y^{5}} \\ Simplify. & 10 x \end{matrix}$

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Find the quotient: $\frac{(6 a^{4} b^{5}) (4 a^{2} b^{5})}{12 a^{5} b^{8}} .$

$2 a b^{2}$

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Find the quotient: $\frac{(−12 x^{6} y^{9}) (−4 x^{5} y^{8})}{−12 x^{10} y^{12}} .$

$−4 x y^{5}$

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Access these online resources for additional instruction and practice with dividing monomials:

Key concepts

Quotient Property for Exponents:
- If $a$ is a real number, $a \neq 0$ , and $m, n$ are whole numbers, then:
  $\frac{a^{m}}{a^{n}} = a^{m - n}, m > n and \frac{a^{m}}{a^{n}} = \frac{1}{a^{m - n}}, n > m$
Zero Exponent
- If $a$ is a non-zero number, then $a^{0} = 1$ .
Quotient to a Power Property for Exponents :
- If $a$ and $b$ are real numbers, $b \neq 0,$ and $m$ is a counting number, then:
  ${(\frac{a}{b})}^{m} = \frac{a^{m}}{b^{m}}$
- To raise a fraction to a power, raise the numerator and denominator to that power.
Summary of Exponent Properties
- If $a, b$ are real numbers and $m, n$ are whole numbers, then
  $\begin{matrix} Product Property & a^{m} \cdot a^{n} & = & a^{m + n} \\ Power Property & {(a^{m})}^{n} & = & a^{m \cdot n} \\ Product to a Power & {(a b)}^{m} & = & a^{m} b^{m} \\ Quotient Property & \frac{a^{m}}{b^{m}} & = & a^{m - n}, a \neq 0, m > n \\ \frac{a^{m}}{a^{n}} & = & \frac{1}{a^{n - m}}, a \neq 0, n > m \\ Zero Exponent Definition & a^{o} & = & 1, a \neq 0 \\ Quotient to a Power Property & {(\frac{a}{b})}^{m} & = & \frac{a^{m}}{b^{m}}, b \neq 0 \end{matrix}$

Practice makes perfect

Simplify Expressions Using the Quotient Property for Exponents

In the following exercises, simplify.

ⓐ $\frac{x^{18}}{x^{3}}$ ⓑ $\frac{5^{12}}{5^{3}}$

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ⓐ $\frac{y^{20}}{y^{10}}$ ⓑ $\frac{7^{16}}{7^{2}}$

ⓐ $y^{10}$ ⓑ $7^{14}$

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ⓐ $\frac{p^{21}}{p^{7}}$ ⓑ $\frac{4^{16}}{4^{4}}$

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ⓐ $\frac{u^{24}}{u^{3}}$ ⓑ $\frac{9^{15}}{9^{5}}$

ⓐ $u^{21}$ ⓑ $9^{10}$

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ⓐ $\frac{q^{18}}{q^{36}}$ ⓑ $\frac{10^{2}}{10^{3}}$

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ⓐ $\frac{t^{10}}{t^{40}}$ ⓑ $\frac{8^{3}}{8^{5}}$

ⓐ $\frac{1}{t^{30}}$ ⓑ $\frac{1}{64}$

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ⓐ $\frac{b}{b^{9}}$ ⓑ $\frac{4}{4^{6}}$

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ⓐ $\frac{x}{x^{7}}$ ⓑ $\frac{10}{10^{3}}$

ⓐ $\frac{1}{x^{6}}$ ⓑ $\frac{1}{100}$

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Simplify Expressions with Zero Exponents

In the following exercises, simplify.

ⓐ $20^{0}$
ⓑ $b^{0}$

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ⓐ $13^{0}$
ⓑ $k^{0}$

ⓐ 1 ⓑ 1

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ⓐ $− 27^{0}$
ⓑ $− (27^{0})$

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ⓐ $− 15^{0}$
ⓑ $− (15^{0})$

ⓐ $−1$ ⓑ $−1$

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ⓐ ${(25 x)}^{0}$
ⓑ $25 x^{0}$

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ⓐ ${(6 y)}^{0}$
ⓑ $6 y^{0}$

ⓐ 1 ⓑ 6

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ⓐ ${(12 x)}^{0}$
ⓑ ${(−56 p^{4} q^{3})}^{0}$

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ⓐ $7 y^{0}$ ${(17 y)}^{0}$
ⓑ ${(−93 c^{7} d^{15})}^{0}$

ⓐ 7 ⓑ 1

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ⓐ $12 n^{0} - 18 m^{0}$
ⓑ ${(12 n)}^{0} - {(18 m)}^{0}$

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ⓐ $15 r^{0} - 22 s^{0}$
ⓑ ${(15 r)}^{0} - {(22 s)}^{0}$

ⓐ $−7$ ⓑ 0

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Simplify Expressions Using the Quotient to a Power Property

In the following exercises, simplify.

