Example: Describing Algebraic Expressions

List the constants and variables for each algebraic expression.

1. x + 5
2. $\frac{4}{3}\pi {r}^{3}$
3. $\sqrt{2{m}^{3}{n}^{2}}$

Answer:

	Constants	Variables
1. x + 5	5	x
2. $\frac{4}{3}\pi {r}^{3}$	$\frac{4}{3},\pi$	$r$
3. $\sqrt{2{m}^{3}{n}^{2}}$	2	$m,n$

Example: Evaluating an Algebraic Expression at Different Values

Evaluate the expression $2x - 7$ for each value for x.

1. $x=0$
2. $x=1$
3. $x=\frac{1}{2}$
4. $x=-4$

Answer:

1. Substitute 0 for $x$.
   \begin{array}\text{ }2x-7 \hfill& = 2\left(0\right)-7 \\ \hfill& =0-7 \\ \hfill& =-7\end{array}
2. Substitute 1 for $x$.
   \begin{array}\text{ }2x-7 \hfill& = 2\left(1\right)-7 \\ \hfill& =2-7 \\ \hfill& =-5\end{array}
3. Substitute $\frac{1}{2}$ for $x$.
   \begin{array}\text{ }2x-7 \hfill& = 2\left(\frac{1}{2}\right)-7 \\ \hfill& =1-7 \\ \hfill& =-6\end{array}
4. Substitute $-4$ for $x$.
   \begin{array}\text{ }2x-7 \hfill& = 2\left(-4\right)-7 \\ \hfill& =-8-7 \\ \hfill& =-15\end{array}

Example: Evaluating Algebraic Expressions

Evaluate each expression for the given values.

1. $x+5$ for $x=-5$
2. $\frac{t}{2t - 1}$ for $t=10$
3. $\frac{4}{3}\pi {r}^{3}$ for $r=5$
4. $a+ab+b$ for $a=11,b=-8$
5. $\sqrt{2{m}^{3}{n}^{2}}$ for $m=2,n=3$

Answer:

1. Substitute $-5$ for $x$.
   \begin{array}\text{ }x+5\hfill&=\left(-5\right)+5 \\ \hfill&=0\end{array}
2. Substitute 10 for $t$.
   \begin{array}\text{ }\frac{t}{2t-1}\hfill& =\frac{\left(10\right)}{2\left(10\right)-1} \\ \hfill& =\frac{10}{20-1} \\ \hfill& =\frac{10}{19}\end{array}
3. Substitute 5 for $r$.
   \begin{array}\text{ }\frac{4}{3}\pi r^{3} \hfill& =\frac{4}{3}\pi\left(5\right)^{3} \\ \hfill& =\frac{4}{3}\pi\left(125\right) \\ \hfill& =\frac{500}{3}\pi\end{array}
4. Substitute 11 for $a$ and –8 for $b$.
   \begin{array}\text{ }a+ab+b \hfill& =\left(11\right)+\left(11\right)\left(-8\right)+\left(-8\right) \\ \hfill& =11-8-8 \\ \hfill& =-85\end{array}
5. Substitute 2 for $m$ and 3 for $n$.
   \begin{array}\text{ }\sqrt{2m^{3}n^{2}} \hfill& =\sqrt{2\left(2\right)^{3}\left(3\right)^{2}} \\ \hfill& =\sqrt{2\left(8\right)\left(9\right)} \\ \hfill& =\sqrt{144} \\ \hfill& =12\end{array}

Example: Using a Formula

A right circular cylinder with radius $r$ and height $h$ has the surface area $S$ (in square units) given by the formula $S=2\pi r\left(r+h\right)$. Find the surface area of a cylinder with radius 6 in. and height 9 in. Leave the answer in terms of $\pi$.

Answer: Evaluate the expression $2\pi r\left(r+h\right)$ for $r=6$ and $h=9$.

The surface area is $180\pi$ square inches.

Example: Simplifying Algebraic Expressions

Simplify each algebraic expression.

1. $3x - 2y+x - 3y - 7$
2. $2r - 5\left(3-r\right)+4$
3. $\left(4t-\frac{5}{4}s\right)-\left(\frac{2}{3}t+2s\right)$
4. $2mn - 5m+3mn+n$

Answer:

1. \begin{array}\text{ }3x-2y+x-3y-7 \hfill& =3x+x-2y-3y-7 \hfill& \text{Commutative property of addition} \\ \hfill& =4x-5y-7 \hfill& \text{Simplify}\end{array}
2. \begin{array}2r-5\left(3-r\right)+4 \hfill& =2r-15+5r+4 \hfill& \text{Distributive property} \\ \hfill& =2r+5y-15+4 \hfill& \text{Commutative property of addition} \\ \hfill& =7r-11 \hfill& \text{Simplify}\end{array}
3. \begin{array}4t-4\left(t-\frac{5}{4}s\right)-\left(\frac{2}{3}t+2s\right) \hfill& =4t-\frac{5}{4}s-\frac{2}{3}t-2s \hfill& \text{Distributive property} \\ \hfill& =4t-\frac{2}{3}t-\frac{5}{4}s-2s \hfill& \text{Commutative property of addition} \\ \hfill& =\text{10}{3}t-\frac{13}{4}s \hfill& \text{Simplify}\end{array}
4. \begin{array}\text{ }mn-5m+3mn+n \hfill& =2mn+3mn-5m+n \hfill& \text{Commutative property of addition} \\ \hfill& =5mn-5m+n \hfill& \text{Simplify}\end{array}

Example: Simplifying a Formula

A rectangle with length $L$ and width $W$ has a perimeter $P$ given by $P=L+W+L+W$. Simplify this expression.

Answer: