Fractions and multiples

Index Divisibility Fractions Simplest form Operations Exercises

Factors and Fractions

Matem´ticas 2o E.S.O.
a
Alberto Pardo Milan´s
e

-


1 Divisibility

2 Fractions

3 Simplest form of a fraction

4 Operations

5 Exercises

e Factors and Fractions


Divisibility



Divisibility

Factors and multiples

A factor of a number n, is a number d which divides n.
Read ⇐⇒ if and only if.

d is a factor of n ⇐⇒
d is a divisor of n ⇐⇒
d divides n ⇐⇒
n is divisible by d ⇐⇒
n is a multiple of d.

Examples:
−7 divides 14 ⇐⇒
−7 is a factor of 14 ⇐⇒
14 is divisible by −7 ⇐⇒
14 is a multiple of −7.



Divisibility

Primes

A prime number is a positive number that has only two positive
factors 1 and the number itself (1 is not considered a prime
number as it only has one positive factor). A number with more
than two positive factors it is called composite number.

Examples: 3 is a prime number because has only two positive fac-
tors (1 and 3). 6 is a composite number because has four positive
factors (1, 2, 3 and 6).
Two numbers are relatively prime if they have no common positive
divisors except 1.

Example: 6 and 25 are relatively prime because positive factors
of 6 are 1, 2, 3, 6 and positive factors of 25 are 1, 5, 25.



Divisibility

Prime decomposition

Prime decomposition is to ﬁnd the set of prime factors of an
integer: To factorize a number you have to express the number as
a product of its prime factors.
To factorize negative numbers use also −1.

Examples:
• 90 = 2 · 45 = 2 · 3 · 15 = 2 · 3 · 3 · 5 = 2 · 32 · 5.
• −25 = −1 · 25 = −1 · 5 · 5 = −1 · 52 .



Divisibility

GCD and LCM

The Greatest Common Divisor (GCD) is the highest number that
is a common factor of two or more numbers. It is clear that if
GCD(a, b) = 1, a and b are relatively prime.

Examples: GCD(42, 110) = 2, because positive factors of 42
are 1, 2, 3, 6, 7, 14, 21, 42, and positive factors of 110 are
1, 2, 5, 10, 11, 22, 55, 110.
12 and 35 are relatively prime, because GCD(12, 35) = 1.
The Least Common Multiple (LCM) is the lowest positive number
that is a common multiple of two or more numbers.

Example: LCM(6, 9) = 18, because positive multiples of 6 are
6, 12, 18, 24, . . . and positive multiples of 9 are 9, 18, 27, . . .



Fractions



Fractions

What’s a fraction?

A fraction is a number that represents a part of something.
a
Fractions are written in the form , where a and b are integers,
b
a
and the number b is not zero. Read a over b.
b
The number a is called numerator, and the number b is called
denominator.

13
Example: , 13 is the numerator and 25 is the denominator.
25



Fractions

Proper fractions and improper fractions
A proper fraction is a fraction that is less than one. A fraction
greater than one is called an improper fraction.
12 23
Examples: is a proper fraction. is an improper fraction.
17 15
Equivalent fractions
Equivalent fractions are diﬀerent fractions that name the same
amount.

3 6
Example: =
7 14
because they represent the same amount.



Fractions

Amplify and reduce fractions

To ﬁnd equivalent fractions, multiply or divide the numerator and
the denominator by the same number. If you multiply by the same
number, you amplify the fraction. If you divide by the same factor,
you reduce the fraction.

Examples:
6
• To amplify we
9
6 60
multiply the numerator and the denominator by 10: = .
9 90
6
• To reduce we
9
6 2
divide the numerator and the denominator by 3: = .
9 3



Simplest form of a fraction




Lowest Terms Fraction

A lowest terms fraction is a fraction that can not be reduced
anymore. To write a fraction in the simplest form ﬁnd the lowest
terms fraction. To reduce a fraction to the lowest terms fraction,
we can use two methods:

• Divide the numerator and the denominator by the Greatest
Common Factor.
• Divide the numerator and the denominator by any common
factor and keep dividing until they are relatively prime.




Examples:
70
• To obtain the lowest terms fraction of we can divide
105
70 2
70 and 105 by GCD(70, 105) = 35, so = .
105 3
70
• To reduce to the lowest terms fraction we can di-
105
vide by 5 and keep dividing until there are no common factors
70 14 2
but one = = , (note 2 and 3 are relatively prime ).
105 21 3



Operations



Operations

Add and subtract

To add or subtract fractions with like denominators, add the
numerators and keep the same denominator. To add or subtract
fractions with unlike denominators, ﬁrst amplify these fractions to
obtain like denominators (using the LCM or any multiple).
Simplify, if possible.
Examples:
4 8 12 4
• + = = .
15 15 15 5
3 1 3 1 6 5 11
• To add + using the LCM: + = + = .
15 6 15 6 30 30 30
Because LCM(15, 6) = 30.
• Using another common multiple of 15 and 6, for example 60:
3 1 12 10 22 11
+ = + = = .
15 6 60 60 60 30