ⓐ ${(\frac{3}{4})}^{3}$ ⓑ ${(\frac{p}{2})}^{5}$ ⓒ ${(\frac{x}{y})}^{6}$

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ⓐ ${(\frac{2}{5})}^{2}$ ⓑ ${(\frac{x}{3})}^{4}$ ⓒ ${(\frac{a}{b})}^{5}$

ⓐ $\frac{4}{25}$ ⓑ $\frac{x^{4}}{81}$ ⓒ $\frac{a^{5}}{b^{5}}$

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ⓐ ${(\frac{a}{3 b})}^{4}$ ⓑ ${(\frac{5}{4 m})}^{2}$

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ⓐ ${(\frac{x}{2 y})}^{3}$ ⓑ ${(\frac{10}{3 q})}^{4}$

ⓐ $\frac{x^{3}}{8 y^{3}}$ ⓑ $\frac{10,000}{81 q^{4}}$

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Simplify Expressions by Applying Several Properties

In the following exercises, simplify.

$\frac{{(a^{2})}^{3}}{a^{4}}$

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$\frac{{(p^{3})}^{4}}{p^{5}}$

$p^{7}$

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$\frac{{(y^{3})}^{4}}{y^{10}}$

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$\frac{{(x^{4})}^{5}}{x^{15}}$

$x^{5}$

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$\frac{u^{6}}{{(u^{3})}^{2}}$

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$\frac{v^{20}}{{(v^{4})}^{5}}$

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$\frac{m^{12}}{{(m^{8})}^{3}}$

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$\frac{n^{8}}{{(n^{6})}^{4}}$

$\frac{1}{n^{16}}$

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${(\frac{p^{9}}{p^{3}})}^{5}$

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${(\frac{q^{8}}{q^{2}})}^{3}$

$q^{18}$

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${(\frac{r^{2}}{r^{6}})}^{3}$

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${(\frac{m^{4}}{m^{7}})}^{4}$

$\frac{1}{m^{12}}$

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${(\frac{p}{r^{11}})}^{2}$

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${(\frac{a}{b^{6}})}^{3}$

$\frac{a^{3}}{b^{18}}$

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${(\frac{w^{5}}{x^{3}})}^{8}$

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${(\frac{y^{4}}{z^{10}})}^{5}$

$\frac{y^{20}}{z^{50}}$

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${(\frac{2 j^{3}}{3 k})}^{4}$

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${(\frac{3 m^{5}}{5 n})}^{3}$

$\frac{27 m^{15}}{125 n^{3}}$

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${(\frac{3 c^{2}}{4 d^{6}})}^{3}$

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${(\frac{5 u^{7}}{2 v^{3}})}^{4}$

$\frac{625 u^{28}}{16 v^{^{12}}}$

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${(\frac{k^{2} k^{8}}{k^{3}})}^{2}$

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${(\frac{j^{2} j^{5}}{j^{4}})}^{3}$

$j^{9}$

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$\frac{{(t^{2})}^{5} {(t^{4})}^{2}}{{(t^{3})}^{7}}$

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$\frac{{(q^{3})}^{6} {(q^{2})}^{3}}{{(q^{4})}^{8}}$

$\frac{1}{q^{8}}$

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$\frac{{(−2 p^{2})}^{4} {(3 p^{4})}^{2}}{{(−6 p^{3})}^{2}}$

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$\frac{{(−2 k^{3})}^{2} {(6 k^{2})}^{4}}{{(9 k^{4})}^{2}}$

$64 k^{6}$

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$\frac{{(−4 m^{3})}^{2} {(5 m^{4})}^{3}}{{(−10 m^{6})}^{3}}$

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$\frac{{(−10 n^{2})}^{3} {(4 n^{5})}^{2}}{{(2 n^{8})}^{2}}$

$−4,000$

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Divide Monomials

In the following exercises, divide the monomials.

