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Section1.6Comparison Symbols

ObjectivesPCC Course Content and Outcome Guide

As you know, $8$ is larger than $3\text{;}$ that's a specific comparison between two numbers. We can also make a comparison between two less specific numbers, like if we say that average rent in Portland in 2016 is larger than it was in 2009. That makes a comparison using unspecified amounts. This section will go over the mathematical shorthand notation for making these kinds of comparisons.

In Oregon, only people who are $18$ years old or older can vote in statewide elections.β1βSome other states like Washington allow 17-year-olds to vote in primary elections provided they will be 18 by the general election. Does that seem like a statement about the number $18\text{?}$ Maybe. But it's also a statement about numbers like $37$ and $62\text{:}$ it says that people of these ages may vote as well. This section will also get into the mathematical notation for large collections of numbers like this.

In everyday language you can say something like β$8$ is larger than $3\text{.}$β In mathematical writing, it's not convenient to write that out in English. Instead the symbol β$\gt$β has been adopted, and it's used like this:

\begin{equation*} 8\gt3 \end{equation*}

and read out loud as β$8$ is greater than $3\text{.}$β The symbol β$\gt$β is called the greater-than symbol.

Checkpoint1.6.1

At some point in history, someone felt that $\gt$ was a good symbol for βis greater than.β In β$8\gt3\text{,}$β the tall side of the symbol is with the larger of the two numbers, and the small pointed side is with the smaller of the two numbers. That seems like a good system.

We have to be careful when negative numbers are part of the comparison though. Is $-8$ larger or smaller than $-3\text{?}$ In some sense $-8$ is larger, because if you owe someone $8$ dollars, that's more than owing them $3$ dollars. But that is not how the $\gt$ symbol works. This symbol is meant to tell you which number is farther to the right on a number line. And if that's how it goes, then $-3\gt-8\text{.}$

Checkpoint1.6.4

The greater-than symbol has a close relative, the greater-than-or-equal-to symbol, β$\geq\text{.}$β It means just like it sounds: the first number is either greater than, or equal to, the second number. These are all true statements:

\begin{align*} 8\amp\geq3\amp3\amp\geq-8\amp3\amp\geq3 \end{align*}

but one of these three statements is false:

\begin{align*} 8\amp\gt3\amp3\amp\gt-8\amp3\amp\stackrel{\text{no}}{\gt}3 \end{align*}
Remark1.6.5

While it may not be that useful that we can write $3\geq3\text{,}$ this symbol is quite useful when specific numbers aren't explicitly used on at least one side, like in these examples:

\begin{equation*} (\text{hourly pay rate})\geq(\text{minimum wage}) \end{equation*}
\begin{equation*} (\text{age of a voter})\geq18 \end{equation*}

Sometimes you want to emphasize that one number is less than another number instead of emphasizing which number is greater. To do this, we have symbols that are reversed from $\gt$ and $\geq\text{.}$ The symbol β$\lt$β is the less-than symbol and it's used like this:

\begin{equation*} 3\lt8 \end{equation*}

and read out loud as β$3$ is less than $8\text{.}$β

TableΒ 1.6.6 gives the complete list of all six comparison symbols. Note that we've only discussed three in this section so far, but you already know the equals symbol, and we don't want to beat a dead horse with a full discussion of the last two.

SubsectionExercises

1

Use the $\gt$ symbol to arrange the following numbers in order from greatest to least. For example, your answer might look like 4>3>2>1>0.

$\displaystyle{{-8}\quad{-10}\quad{-5}\quad{7}\quad{9}}$

2

Use the $\gt$ symbol to arrange the following numbers in order from greatest to least. For example, your answer might look like 4>3>2>1>0.

$\displaystyle{{-6}\quad{4}\quad{2}\quad{1}\quad{8}}$

3

Use the $\gt$ symbol to arrange the following numbers in order from greatest to least. For example, your answer might look like 4>3>2>1>0.

$\displaystyle{{-3.51}\quad{-3.28}\quad{-9.98}\quad{-4.42}\quad{7.22}}$

4

Use the $\gt$ symbol to arrange the following numbers in order from greatest to least. For example, your answer might look like 4>3>2>1>0.

$\displaystyle{{-1.15}\quad{1.15}\quad{-2.8}\quad{-9.38}\quad{-1.05}}$

5

Use the $\gt$ symbol to arrange the following numbers in order from greatest to least. For example, your answer might look like 4>3>2>1>0.

$\displaystyle{{{\frac{5}{3}}}\quad{{\frac{10}{3}}}\quad{7}\quad{5}\quad{8}}$

6

Use the $\gt$ symbol to arrange the following numbers in order from greatest to least. For example, your answer might look like 4>3>2>1>0.

