Multiply Real Numbers

With whole numbers, you can think of multiplication as repeated addition. The product (or result of multiplication) [latex]3 \cdot 5[/latex] can be interpreted as

[latex]3 \cdot 5=5+5+5=15[/latex]

So, to multiply [latex]3(-5)[/latex], can be found as follows.

[latex]3(-5)=(-5)+(-5)+(-5)= -15[/latex]

We can multiply two numbers in any order and the result is the same, so

[latex](-5)(3)=15[/latex]

The product of a positive number and a negative number (or a negative and a positive) is negative.

The following video contains examples of how to multiply decimal numbers with different signs.

You can see that the product of two negative numbers is a positive number. So, if you are multiplying more than two numbers, you can count the number of negative factors.

The following video contains examples of multiplying more than two signed integers, or counting numbers (1, 2, 3, etc.).

Divide Real Numbers

You may remember that when you divided fractions, you multiplied by the reciprocal. Reciprocal is another name for the multiplicative inverse (just as opposite is another name for additive inverse). A number and its reciprocal have the same sign. Since division is rewritten as multiplication using the reciprocal of the divisor, and taking the reciprocal doesn’t change any of the signs, division follows the same rules as multiplication.