Example 1 Dividing Integers Same sign, so quotient is positive. 5 = a. 8 – 40 – b. 14 – 2 = 7...

3
Example 1 Dividing Integers Same sign, so quotient is positive. 5 = a . 8 40 b . 14 2 = 7 Different signs, so quotient is negative c . 9 36 = 4 Different signs, so quotient is negative d . 7 0 = 0 Dividend is 0 and divisor is nonzero, so quotient is 0.

Transcript of Example 1 Dividing Integers Same sign, so quotient is positive. 5 = a. 8 – 40 – b. 14 – 2 = 7...

Page 1: Example 1 Dividing Integers Same sign, so quotient is positive. 5 = a. 8 – 40 – b. 14 – 2 = 7 – Different signs, so quotient is negative. c. 9 – 36 = 4.

Example 1 Dividing Integers

Same sign, so quotient is positive.5=a.8–40–

b.14–

2= 7– Different signs, so quotient is negative.

c.9–

36= 4– Different signs, so quotient is negative.

d.7–

0= 0

Dividend is 0 and divisor is nonzero, so quotient is 0.

Page 2: Example 1 Dividing Integers Same sign, so quotient is positive. 5 = a. 8 – 40 – b. 14 – 2 = 7 – Different signs, so quotient is negative. c. 9 – 36 = 4.

Guided Practice

Find the quotient, if possible.

for Example 1

11

33–1.

8–56

2.

5–25–

3.

4–0

4.

ANSWER 3–

ANSWER 7–

ANSWER 5

ANSWER 0

Page 3: Example 1 Dividing Integers Same sign, so quotient is positive. 5 = a. 8 – 40 – b. 14 – 2 = 7 – Different signs, so quotient is negative. c. 9 – 36 = 4.

Guided Practice

Find the quotient, if possible.

for Example 1

0

28–7.

ANSWER 8–

ANSWER 2–

ANSWER undefined

ANSWER 9

5.9–72

6.18

36–

8.6–54–


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