Basic Math & Pre-Algebra All-in-One For Dummies (+ Chapter Quizzes Online) - Mark Zegarelli

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(addition, subtraction, multiplication, and division)

       Bullet Identifying which operations are inverses of each other

       Bullet Knowing the operations that are commutative, associative, and distributive

       Bullet Performing the Big Four operations on negative numbers

       Bullet Using four symbols for inequality

       Bullet Understanding exponents, roots, and absolute values

      In this chapter, you work with negative numbers — that is, numbers that are less than zero. To begin, you see how negative numbers arise when you subtract a smaller number minus a greater one. Next, you discover how to negate a number by flipping its sign. You also work with absolute value, which is the positive value of a number.

      When you’re comfortable working with negative numbers, you begin to use them with the Big Four operations — addition, subtraction, multiplication, and division.

      When you first discovered subtraction, you were probably told that you can’t take a small number minus a greater number. For example, if you start with four marbles, you can’t subtract six because you can’t take away more marbles than you have. This rule is true for marbles, but in other situations, you can subtract a big number from a small one.

      In real-world applications, negative numbers can represent debt. For example, if you have only five chairs to sell but a customer pays for eight of them, you owe them three more chairs. Even though you may have trouble picturing −3 chairs, you still need to account for this debt, and negative numbers are the right tool for the job.

      As another example, if you have $4 and you buy something that costs $6, you end up with less than $0 dollars — that is, −$2, which means a debt of $2.

An illustration of negative numbers on the number line.

      FIGURE 4-1: Negative numbers on the number line.

      Remember When you don’t have a number line to work with, here’s a simple rule for subtracting a large number from a small number: Switch the two numbers around and take the small number from large number; then attach a negative sign to the result.

      Example Q. Use the number line to subtract 5 − 8.

      A. −3. On the number line, 5 − 8 means

An illustration of negative numbers on the number line.

      Q. What is math?

      1Yourturn Using the number line, subtract the following numbers:

      (a) math

      (b) math

      (c) math

      (d) math

      2 Find the answers to the following subtraction problems:

      (a) math

      (b) math

      (c) math

      (d) math

      Remember When you attach a negative sign to any number, you negate that number. Negating a number means changing its sign to the opposite sign, so

       Attaching a negative sign to a positive number makes it negative.

       Attaching a negative sign to a negative number makes it positive. The two adjacent (side-by-side) negative signs cancel each other out.

       Attaching a negative sign to 0 doesn’t change its value, so .

      In contrast to negation, placing two bars around a number gives you the absolute value of that number. Absolute value is the number’s distance from 0 on the number line — that is, it’s the positive value of a number, regardless of whether you started out with a negative or positive number:

       The absolute value of a positive number is the same number.

       The absolute value of a negative number makes it a positive number.

       Placing absolute value bars around 0 doesn’t change its value, so .

       Placing a negative sign outside absolute value bars gives you a negative result — for example, .

      ExampleQ. Negate the number 7.

      A. −7. Negate 7 by attaching a negative sign to it: −7.

      Q. Find the negation of −3.

      A. 3. The negation of math. The two adjacent negative signs cancel out, which gives you 3.

      Q. What’s the negation of Скачать книгу