STATION

#1

Multiplying and Dividing IntegersUse the following explanation and examples to complete the

problems enclosed in this folder.

The rules for multiplication and division are the same.

When the signs are DIFFERENT, the answer is always NEGATIVE.

4085 7642

3284 8648 36312 502100

When the signs are the SAME, the answer is always POSITIVE.

+ - --++

---

negative negative

positive positive

)35)(72.(1

485 1.

)301)(78.(1

17052,6.1

2

)72)(40(.1

8560 1.

2. -122 ÷ 4 x 3 x 24=

2. 45( 238 ÷ -

14 )= 

 2. -16 x (-18 ÷ 9) =

2. -2(6)2 ÷ (-12)=

2. [(-4)(-3) ÷ 4 (-6 ÷ 2)]=

 2.  (-10 x -9 )( -10 × -4 )=

1A

1B

1C

1D

1E

1F

STATION

#2

SUBTRACTING FRACTIONS

To subtract fractions, both denominators MUST be the same. Here’s what you do if the denominators are different:1. You first need to find a number that BOTH denominators can divide into evenly, called a common denominator.2. Re-write each equivalent fraction using this new denominator3. Go ahead and subtract ONLY the numerators.4. If you can not subtract the numerators, you may need to borrow a whole number in the form of the denominator.

Ex. (see example below.)5. Re-write your answer as a simplified or reduced fraction, if needed.

165

2 1615

– )1620

(2

1615

– )164

1616

(2

1615

– ) 164

1 (2

1615

–164

3

1615

- 41

3

...5

5

30

30

12

121

41

141

42

1

41 -

21

1

Use the following explanation and examples to complete the problems enclosed in this folder.

7

5

5

25 1.

2A

2B

2C

2D

2E

2F

2. A football player advances 2/3 of a yard. A second player in the same team advances 5/4 of a yard. How much more yardage did the second player advance?

10

811

35

1815 1.

2. Kristy and William took part in running race. They covered a distance of 5/8 yards and 8/9 yards respectively. Find the distance between these athletes.

9

2

5

13 1.

4

36

8

37 1.

2. Uncle Si set a record when he caught a catfish that weighed 97 ¼ pounds. The previous record was 94 9/16 pounds. By how many pounds did Uncle Si beat the previous record?

6

1

3

5 1.

4

37

5

411 1.

2. Carlos walked 2 ¾ miles on Monday. On Tuesday he walked 1 2/5 miles less than Monday. How far did he walk on Tuesday?

2. The road to Camp Allen is 9 1/5 miles long. The distance by boat is 3 ¾ miles. How much less is the distance by boat?

2. The maximum weight for a basketball is 22 9/10 ounces. For a baseball it is 5 ½ ounces and for a tennis ball it is 2 1/16 ounces. How much heavier is a maximum weight basketball than a maximum weight tennis ball?

STATION

#3

Adding and Subtracting Decimals

TO ADD DECIMALS:1. Line up the decimal points and add the columns from right to left.2. Place a decimal point in the answer directly below the other decimal points.

0.64 + 0.39Line up the decimal points.

0.64 + 0.39

__________________________

Add the columns.

0.64 + 0.39 __________________________

1.03

Use the following explanation and examples to complete the problems enclosed in this folder.

TO SUBTRACT DECIMALS:1. Line up the decimal points.2. Subtract the columns from right to left, regrouping if necessary.3. Place a decimal point in the answer directly below the other decimal points.

3A

3B

3C

3D

3E

3F

2. In the morning Neftali walked 1.7 kilometers to school. In the afternoon she walked 3.5 kilometers to her grandmother's house, and then 2.6 kilometers home again. How many total kilometers did she walk?

0.455-0.68 1. $18.83 - $60 1.

$52.59 $192.70 1. 2.666 - 16.3 1.

6.9 - 7.001 1. 0.9427-6.78042 1.

2. Ms. Tran bought $56.12 worth of groceries. However, she had coupons worth $9.85. How much did Ms. Tran spend on the groceries?

2. Jacob bought a skateboard for $67.50 and a pair of kneepads for $9.75. If the sales tax was $4.64, how much did he spend altogether?

2. A US penny weighs 0.1 oz. The smallest hummingbird on record was 2.24 inches long and weighed 0.056 oz. How much less than a penny did the hummingbird weigh?

2. 380 + 98.6 + 4.25 +209.7 = 2. Marian bought four candy bars at a baseball game. They weighed 1.16 oz., 2 oz., 1.7 oz. and 1.38 oz. How many ounces of candy did Marian buy all together?

3G

3H

3I

3J

3K

3L

1. Samuel gives $26.94 to Catherine. If Samuel started with $31.03, how much money does he have left?

2. 6.5154 – 3.6561 =

1. After buying some crayons for $98.99, Douglas has $9.61 left. How much money did Douglas have to begin with?

2. 4.6432-0.65 =

1. 6.35 + 0.681 + 5.1 =

2. 9.85 + 19.45 – 10.56 =

3. 16.78 - 5.15 – 6.5 =

1. Billie runs daily as part of an exercise plan. On unsay she ran 8.3 miles, on Monday 5.1 miles, on Tuesday 5.75 miles, on Wednesday 5.6 miles, on Thursday 4.25 miles, and 6 miles on Saturday. How many miles did she run this week?

