TYPES OF NUMBERS

Types of Numbers

(Source: http://web.mst.edu/~kosbar/test/ff/elem/typesofnumbers.html)

There are many different types of numbers

(Image from https://www.slideshare.net/AdilAslam4/numbers-and-its-types-in-mathematics)

1. NATURAL or COUNTING NUMBERS = are the set of numbers that you learn as a child to use to count how many objects you see. These numbers are 1, 2, 3, 4, 5, 6, and soon. Sometimes they are also referred to as POSITIVE INTEGERS.

2. WHOLE NUMBERS = these numbers are ALL the Natural or Counting Numbers PLUS ZERO (o). In essence, they are 0, 1, 2, 3, 4, 5, 6, and soon. They are also called NON-NEGATIVE INTEGERS.

3. INTEGERS = these are ALL whole numbers INCLUDING their NEGATIVE counterparts. These are 0, 1, 2, 3, 4, 5, and soon AND -1, -2, -3, -4, -5 and soon.

4. RATIONAL NUMBERS = any number that can be expressed as a RATIO of INTEGERS, or as a FRACTION. Rational numbers include ALL INTEGERS and their FRACTIONS such as 0, 2, 4, 2/3, - 3 . -8, -4/5, -45/37, etc.

All rational numbers have a DECIMAL equivalent. For example,

a) 1/5 = 0.200....

b) 5/7 = 2/3 = 0.66666 ...

c) 1/7 = 0.142857142857142857...

The decimal equivalent of rational numbers always end in a repeating digit, or a series of digits. Reference the above examples, we can see that the repeating digit of 1/5 is 0; the repeating digits of 2/3 is 6; and 1/7 ends with the sequence 14285 repeating forever.

5. IRRATIONAL NUMBERS =  are numbers that have a decimal equivalent; however they don't have a repeating digit or series of digits. This also means that one cannot find a ratio of integers that is exactly equal to the number. Common examples of irrational numbers are the square root of 2 and π (pi).

6. REAL NUMBERS = include ALL the RATIONALS and ALL the IRRATIONALS. All the different types of numbers from 1 to 5 are REAL NUMBERS.

7. IMAGINARY NUMBERS = any real number multiplied by the square root of -1. Often the square root of -1 is referred to as i or j. So an imaginary number can be written as 3.2i or -8.77j. It is OK to use irrational multiplying numbers, so πj is a perfectly reasonable imaginary number.

8. COMPLEX NUMBERS = any real number ADDED to any IMAGINARY number, such as 4 + 6i, 2/3 + 25j, etc. 

Mathematics Tips & Tricks: Division

How you know when a number can be evenly divided by the certain numbers? By evenly means that the quotient has no remainder or you get an exact whole number.

Here’s a quick way to know when a number can be evenly divided by these certain numbers:

A number can be evenly divided by:

• 10 if the number ends in 0

Examples:

1) 500 / 10 = 50

2) 2750 / 10 = 275

3) 5240 / 10 = 520

• 9 when the digits are added together and the total is evenly divisible by 9

Examples:

1) 522 ==> 5+2+2 = 9 ; Since 9 is divisible by 9  (or a multiple of 9), then 522 can be evenly divided by 9.

522 / 9  = 58

2) 84213 ==> 8+4+2+1+3 = 18: Since 18 is divisible by 9 ( or a multiple of 9), then 84213 can be evenly divided by 9.

84213 / 9 = 9357

3) 50045 ==> 5+0+0+4+5 =  14: Since 14 is not divisible by 9, then 50045 cannot be evenly divided by 9.

• 8 if the last three digits are evenly divisible by 8 or are 000

Examples:

1) 71024 ==> the last 3 digits 024 are evenly divisible by 8 so 71024 can be evenly divided by 8.

71024 / 8 = 8878

2) 5027000 ==> the last 3 digits are 000, then 5027000 can be evenly divided by 8.

5027000 / 8 = 628375

3) 2000 ==> the last digits are 000, the 2000 can be evenly divided by 8.

2000 / 8 = 250

• 6 if it is an even number and when the digits are added together the answer is evenly divisible by 3

Examples:

1)  2532 ==> Is it even number? Yes! ; 2+5+3+2 = 12 : Since 12 is a multiple of 3, then 2532 can be evenly divided by 6.

2532 / 6 = 422

2)  984 ==> Is it even number? Yes! : Is 9+8+4 = 21 a multiple of 3? Yes!  (3x7 = 21)

984 / 6 = 164

• 5 if it ends in a 0 or 5

This is easy. Any number with 0 or 5 at the end can be evenly divided by 5.

Examples:

1) 510 ==> 510 / 5 = 102

2) 5355 ==> 5355 / 5 = 1071

3) 20035 ==> 20035 / 5 = 4007

• 4 if it ends in 00 or a two digit number that is evenly divisible by 4

Examples:

1)  4800 ==> 4800 / 4 = 1200

2) 724 ==> the last digits 24 is a multiple (4x6=24) of 4 so 724 can be evenly divided by 4.

724 / 4 = 181

3) 6816 ==> 16 is a multiple of 4 (4x4=16) then 6816 can be evenly divided by 4.

6816 / 4 = 1704

• 3 when the digits are added together and the result is evenly divisible by the number 3

Examples:

1) 56451 ==> 5+6+4+5+1 = 21: Is 21 divisible by 3? Yes! Then 56451 can be evenly divided by 3.

56451 / 3 = 18817

2) 300342 ==> 3+0+0+3+4+2 = 12: Is 12 divisible by 3? Yes! Then 300342 can be evenly divisible by 3.

300342 / 3  = 100114

3) 522 ==> 5+2+2 = 9; Since 9 is divisible by 3, then 522 can be evenly divided by 3.

522 / 3 = 174

• 2 if it ends in 0, 2, 4, 6, or 8

Like 5, this is very easy to understand. Any number with 0, 2, 4, 6 & 8 at the end, can be evenly divided by 2.

Examples:

1) 2010 ==>  2010 / 2 = 1005

2) 278 ==> 278 / 2 = 139

3) 62456 ==> 62456 / 2 = 31228