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Multiplying and Dividing Integers

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Susan Sayfan

Basics on the topic Multiplying and Dividing Integers

Integers are positive and negative whole numbers, which also include zero, examples are -3, -1, 0, 4, 10, and so on. When multiplying and dividing integers, you have to remember just one rule, which is easy to learn.

You will find a pattern if you compare the products or quotients of integers after multiplying or dividing them: multiplication or division of integers with like signs always gives you a positive solution. Multiplying or dividing integers with unlike signs, on the other hand, such as with a positive and a negative number, always gives you the solution of a negative number.

This video gives you a real-life example for the concept of products and quotients of integers and summarizes all you need to know about the rule concerning like signs and unlike signs in a cheat sheet . The best thing is: you only have to remember one rule that works for multiplication as well as for division!

After watching this video you will never be confused again about the signs when dividing or multiplying intergers. This video covers negative and positive numbers on the number line as well. So whenever you have to divide or multiply integers, look for the signs.

Apply and extend previous understandings of numbers to the system of rational numbers. CCSS.MATH.CONTENT.6.NS.C.5

Transcript Multiplying and Dividing Integers

So you think multiplying and dividing positive and negative integers is complicated... Don't stress! I'll show you how to make sense of this important math topic. Let's start with multiplication.

Multiplying positive Integers

Imagine that you stand at a highway intersection. Cars are going east and west. Instead of a compass you can also use a number line, where east is the positive direction and west is the negative direction.

A blue car starts at your standing point, driving east, in a positive direction on the number line, going fifty miles per hour. After one hour, the blue car is here, fifty miles east of where you stand. And after two hours, the car is 100 miles east, at positive 100 on the number line.

Let's write this as an equation. Going for two hours 50 miles per hour in the positive direction can be written as 2 · 50 = 100. What happens if a car travels in the opposite direction? Let's go back to where you stand.

Multiplying negative Integers

Imagine, now, that a red car is going west, in a negative direction on the number line. Two hours later, the red car is 100 miles west of where you stand, at negative 100. I'll write this as a number sentence. Remember, going west in this case means going 50 miles per hour in negative direction. So we have 2 · −50 = −100.

Now, let's think about this topic another way. Where was a car going east two hours before it passed you standing at the intersection? Two hours before, driving east at fifty miles per hours, this car was one hundred miles west of where you stand, at minus 100 on the number line.

Let's write this as an equation. Two hours ago can be written as negative two. Remember, going east at fifty miles per hour means going in positive direction. So the equation is: −2 · 50 = −100.

And what about a car traveling west? Where was it two hours before? Traveling at fifty miles per hour in a negative direction on the number line, it was 100 miles east of where you stand. This is equal to positive 100.

I'll show you the equation. Negative two, which represents 2 hours ago, times negative fifty - for going 50 miles west, in the negative direction - is equal to positive one hundred: −2 · −50 = 100.

Rule for Multiplication and Division

Here's a cheat sheet of our equations. This equation is for going east in positive direction for two hours: two times fifty equals one hundred. This one shows going west in negative direction for two hours: 2 · −50 = −100. Here we look at where the car going east in positive direction was 2 hours ago: −2 · 50 = −100. And this shows where the car going west in negative direction was 2 hours ago: −2 · −50 = 100.

Can you find a pattern? You see here:

  • If you multiply two positive numbers, you get a positive product
  • If you multiply a postive with a negative you get a negative answer and
  • If you multiply a negative with a positive, you also get a negative
  • But if you multiply two negatives, you will get a positive product

Lets rearrange the equations. So now you have a rule: Multiplying like signs will give you a positive product and multiplying unlike signs will give a negative answer.

You know what's so great about this rule? It works the same for multiplying and dividing numbers! And, not just integers but fractions, too.

Hooray! With this simple rule, you can be the master of multiplying and dividing positive and negative numbers! But remember, you should never mess with the Space Time Continuum.

1 comment
1 comment
  1. this video gave me a quick refresher on how to mutiply intergers and can help me pass a test

    From Abel Biniam, 6 months ago

Multiplying and Dividing Integers exercise

Would you like to apply the knowledge you’ve learned? You can review and practice it with the tasks for the video Multiplying and Dividing Integers.
  • Determine the correct distance and direction of the blue car by multiplying integers.

    Hints

    Think about in which direction the car is traveling.

    The distance the car travels can be expressed by: $distance = rate\times time$.

    Solution

    Let's see what information we have.

    • The car is traveling at a constant $50$ miles per hour.
    • The car drives for one hour.
    We can rewrite this as a mathematical expression:

    • $50\times1$
    Since both of the numbers are positive, we don't need to worry about the sign changing. You should also remember that no number changes when it is multiplied by one!

    • $50\times1 = 50$
    Since the car you're observing starts at position zero, and travels east (the positive direction), our final answer is $50$ miles east!

  • Explain how multiplying integers gives you the distance and direction of each car.

    Hints

    A positive number times a negative number results in a negative number.

    A negative number times a negative number results in a positive number.

    If we turn back time, it is equivalent to "negative" time.

    Solution

    Let's look at our word problems again.

