math hombre | Guzman's Mathematics Weblog

I wrote this note in 2008 to give a down-to-earth example to help in the understanding of negative numbers [2]. It is posted for the Math Teachers at Play blog carnival.

— 1. Introduction —

First, lets get all the formalities out of the way by observing a few algebraic rules regarding positive and negative real numbers. We will consider the familiar arithmetic operations of addition and multiplication [3]. Feel free to skip over this section and continue to section.

— 1.1. Rules Addition (Sum) —

Rules for adding any two real numbers ${a}$ , ${b}$

The result of addition is called the sum.
The sum between ${a}$ and ${b}$ is indicated as:
$\displaystyle a+b$
If ${a}$ and ${b}$ are both positive, then the sum is positive.
$\displaystyle 4+3=7$
If ${a}$ and ${b}$ are both negative, then the sum is negative.
$\displaystyle -4+(-3)=-7$
If ${a}$ is positive and ${b}$ is negative and ${|a|>|b|}$ , then the sum is positive.
$\displaystyle 4+(-3)=1$
If ${a}$ is positive and ${b}$ is negative and ${|a|<|b|}$ , then the sum is negative.
$\displaystyle 3+(-4)=-1$
Addition is commutative: ${a+b=b+a}$ .
$\displaystyle 4+3=3+4=7$
Addition is associative: ${a+(b+c)=(a+b)+c}$ .
$\displaystyle 1+(2+4)=(1+2)+4=7$
${a+(-b)=a-b}$ .
${a+(-a)=0}$ ; ${a+0=a}$ .

— 1.2. Rules Multiplication (Product) —

Rules for multiplying any two real numbers ${a}$ , ${b}$

The result of multiplication is called the product.
The product between ${a}$ and ${b}$ is indicated as:
$\displaystyle a\times b=a\cdot b=a(b)=(a)b=(a)(b)=ab$
If a and b have the same sign, then the product is positive.
$\displaystyle (4)(3)=12$

$\displaystyle (-4)(-3)=12$
If a and b have opposite signs, then the product is negative.
$\displaystyle (-4)(3)=-12$

$\displaystyle (4)(-3)=-12$
Distributive property: ${a(b+c)=ab+ac}$ ; ${a(b-c)=ab-ac}$ .
$\displaystyle 4(2+1)=8+4=12$

$\displaystyle 4(2-1)=8-4=4$
Multiplication is commutative: ${ab=ba}$ .
$\displaystyle (4)(3)=(3)(4)=12$
Multiplication is associative: ${a(bc)=(ab)c}$ .
$\displaystyle 1(2\cdot6)=(1\cdot2)6=12$
The product of any real number and -1 is the additive inverse of the real number.
$\displaystyle (-1)a=-a$

$\displaystyle (-1)(-1)=-(-1)=1$

$\displaystyle (-a)(-b)=(-1\cdot a)(-1\cdot b)=(-1)(-1)(a)(b)=1(ab)=ab$
${a\cdot1=1\cdot a=a}$ ; ${a\cdot0=0\cdot a=0}$ .

— 2. Example —

Why is a negative times a negative a positive? Many people have trouble answering this question. While, most will not have an issue memorizing the rule. Understanding the reasoning for the rule is another matter. Many people try to come up with a visualization to help picture what is going on [1]. We shall use money to illustrate the concept. When going over the example try to think of a negative as a loss and a positive as a gain.

— 2.1. The Offer You Can’t Refuse —

Well, you asked for it!

Suppose your are bankrupt. You now own ${\$0}$ dollars. You approach Mr. Mob Boss for a loan of ${\$4,000}$ dollars. He does so with the condition that you pay him back 4 times that amount. You now have a debt of

$\displaystyle 4\cdot-\$4,000=-\$16,000$

See rule 1.2.4 for reference.

In other words, you owe Mr. Mob Boss ${4}$ debts of ${\$4,000}$ . You have lost ${\$16,000}$ dollars. You take the ${\$4000}$ and invest it all in starting an Italian restaurant. The problem is all your customers are members of La Cosa Nostra, who expect nothing less than a free meal with the finest wine.

Eventually realizing you will never break even, you approach Mr. Mob Boss to tell him the bad news. Unexpectedly, he is so happy about the service you provide that he decides to forgive your ${4}$ debts of ${\$4,000}$ !

$\displaystyle -4\cdot-\$4,000=\$16,000$

See rule 1.2.3 for reference.

You have gained ${\$16,000}$ dollars, and, thus, you are back where you started…absolutely broke! However, try not to be so "negative". At least you have a job for the rest of your life.

Fuggid about it!

References

[1] Dr. Math, Negative x negative = positive, available at http://mathforum.org/dr.math/faq/faq.negxneg.html.
[2] Ian Stewart, Letters to a young mathematician, first ed., Basic Books, 2006.
[3] Rong Yang, A-plus notes for algebra: With trigonometry and probability, third ed., A-Plus Notes Learning Center, 2000.

Tag Archive

47th edition of the Math Teachers at Play Blog Carnival

Attention Bloggers: We Want You!

Understanding Negative Numbers

Categories

Archives

Recent Posts

Top Posts

Mathematical Comics

Mathematical websites

Blogroll

Tags

The Polymath Blog

PolyMath Wiki Recent Changes

Follow Guzman's Mathematics Weblog via Email

Meta