Real Numbers and Elements of Number Theory Flashcards
This deck provides basic elements of Number Theory. It provides definitions of different type of numbers, studies the relationships between odd and even numbers, and explains prime numbers and prime factorization. At the end of the deck, there are practice questions that reinforce what you've learned as well as test your knowledge from different angles.
What is the base of our numerical system?
Our numerical system is a decimal or base ten system. It uses digits from 0 to 9 as a base.
Our numerical system is a place-value system. This means that the place or location of a numeral determines its numerical value.
Name:
subsets of real numbers
The following are subsets of real numbers:
- Natural numbers
- Whole numbers
- Integers
- Rational numbers
- Irrational numbers
Define:
natural numbers
Natural numbers are the set of counting numbers.
{1, 2, 3, 4, 5…}
Natural numbers are comprised of odd and even numbers.
The smallest natural number is 1; the largest natural number is infinity.
Define:
whole numbers
Whole numbers are the set of natural (counting) numbers and zero.
{0, 1, 2, 3, 4, 5…}
Whole numbers are comprised of odd and even numbers.
Define:
integers
Integers are the set of natural numbers, their negative opposites, and zero.
{…-3, -2, -1, 0, 1, 2, 3…}
Integers are comprised of whole numbers and the opposites of natural numbers.
Define:
rational numbers
Rational numbers are the numbers that can be expressed as simple fractions of two integers – i.e. as ratios.
*** The denominator in the fraction cannot be zero.
Examples: 5 = 5/1 1.75 = 7/4
Rational numbers consist of integers and non-integral numbers (numbers that have terminating or repeating decimals).
Define:
irrational numbers
Irrational numbers are the numbers that cannot be written as terminating or repeating decimals.
Example:
For the purposes of the SAT, the most important irrational numbers are the square root of 2, the square root of 3, and Pi.
Define:
even numbers
A number that is divisible by 2 is called an even number.
{…-4, -2, 0, 2, 4…}
All numbers ending in 0, 2, 4, 6, and 8 are even.
Define:
odd numbers
A number that is not divisible by 2 is called an odd number.
{…-5, -3, -1, 1, 3, 5…}
All numbers ending in 1, 3, 5, 7, and 9 are odd.
Is the sum of two even numbers even or odd?
EVEN + EVEN = ?
EVEN + EVEN = EVEN
Example: 10 + 2 = 12
Is the difference between two even numbers even or odd?
EVEN - EVEN = ?
EVEN - EVEN = EVEN
Example: 10 - 2 = 8
Is the sum of two odd numbers odd or even?
ODD + ODD = ?
ODD + ODD = EVEN
Example: 5 + 5 = 10
Is the difference between two odd numbers odd or even?
ODD - ODD = ?
ODD - ODD = EVEN
Example: 5 - 3 = 2
Is the sum of an odd number and an even number odd or even?
EVEN + ODD = ?
EVEN + ODD = ODD
ODD + EVEN = ODD
Examples:
4 + 3 = 7
5 + 4 = 9
Is the difference between an odd number and an even number odd or even?
EVEN - ODD = ?
ODD - EVEN = ?
EVEN - ODD = ODD
ODD - EVEN = ODD
Examples:
6 - 5 = 1
7 - 2 = 5
Is the product of two even numbers odd or even?
EVEN x EVEN = ?
EVEN x EVEN = EVEN
Example: 6 x 8 = 48
Is the product of two odd numbers odd or even?
ODD x ODD = ?
ODD x ODD = ODD
Example: 3 x 7 = 21
Is the product of an odd number and an even number even or odd?
EVEN x ODD = ?
EVEN x ODD = EVEN
Example: 6 x 3 = 18
*** When dividing odd or even numbers, the result can be a fraction, which is not a whole number; therefore, it is neither even nor odd.
When you raise even numbers to odd powers, is the result odd or even?
(EVEN)ODD = ?
(EVEN)ODD = EVEN
Example: 25 = 32
When you raise even numbers to even powers, is the result odd or even?
(EVEN)EVEN = ?
(EVEN)EVEN = EVEN
Example: 44 = 256
When you raise odd numbers to odd powers, is the result odd or even?
(ODD)ODD = ?
(ODD)ODD = ODD
Example: 33 = 27
When you raise odd numbers to even powers, is the result odd or even?
(ODD)EVEN = ?
(ODD)EVEN = ODD
Example: 72 = 49
True or False?
Any operation (addition, subtraction, multiplication, division or raising to power) on even numbers with another even number will result in an even number answer.
True.
If you understand that any two even numbers are divisible by 2, then logically the sum, the difference, the product, the quotient, the power of the two will always be divisible by two.
True or False?
Any operation (addition, subtraction, multiplication, division or raising to power) on odd numbers will result in an odd number.
False.
The sum and the difference of two odd #’s are even
The product, the quotient, and the power is odd
Think of ODD numbers as EVEN + 1. Or remind yourself that odd numbers end in 1, 3, 5, 7, or 9.
Example:
ODD + ODD = EVEN + EVEN + 2 = EVEN.