    1. When our car travels at $50$ miles per hour for $2$ hours in a positive direction, we can write $50\times2$. Therefore, since we have two positive numbers, the car will travel $100$ miles in the positive direction which corresponds to an easterly direction.
    2. However, if our car is traveling in the negative direction at $50$ miles an hour for $2$ hours, we should write $(-50)\times2$. Now we are multiplying one positive number and one negative number. A positive number times a negative number always results in a negative product. In this case the car traveled $-100$ miles which means we travelled $100$ miles west.
    3. For "negative" time, we have to write the hours as a negative number. We can rewrite the third sentence mathematically as $50\times(-2)$. As you saw before, a positive number times a negative number always results in a negative product. So the car traveled $-100$ miles which is $100$ miles in an easterly direction.
    4. When the car drives $50$ miles per hour for $2$ hours in a negative direction, and then we turn back time $2$ hours, we should write this mathematically as $(-50)\times(-2)$. Remember, if we are multiplying like signs, the product is positive. Therefore, the car will travel $100$ miles in the positive direction which means it is traveling east.
  • Calculate the correct distance and direction using multiplication.

    Hints

    Remember to multiply the car's speed by how many hours it is driven. Don't forget the signs!

    Solution

    In this example, the car is always driving the speed limit ($65$ miles per hour).

    1. The car drives for $3$ hours in an easterly direction. We can write this sentence mathematically as $65\times3 = 195$.
    2. The car drives west for $2$ hours. Since west is our negative direction it makes $(-65)\times2 = -130$ miles.
    3. The car drives in a westerly direction for $4$ hours. Remember, west is our negative direction! We calculate $(-65)\times4 = -260$.
    4. The car drives east for $5$ hours. We have to evaluate $65\times5 = 325$,
    Grandma lives FAR AWAY!

  • Calculate the amount of money you have after going to the movies with your friends.

    Hints

    The money you receive is positive money, while money you spend is negative money.

    Remember, you need two digits after the decimal!

    Solution

    We can write $2\times\$20$ for the money you receive from your parents, $\$20$ from your mom and $\$20$ from your dad.

    And we can write $(-1)\times((\$8\times3) + (\$5) + (\$1.50\times3))$ to express the amount of money you spent on movie tickets, popcorn and drinks, respectively. So our final expression would be:

    • $2\times\$20 + (-1)\times(\$8\times3 + \$5 + \$1.50\times3)$
    Using PEMDAS and working from left to right we first have to solve the parentheses. Doing this gives us:

    • $2\times\$20 + (-1)\times(\$24 + \$5) + \$4.50)$
    Next, we distribute the $(-1)$ to all terms inside the final set of parentheses.

    • $2\times\$20 + (-1)\times\$24 + (-1)\times\$5 + (-1)\times\$4.50$
    Simplifying then gives us:

    • $(\$40) + (-\$24) + (-\$5) + (-\$4.50)$
    Next, we should simplify the signs. Doing this leaves us with:

    • $\$40 - \$24 - \$5 - \$4.50$
    Now all we have left is addition and subtraction, so we work from left to right.

    $\begin{array}{rcl} \$40 - \$24 - \$5 - \$4.50 & = & \$16 - \$5 - \$4.50\\ & = & \$11 - \$4.50\\ & = & \$ 6.50 \end{array}$

    After treating your friends to movies and snacks you have $\$6.50$ left.

  • Determine the correct sign for the product of the pairs of signs below.

    Hints

    See if you can find a pattern:

    • $5 \times 1 = 5$
    • $5 \times 0 = 0$
    • $(-5) \times (-1) = (5)$
    • $5 \times (-2) = (-10)$
    Solution

    You should have no problem remembering that a positive times a positive yields a positive answer.

    • $(+) \times (+) = (+)$
    When multiplying terms, if there is an odd number of negative terms, then the resulting answer will be negative, as in the following two examples:

    • $(-) \times (+) = (-)$
    • $(+) \times (-) = (-)$
    However, when if you are multiplying terms in which an even number of terms is negative, then the resulting answer will be positive, like in the example below:

    • $(-) \times (-) = (+)$
  • Evaluate each of the expressions using multiplication and division.

    Hints

    The rule for signs when dividing two numbers is the same as for multiplication.

    Zero is less than positive numbers and greater than negative numbers.

    Solution

    • A positive number times another positive number equals a positive number: $(+)\times(+) = (+)$. As an example we have $5\times3 = 15$.
    • A negative number times another negative number equals a positive number, too: $(-)\times(-) = (+)$. Thus we have $(-3)\times(-4) = 12$.
    • Any number, positive or negative, times zero equals zero: $(+/-)\times(0) = (0)$. That leaves us with $10\times0 = 0$.
    • The rules for signs when dividing numbers are the same as the rules when multiplying. Additionally, the location of the positive and negative numbers does not matter: $\frac{+}{-} = (-)$ or $\frac{-}{+} = (-)$. So $\frac{35}{-7} = -5$ equals $\frac{-35}{7} = -5$.
    • A negative number times a positive number equals a negative number: $(-)\times(+) = (-)$. As an example we have $(-4)\times4 = -16$.
    So, the right order beginning on the left side of the number line is:

    $\begin{array}{rcl} -4 \times 4 & = & -16 \\ \frac{35}{-7} & = & -~~5\\ 10 \times 0 & = & ~~~~~0\\ -3 \times -4 & = & ~~~12\\ 5 \times 3 & = & ~~~15 \end{array}$