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Number Theory
Yolanda McHenry, Ashley Courtney,
Tyler Williams, Jamiya Hagger
Natural Numbers
The set of natural numbers is also called the set of
counting numbers or positive numbers.
{1,2,3,4…}
Number theory deals with the study of the properties
of this set of numbers ({1,2,3,4…})and the
key concept to number theory
is
divisibility.
Divisibility
One counting number is divisible by another if the operation of
dividing the first by the second leaves a remainder of 0.
Divisibility- The natural number a is divisible by the natural number b
if there exists a natural number k such that a=bk.
45=9k; k is 5
• If b divides a, then we write b|a.
• If b does not divide a, then we write bΧa.
• 9|45
If the natural number a is divisible by the natural number b, then b is
a divisor or factor of a.
• 20=10k
• All factors of b are 1,2,4,5,10,20.
• What are all the factors of 15?
• 1,3,5, and 15
• If the natural number a is divisible by the natural number b, then a
is a multiple of b.
• Other multiples of b include 30,40,50,60, 70 and so on.
• What are some multiples of 5?
• 10,15,20, 25 and so on.
Factors and Multiples
Sieve of Eratosthenes- A systematic method for
Prime
Composite
Numbers
identifying
primeand
numbers
in a list of numbers.
• Step 1: Circle the prime number 2, then cross
out all other multiples of 2
• Step 2: Circle three, then cross out all other
multiples of 3.
• Step 4: Continue process for all other primes
less than or equal to square root of the last
number.
• Step 5: Circle all remaining numbers that are
not crossed out.
2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20
21 22 23 24 25
Prime and Composite Numbers
• Prime Number-A natural number greater than 1 that has
only itself and 1 as factors.
2,3,5,7 and 11 are the first five prime numbers
Composite Number-A natural number greater than 1 that is
not prime is called composite.
4,6,8,9, and 10 are the first five composite numbers
Divisibility Test
An aid in determining whether a natural number is divisible by
another natural number is called a divisibility test.
2
Number ends in 0,2,4,6,8.(The last
digit is even.)
9,489,994 ends in 4, it is divisible
by 2.
3
Sum of the digits is divisible by 3
897,432 is divisible by 3, since
8+9+7+4+3+2=33.
4
Last two digits form a number divisible
by 4.
7,693,432 is divisible by 4, since
32 is divisible by 4.
5
Number ends in 0 or 5.
8900 and 7635 are divisible by 5.
6
Number is divisible by both 2 and 3.
27,342 is divisible by 6 since it is
divisible by both 2 and 3.
8
Last three digits form a number
divisible by 8.
1,437,816 is divisible by 8, since
816 is divisible by 8.
9
Sum of the digits is divisible by 9.
428,376,105 is divisible by 9 since
the sum of digits is 36, which is
divisible by 9.
10
Last digit is 0
897,4663,940 is divisible by 10
12
Number is divisible by both 4 and 3.
376,984,032 is divisible by 12.
Divisibility Tests(cont’d)
123,216
2
Number ends in 0,2,4,6,or 8.( The last digit is even)
The last digit,8, is an even number therefore the 123,216 is
divisible by 2.
3 Sum of the digits is divisible by 3.
The sum of the digits,15, is divisible by 3 therefore
123,216 is divisible by 3.
4
Last two digits for a number divisible by 4.
The last two digits 16, are divisible by 4 therefore
123,216 is divisible by 4.
123,216
Divisibility Test (cont’d)
• The last digit does not end in a 5 or 0 therefore 123,216 is not
divisible by 5.
5 Number ends in 5 or 0
The number is divisible by both 2 and 3 therefore 123, 216 is divisible
by 6.
6
Number is divisible by both 2 and 3
• The last three digits 216, is divisible by 8 therefore 123,216 is
divisible by 8
8
Last three digits form a number divisible by 8
123,216
Divisibility
Tests (cont’d)
The sum of the digits ,15, is not divisible by 9
therefore 123,216 is not divisible by 9
9
Sum of the digits is divisible by 9
• The last digit does not end 0, therefore 123,216
is not divisible by 10.
10
The last digits is 0
• 123,216 is divisible by both 4 and 3 therefore it is
divisible by 12.
12
The number is divisible by both 4 and 3.
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