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A

In solving problems, we take into considerations the following. (1)
What do I know? (2) What do I need to find out? (3) What is my plan?
This will help you to answer the different problems that you will encoun-
ter.
Learning Task 4: Apply the LCM and GCF in solving the word problems
below. Write your answer in your notebook.
1. Mary has two pieces of cloth. One piece is 72 inches wide and the
other piece is 90 inches wide. She wants to cut both pieces into
strips of equal width that are as wide as possible. How wide should
she cut the strips?
2. Jerwin exercises every 12 days and Nikki every 8 days. Jerwin and
Nikki both exercised today. How many days will be until they
exercise together again?
3. Cean has 8-inch pieces of toy train track and Ruth has 18-inch
pieces of train track. How many of each piece would each child
need to build tracks that are equal in length?

User Swoot
by
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1 Answer

30 votes
30 votes

Explanation:

1.

we want to cut (= split or divide) the pieces into equal strips of max. width.

so, we are looking for the largest integer number that is a factor for both, 72 and 90.

that is the GCF (greatest common factor).

let's do a prime factor analysis (starting with 2):

72 :

72 / 2 = 36

36 / 2 = 18

18 / 2 = 9

9 / 2 no, next one

9 / 3 = 3

3 / 3 = 1 finished

72 = 2³×3²

90 :

90 / 2 = 45

45 / 2 no, next one

45 / 3 = 15

15 / 3 = 5

5 / 3 no, next one

5 / 5 = 1 finished

90 = 2×3²×5

the GCF is the combination of the longest streak per prime factor they share.

that is

2 and 3²

so, the GCF = 2×3² = 18

she can cut them all into strips of 18 in width.

2.

this is how often we have to add 12 to itself (multiply 12 by a factor), and how often we have to add 8 to itself so that both results are equal.

the smallest common result is the LCM (the least common multiple).

we get this again via prime factor analysis.

12 :

12 / 2 = 6

6 / 2 = 3

3 / 2 no, next one

3 / 3 = 1 finished

12 = 2²×3

8 :

8 / 2 = 4

4 / 2 = 2

2 / 2 = 1 finished

8 = 2³

the LCM is the combination of the longest streaks of the prime factors.

that is

2³ and 3

so, the LCM = 2³×3 = 24 days

in 24 days they will exercise together again.

3.

the same principle as 2.

how often do we need to add the numbers to themselves until we reach the same result. we need the LCM.

prime factor analysis :

8 :

we know already

8 = 2³

18 :

18 / 2 = 9

9 / 2 no, next one

9 / 3 = 3

3 / 3 = 1 finished

18 = 2×3²

the LCM is the combination of the longest streaks of the prime factors.

that is 2³ and 3²

the LCM = 2³×3² = 72 in

Cean needs 72/8 = 9 pieces.

Ruth needs 72/18 = 4 pieces.

User Reuel Ribeiro
by
3.5k points