$56 b^{8} \div 7 b^{2}$

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$63 v^{10} \div 9 v^{2}$

$7 v^{8}$

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$−88 y^{15} \div 8 y^{3}$

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$−72 u^{12} \div 12 u^{4}$

$−6 u^{8}$

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$\frac{45 a^{6} b^{8}}{−15 a^{10} b^{2}}$

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$\frac{54 x^{9} y^{3}}{−18 x^{6} y^{15}}$

$- \frac{3 x^{3}}{y^{12}}$

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$\frac{15 r^{4} s^{9}}{18 r^{9} s^{2}}$

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$\frac{20 m^{8} n^{4}}{30 m^{5} n^{9}}$

$\frac{−2 m^{3}}{3 n^{5}}$

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$\frac{18 a^{4} b^{8}}{−27 a^{9} b^{5}}$

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$\frac{45 x^{5} y^{9}}{−60 x^{8} y^{6}}$

$\frac{−3 y^{3}}{4 x^{3}}$

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$\frac{64 q^{11} r^{9} s^{3}}{48 q^{6} r^{8} s^{5}}$

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$\frac{65 a^{10} b^{8} c^{5}}{42 a^{7} b^{6} c^{8}}$

$\frac{65 a^{3} b^{2}}{42 c^{3}}$

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$\frac{(10 m^{5} n^{4}) (5 m^{3} n^{6})}{25 m^{7} n^{5}}$

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$\frac{(−18 p^{4} q^{7}) (−6 p^{3} q^{8})}{−36 p^{12} q^{10}}$

$\frac{−3 q^{5}}{p^{5}}$

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$\frac{(6 a^{4} b^{3}) (4 a b^{5})}{(12 a^{2} b) (a^{3} b)}$

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$\frac{(4 u^{2} v^{5}) (15 u^{3} v)}{(12 u^{3} v) (u^{4} v)}$

$\frac{5 v^{4}}{u^{2}}$

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Mixed Practice

ⓐ $24 a^{5} + 2 a^{5}$
ⓑ $24 a^{5} - 2 a^{5}$
ⓒ $24 a^{5} \cdot 2 a^{5}$
ⓓ $24 a^{5} \div 2 a^{5}$

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ⓐ $15 n^{10} + 3 n^{10}$
ⓑ $15 n^{10} - 3 n^{10}$
ⓒ $15 n^{10} \cdot 3 n^{10}$
ⓓ $15 n^{10} \div 3 n^{10}$

ⓐ $18 n^{10}$
ⓑ $12 n^{10}$
ⓒ $45 n^{20}$
ⓓ 5

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ⓐ $p^{4} \cdot p^{6}$
ⓑ ${(p^{4})}^{6}$

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ⓐ $q^{5} \cdot q^{3}$
ⓑ ${(q^{5})}^{3}$

ⓐ $q^{8}$
ⓑ $q^{15}$

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ⓐ $\frac{y^{3}}{y}$
ⓑ $\frac{y}{y^{3}}$

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ⓐ $\frac{z^{6}}{z^{5}}$
ⓑ $\frac{z^{5}}{z^{6}}$

ⓐ $z$ ⓑ $\frac{1}{z}$

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$(8 x^{5}) (9 x) \div 6 x^{3}$

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$(4 y) (12 y^{7}) \div 8 y^{2}$

$6 y^{6}$

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$\frac{27 a^{7}}{3 a^{3}} + \frac{54 a^{9}}{9 a^{5}}$

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$\frac{32 c^{11}}{4 c^{5}} + \frac{42 c^{9}}{6 c^{3}}$

$15 c^{6}$

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$\frac{32 y^{5}}{8 y^{2}} - \frac{60 y^{10}}{5 y^{7}}$

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$\frac{48 x^{6}}{6 x^{4}} - \frac{35 x^{9}}{7 x^{7}}$

$3 x^{2}$

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$\frac{63 r^{6} s^{3}}{9 r^{4} s^{2}} - \frac{72 r^{2} s^{2}}{6 s}$

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$\frac{56 y^{4} z^{5}}{7 y^{3} z^{3}} - \frac{45 y^{2} z^{2}}{5 y}$

$− y z^{2}$

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Everyday math

Memory One megabyte is approximately $10^{6}$ bytes. One gigabyte is approximately $10^{9}$ bytes. How many megabytes are in one gigabyte?

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Memory One gigabyte is approximately $10^{9}$ bytes. One terabyte is approximately $10^{12}$ bytes. How many gigabytes are in one terabyte?

$10^{3}$

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Writing exercises

Jennifer thinks the quotient $\frac{a^{24}}{a^{6}}$ simplifies to $a^{4}$ . What is wrong with her reasoning?