1. If you have 325.58 in your checking account, and then write a check for 166.73. what is your new balance?

2. 58.65 – 0.346

1. In a well filled with water, 184.5 liters are removed followed by 128.75 liters and finally 84.5 liters. After these withdrawals, there are 160 liters in the well. How much water did the well originally have?

2. 18.1534 – 5.0435

STATION

#4

Adding and Subtracting Integers

Adding and subtracting integers can be confusing if you don’t follow these rules………….1. Think of money when you add integers2. Do KCF when it says to subtract integers then think of money

Adding Integers1. Do NOT look at the addition

operation, look at the sign in front of the numbers

2. Positive means you have $ Negative means you owe $

For example ……7+ -3=This means you have 7$ but you owe someone 3. If you pay them the 3 you still have 4$. Having 4$ means it is positive.

Subtracting Integers

1. KCF which means Keep the first

number the same, Change the

subraction sign to addition, then Flip the last number to it’s opposite

-3 - -5 =K C FSo it becomes -3 + 5 = this means you owe 3$ but you have 5 so after you pay them you still have 2$

4A

4B

4C

4D

4E

4F

7- (-15) -80-40 2.

(-15) - (-63) 1.

1. 21- (-98) - (-64) =

2. 17 – (-2) + -20 – 6 =

1. (-13) + (-78) - 72 =

2. -25 + -75 - (-50) =

1. (-27) + (-65) - 50 =

2. -30 + 40 – 50 + -10 =

1. 48 -16 – 16+ 12 =

2. -14 + 44 + -23 =

1. -29 + 39 + -7 – (-11) =

2. -4 – (-4) + 8 – 8 =

STATION

#5

Adding Fractions

How to do……

1. You have to get the bottoms (denominators) the same2. To get the bottoms the same you find the biggest number both

bottoms go into (called Least Common Multiple) or if that is too hard just

multiply the bottoms together3. Whatever you do to the bottom you do to the top (numerator)4. You add the whole #’s and the top #’s but the bottoms stay the

same5. Reduce the fraction if possible

Words to know……….Numerator is also called the top #And the denominator can be called the bottom #

5A

5B

5C

5D

5E

5F

7

1 5

9

42 1.

2. To make a milk shake, 2 gallons of milk, 1/7 of gallons of vanilla and 3/4 of gallons of fruit juice were required. Find the total gallons of milk shake made out of it.

2. Cameron walked ¾ of a mile on Monday. On Tuesday, he walked 1/8 of a mile, and Wednesday he walked 2/5 of a mile. How far did he walk altogether?

5

3 2

3

1 4

10

73 1.

8

3

16

3 3

4

31 1.

13

11

8

11 1.

2. It took Sadai 5 ¾ hours to climb to the top of a mountain. It took 3 ¼ hours to climb down. If she spent 1 ½ hours at the top, how long did the climb take?

10

3 34

7

59 1.

5

3 26

3

1 2

6

53 1.

2. If the sides of an equilateral triangle are 5 7/8 inches long, what is the perimeter.

2. To the right, is a chart of the miles Jennifer walked last week. What is the total miles that Jennifer walked?

Day Miles walked

Monday

Tuesday

Wednesday

Thursday

Friday

212

411

10

7

513

1091

1. Paul bought 2 3/5 pound of chocolate at Rocky Mountain Chocolate factory. Later, they went to The Sweet Shoppe and he bought 9/11 of a pound morechocolate. How much chocolate did he buy that day?

STATION

#6

Multiplying and Dividing DecimalsTo Multiply decimals

TO DO…..1. Get rid of decimals (put decimal at the end of the # so it looks like a whole #)(move to the right)2. multiply like whole #’s 3. put decimal back in answer how many places you moved it before multiplying

EX. 2.12x 3.4

212x 34848

636+

7.208

Since there were 3 #’s after the decimal in the original problem we move the decimal back 3 places

To Divide Decimals1. You move the decimal in the outside # (divisor) to the

end to be a whole #2. Whatever you do to the outside # you do to the inside #

(dividend)3. Bring decimal up to the answer (quotient) then divide

like whole #’s

3.125.You move the decimal 2 places on the outside # to become a whole Number so you then move the decimal 2 places on the inside #

13025When you move the decimals it becomes this

6A

6B

6C

6D

6E

6F

0.05 2.95 1.

2. Last week(7 days), Maria made $30.03 for doing her chores. If Leslie made the same amount of money each day, what did Leslie earn each day that she worked?

0.4 x 0.4 x 0.4 1.

2. Ashley went grocery shopping and her total came to $20.26. She had a coupon that allowed her to pay 0.87 times her total. How much did Ashley spend at the grocery store?

2(0.5) 1.

0.002 6.342 1.

2. Isaia earned $620 last week. He earns 7.75/hour. How many hours did he work?

16

0.8) x (0.8 1.

1.7

.085 1.

2. A monthly magazine charges $48.50 for a one-year subscription. What is the cost for each issue if the magazine is delivered twice a month?

2. The price of roofing nails is $0.04 each. If the price marked on a bag of these nails is $1.48, how many nails are in the bag?

2. Jaqueline is making cookies for the school bake sale. She plans to use a recipe for sugar cookies. The recipe calls for 2 .75 cups of sugar. If Grace triples this recipe, how much sugar will she use?