**1. Opposite Numbers (additive inverse)**: is a number that when added to a given number yields 0. The opposite number for any number x is -x. Note that x may be positive or negative.

(-5) + 5 = 0

x + (-x) = 0

On the number line, the numbers 5 and -5 are located at the same distance from zero. We say that the numbers 5 and -5 are opposites. We can also say that -5 is opposite to 5, and 5 is opposite to -5 on the number line.

**2. Addition of integers:**

- Addition of a positive number is taken as a movement to the
**RIGHT**of the number line - Addition of a negative number is taken as a movement to the
**LEFT**of the number line

(-3) + 4

2 + 3

(-1) + (-3)

2 + (-5)

0 + (-4)

**3. Rule for addition:**

- If the signs of the integers being added are the same, the sum has the same sign as the integers and we add the absolute values of the integers

For any a > 0, and b > 0,

a + b = a + b; 3 + 5 = 8

(-a) + (-b) = -(a+b); (-3) + (-5) = – (3 + 5) = -8

- If the signs of the integers being added are different,, the sum takes the sign of the integer with the greater absolute value and we find the difference of the absolute values of the integers.

For any a > 0, and b > 0,

a + (-b) = +(a – b) if a >=b; 9 + (-6) = +(9 – 6) = +3 = 3

a + (-b) = – (b -a) if b > a; 15 + (-20) = -(20 -15) = -5

-a + b = -(a – b) if a >= b; -18 + 12 = -(18 -12) = -6

-a + b = +(b -a) if b > a; -23 + 27 = +(27 – 23) = +4 = 4

**4. Home Work:**

- Handout: one page
- Workbook: page 7: 4

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