Station 1
1)What is the LCM of 4 and 7?
2)What is the GCF of 12 and 40?
Station 2
Find the prime factorization of:
1)56 2) 38
Station 3
1)List the factors of 70:
2)List the factors of 72:
Station 4
List the first five multiples of:
1) 9: ______
2) 14: ______
Station 5
Divide. Show your remainder as a fraction.
5,256 ÷ 33
Station 6
At A&P, hot dogs come in packages of eight and hot dog buns come in packages of twelve. What is the least number of packages of each type that you can buy and have no hot dogs or buns left over? How many hot dogs packages would you need to purchase? How many bun packages would you need to purchase?
Station 7
Casey and his friends are going on a trip to Belmar. Casey wants to make snack packs of bananas and pudding cups to take on the trip. He has 16 bananas and 32 pudding cups.
What is the greatest number of snack packs Casey can make if each pack must have exactly the same number of bananas and exactly the same number of pudding cups? He does not want any bananas or pudding cups left over. How many bananas and pudding cups would be in each snack pack?
Station 8
There are 28 students in a class. How many ways can the class be divided into groups with equal numbers of students?
(Hint: Factor Pairs!)
Station 9
Use the given prime factorization to find the number.
1) 2 x 2 x 5 x 7 x 11
2) 7 x 11 x 13 x 17
Station 10
1)Give the dimensions of EACH rectangle that can be made from 36 square tiles.
Reminder about dimensions (example: 1 x 36)
2)Use the dimensions of the rectangles to list the factors of 36.
Station 11
What number has the prime factorization of:
23 x 32 x 52
Station 12
Beth and her friends are going on a trip to the park. Beth wants to make snack packs of oranges and fruit cups to take on the trip. She has 18 oranges and 36 fruit cups.
What is the greatest number of snack packs Beth can make if each pack must have exactly the same number of oranges and exactly the same number of fruit cups? She does not want any oranges or fruit cups left over. How many oranges and fruit cups does each snack pack have?
Station 13
Draw a Venn diagram for the factors of 56 and 35. Identify the GCF. Put all numbers 1-60 in the diagram.
Station 14
There are 60 students going on Mrs. Smith’s class trip. List ALL ways the class can be divided into groups with equal number of students?
Station 15
Draw a Venn diagram for the multiples of 7 and 3. Identify the LCM. Use numbers 1-50.
Station 16
Write an expression for the area of the rectangle in two different ways. Then find the area using each expression.
Station 17
Find the area of the rectangle composed of the two smaller rectangles. Then find the dimensions of all three rectangles.
Area= 15 square unitsArea = 30 square units
Station 18
Kevin has made a rectangle using 48 square tiles. If he adds the length and width of his rectangle together he gets a prime number. What is the length and width of Kevin’s rectangle? Explain your reasoning.