Operations

Multiply and divide

To multiply fractions, multiply the numerators and multiply the
denominators then simplify.
12 3 12 · 3 36 18
Example: · = = = .
5 14 5 · 14 70 35
You can get the reciprocal of a fraction by switching its numerator
and denominator.
14 21
Example: The reciprocal of is .
21 14
To divide by a fraction,multiply by its reciprocal and simplify,if
possible.
2 4 2 17 2 · 17 34 17
Example: : = · = = = .
8 17 8 4 8·4 32 16



Exercises



Exercises

Exercise 1

There are 28 students in our class and we want to divide it into
groups with equal number of students. How many ways can the
class be divided into groups? What are they?



Exercises

Exercise 2

Mary wants to serve hot dogs for 48 people. Sausages come in
packages of 8 and hot dog buns come in packages of 12. She wants
to have enough to serve everyone and have none left over, how
many packages of sausages and hot dog buns should she purchase?



Exercises

Exercise 3

Peter works in a florist. Today He is making identical floral
arrangements for a bridal party. He has 84 daisies, 66 lilies, and 30
orchids. He wants each arrangement to have the same number of
each flower. What is the greatest number of arrangements that he
can make if every flower is used?



Exercises

Exercise 4

Samantha loves the sea. She has kayaking lessons every ﬁfth day
and diving lessons every seventh day. If she had a kayaking lesson
and a diving lesson on June the sixth, when will be the next date
on which she has both kayaking and diving lessons?



Exercises

Exercise 5

There are two ﬂashing neon lights. One blinks every 4 seconds and
the other blinks every 6 seconds. If they are turned on exactly at
the same time, how many times will they blink at the same time in
a minute?



Exercises

Exercise 6

Peter sells books. He made 240e selling children’s books, 140e
from cookbooks, and 280e from paperback books. He gets exactly
the same beneﬁt from each book. What is the most that Peter
could get for each book? How many books could Peter have sold
then?



Exercises

Exercise 7

Complete:
3
=
4
A half= One and a half=
Three ﬁfths=
5 1
= 1 4 =
2 = 3
5
Two thirds= Two and a quarter=
Two quarters=
1 2
= 1 4 =
3 = 5
7
A quarter= Two and four tenths=
An/one eighth=
1
3 1 =
= 12
6


Exercises

Exercise 8

Write a fraction in simplest form beside each sentence:
There are forty-two girls out of seventy-two people:

The baby snake was just four and three quarters inches long:

Fifteen out of the twenty students has dogs as pets:

I walk ﬁve and a quarter miles a day:



Exercises

Exercise 9

An orchard has 72 peach trees 15 apple trees, and 23 lemon trees.
In simplest form, what fraction of the trees are peach trees?



Exercises

Exercise 10

George swims seven eighths miles and Mat swims ten twelfths
miles. Who swims farther?



Exercises

Exercise 11

Compare these fractions using the least common denominator:
2 3 9 7 −1 −2 13
, , , , , , .
−6 4 15 5 −3 10 12



Exercises

Exercise 12

Lance and Frank ate seven twelfths of a pizza. If Frank ate a third
of the pizza, how much of the pizza did Lance eat?



Exercises

Exercise 13

Tangram means seven boards of skill.
The Tangram is a Chinese
puzzle consisting of seven ﬂat
shapes (called tans) which are
put together to form diﬀerent
shapes. Study the tans at the
right forming a square. The
side of the square is 1 cm, so
the area is 1 cm2 . Find the
fractional value of each piece.



Exercises

Exercise 14

Of the 20 students, a quarter of the students wear jeans, a ﬁth
wear shorts and a tenth wear a skirt. How many students wear
something else?



Exercises

Exercise 15

My car´s gas tank was empty and now is full but I paid forty euros
for it. To go to Marbella I need two ﬁfths of the tank, how much
money is this fraction of the tank?



Exercises

Exercise 16

Peter cut six apples into quarters, how many pieces of apple did he
have?



Exercises

Exercise 17
1
Mike cleaned of the 24 m2 yard . How many are left?
4



Exercises

Exercise 18
3
Thomas drunk cup of milk, and now he has 24 cl left. How
5
many ml did the cup have originally?



Exercises

Exercise 19
2
Eric is reading a book with 195 pages. He read of the pages
5
today. How many are left?



Exercises

Exercise 20
1
Of Paul’s stone collection are white stones. He has total of 75
5
stones. How many of them are not white?



Exercises

Exercise 21
1
Mom baked cookies, and gave of them to Beth, and of the
2
2
remaining ones, she gave to Seth. The rest, which was 4
3
cookies, she ate herself. How many did she bake originally?



Exercises

Exercise 22
1
This time Mom baked again cookies, and gave of them to Beth,
2
1
and of the remaining ones she gave to Seth. There were 2
3
cookies left. How many did she bake originally?


Fractions and multiples

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