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Maurice simplifies the quotient $\frac{d^{7}}{d}$ by writing $\frac{d^{7}}{d} = 7$ . What is wrong with his reasoning?

Answers will vary.

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When Drake simplified $− 3^{0}$ and ${(−3)}^{0}$ he got the same answer. Explain how using the Order of Operations correctly gives different answers.

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Robert thinks $x^{0}$ simplifies to 0. What would you say to convince Robert he is wrong?

Answers will vary.

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Self check

ⓐ After completing the exercises, use this checklist to evaluate your mastery of the objectives of this section.

This is a table that has six rows and four columns. In the first row, which is a header row, the cells read from left to right “I can…,” “Confidently,” “With some help,” and “No-I don’t get it!” The first column below “I can…” reads “simplify expressions using the Quotient Property for Exponents,” “simplify expressions with zero exponents,” “simplify expressions using the Quotient to a Power Property,” “simplify expressions by applying several properties,” and “divide monomials.” The rest of the cells are blank.

ⓑ On a scale of 1-10, how would you rate your mastery of this section in light of your responses on the checklist? How can you improve this?

Questions & Answers

how does Neisseria cause meningitis

Nyibol Reply

what is microbiologist

Muhammad Reply

what is errata

Muhammad

is the branch of biology that deals with the study of microorganisms.

Ntefuni Reply

What is microbiology

Mercy Reply

studies of microbes

Louisiaste

when we takee the specimen which lumbar,spin,

Ziyad Reply

How bacteria create energy to survive?

Muhamad Reply

Bacteria doesn't produce energy they are dependent upon their substrate in case of lack of nutrients they are able to make spores which helps them to sustain in harsh environments

_Adnan

But not all bacteria make spores, l mean Eukaryotic cells have Mitochondria which acts as powerhouse for them, since bacteria don't have it, what is the substitution for it?

Muhamad

they make spores

Louisiaste

what is sporadic nd endemic, epidemic

Aminu Reply

the significance of food webs for disease transmission

Abreham

food webs brings about an infection as an individual depends on number of diseased foods or carriers dully.

Mark

explain assimilatory nitrate reduction

Esinniobiwa Reply

Assimilatory nitrate reduction is a process that occurs in some microorganisms, such as bacteria and archaea, in which nitrate (NO3-) is reduced to nitrite (NO2-), and then further reduced to ammonia (NH3).

Elkana

This process is called assimilatory nitrate reduction because the nitrogen that is produced is incorporated in the cells of microorganisms where it can be used in the synthesis of amino acids and other nitrogen products

Elkana

Examples of thermophilic organisms

Shu Reply

Give Examples of thermophilic organisms

Shu

advantages of normal Flora to the host

Micheal Reply

Prevent foreign microbes to the host

Abubakar

they provide healthier benefits to their hosts

ayesha

They are friends to host only when Host immune system is strong and become enemies when the host immune system is weakened . very bad relationship!

Mark

what is cell

faisal Reply

cell is the smallest unit of life

Fauziya

cell is the smallest unit of life

Akanni

Innocent

cell is the structural and functional unit of life

Hasan

is the fundamental units of Life

Musa

what are emergency diseases

Micheal Reply

There are nothing like emergency disease but there are some common medical emergency which can occur simultaneously like Bleeding,heart attack,Breathing difficulties,severe pain heart stock.Hope you will get my point .Have a nice day ❣️

_Adnan

define infection ,prevention and control

Innocent

I think infection prevention and control is the avoidance of all things we do that gives out break of infections and promotion of health practices that promote life

Lubega

Heyy Lubega hussein where are u from?

_Adnan

en français

Adama

which site have a normal flora

ESTHER Reply

Many sites of the body have it Skin Nasal cavity Oral cavity Gastro intestinal tract

Safaa

skin

Asiina

skin,Oral,Nasal,GIt

Sadik

How can Commensal can Bacteria change into pathogen?

Sadik

How can Commensal Bacteria change into pathogen?

Sadik

all

Tesfaye

by fussion

Asiina

what are the advantages of normal Flora to the host

Micheal

what are the ways of control and prevention of nosocomial infection in the hospital

Micheal

what is inflammation

Shelly Reply

part of a tissue or an organ being wounded or bruised.

Wilfred

what term is used to name and classify microorganisms?

Micheal Reply

Binomial nomenclature

adeolu

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Source: OpenStax, Elementary algebra. OpenStax CNX. Jan 18, 2017 Download for free at http://cnx.org/content/col12116/1.2

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