$\displaystyle{{{\frac{15}{7}}}\quad{{\frac{33}{4}}}\quad{{\frac{35}{4}}}\quad{-6}\quad{4}}$

7

Use the $\gt$ symbol to arrange the following numbers in order from greatest to least. For example, your answer might look like 4>3>2>1>0.

$\displaystyle{{{\frac{1}{2}}}\quad{6}\quad{\pi }\quad{\sqrt{2}}\quad{9}\quad{{\frac{2}{7}}}}$

8

Use the $\gt$ symbol to arrange the following numbers in order from greatest to least. For example, your answer might look like 4>3>2>1>0.

$\displaystyle{{1}\quad{8}\quad{{\frac{1}{2}}}\quad{\sqrt{3}}\quad{\sqrt{2}}\quad{{\frac{3}{7}}}}$

9

Decide if each comparison is true or false.

 $5\leq5$ True False $-1=7$ True False $8\neq8$ True False $6\geq-8$ True False $-6\leq-4$ True False $6\gt-4$ True False
10

Decide if each comparison is true or false.

 $-6\lt9$ True False $-4\lt-4$ True False $-1\geq-8$ True False $1=-6$ True False $-7\neq2$ True False $-9=-9$ True False
11

Decide if each comparison is true or false.

 ${\frac{9}{9}}\neq{\frac{27}{27}}$ True False $-{\frac{6}{7}}=-{\frac{18}{21}}$ True False $-{\frac{39}{4}}={\frac{22}{9}}$ True False $-{\frac{9}{2}}\lt-{\frac{9}{2}}$ True False $-{\frac{3}{2}}\geq-{\frac{3}{2}}$ True False ${\frac{6}{3}}\leq{\frac{12}{6}}$ True False
12

Decide if each comparison is true or false.

 $-{\frac{4}{2}}=-{\frac{12}{6}}$ True False $-{\frac{44}{9}}\gt{\frac{40}{7}}$ True False ${\frac{6}{2}}\lt{\frac{18}{6}}$ True False ${\frac{55}{6}}\leq-{\frac{15}{2}}$ True False ${\frac{17}{3}}\geq-{\frac{59}{8}}$ True False $-{\frac{51}{6}}\lt-{\frac{10}{3}}$ True False
13

Choose $\lt \text{,}$ $>\text{,}$ or $=$ to make a true statement.

$\displaystyle{-\frac{6}{7}}$

• <

• >

• =

$\displaystyle{-\frac{1}{8}}$

14

Choose $\lt \text{,}$ $>\text{,}$ or $=$ to make a true statement.

$\displaystyle{-\frac{5}{6}}$

• <

• >

• =

$\displaystyle{-\frac{4}{3}}$

15

Choose $\lt \text{,}$ $>\text{,}$ or $=$ to make a true statement.

${{\frac{4}{5}}} + {{\frac{4}{3}}}$

• <

• >

• =

${{\frac{4}{5}}} \div {{\frac{5}{3}}}$

16

Choose $\lt \text{,}$ $>\text{,}$ or $=$ to make a true statement.

${{\frac{4}{5}}} + {{\frac{3}{4}}}$

• <

• >

• =

${{\frac{4}{3}}} \div {{\frac{1}{4}}}$

17

Choose $\lt \text{,}$ $>\text{,}$ or $=$ to make a true statement.

${{\frac{17}{10}}} \div {{\frac{17}{10}}}$

• <

• >

• =

$\frac{32}{20} - \frac{8}{5}$

18

Choose $\lt \text{,}$ $>\text{,}$ or $=$ to make a true statement.

${{\frac{19}{4}}} \div {{\frac{19}{4}}}$

• <

• >

• =

$\frac{12}{8} - \frac{3}{2}$

19

Compare these two numbers:

$\displaystyle{{-1 {\textstyle\frac{2}{3}}}}$

• <

• >

• =

$\displaystyle{-1}$

20

Compare these two numbers:

$\displaystyle{{-3 {\textstyle\frac{1}{2}}}}$

• <

• >

• =

$\displaystyle{-3}$

21

Compare these two numbers:

$\displaystyle{{-5 {\textstyle\frac{1}{2}}}}$

• <

• >

• =

$\displaystyle{2}$

22

Compare these two numbers:

$\displaystyle{{-4 {\textstyle\frac{1}{3}}}}$

• <

• >

• =

$\displaystyle{3}$

23

Compare the following numbers:

$\displaystyle{ \left| {-{\frac{5}{8}}} \right| }$

• <

• >

• =

$\displaystyle{ |{0.625}| }$

24

Compare the following numbers:

$\displaystyle{ \left| {-{\frac{9}{10}}} \right| }$

• <

• >

• =

$\displaystyle{ |{0.9}| }$

25

True or false?

$\displaystyle{-3 \ge -4}$

• True

• False

26

True or false?

$\displaystyle{-2 \ge -7}$

• True

• False