Jul 20, 2015

General Notes : Prime Numbers for Exam Preparation

Prime Numbers General Notes

A prime number can be divided, without a remainder, only by itself and by 1. For example, 17 can be divided only by 17 and by 1.


Some facts:

  1. The only even prime number is 2. All other even numbers can be divided by 2.
  2. If the sum of a number's digits is a multiple of 3, that number can be divided by 3.
  3. No prime number greater than 5 ends in a 5. Any number greater than 5 that ends in a 5 can be divided by 5.
  4. Zero and 1 are not considered prime numbers.
  5. Except for 0 and 1, a number is either a prime number or a composite number. A composite number is defined as any number, greater than 1, that is not prime.
To prove whether a number is a prime number, first try dividing it by 2, and see if you get a whole number. If you do, it can't be a prime number. If you don't get a whole number, next try dividing it by prime numbers: 3, 5, 7, 11 (9 is divisible by 3) and so on, always dividing by a prime number (see table below).

Here is a table of all prime numbers up to 1,000:

23571113171923
29313741434753596167
717379838997101103107109
113127131137139149151157163167
173179181191193197199211223227
229233239241251257263269271277
281283293307311313317331337347
349353359367373379383389397401
409419421431433439443449457461
463467479487491499503509521523
541547557563569571577587593599
601607613617619631641643647653
659661673677683691701709719727
733739743751757761769773787797
809811821823827829839853857859
863877881883887907911919929937
941947953967971977983991997

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