1. How do we use numbers?
Can you give examples of each of the three types?
A good example of a “Tag” is my Amateur Radio License KC9JPZ

2. Good Examples of a Tag
KC9JPZ
W3HUK

3. The World of Numbers is full of surprises
When?
Positive/Negative Integers (whole) -1, 2, 3, -4 etc. Pre-history
Fractions, Decimals ½, 1/6, 90/ BC
Numbers that can be expressed as the ratio of two whole numbers rational
Numbers that cannot irrational 500BC
An example of an irrational number
Another irrational number, C/D 
Complex Numbers
Matrices ~ 1850AD

4. Systems of handling numbers
Roman Numerals MCMLV = 1955
British System of Money* pounds, shilling, pence
20 shillings to the pound, pence for the shilling
*In 1971 the British System was changed to 100 pence to the pound
Decimal System common use throughout the west for about 850 years. Special symbols are digits (0,1, 2, 3, 4 … 9) and all other numbers are written in terms of fundamental digits
Example: 8, 629, 798, 478, 111 = eight trillion, six hundred twenty nine billion, seven hundred ninety-eight million, four hundred seventy-eight thousand, one hundred and eleven

5. The Binary System: Perfect for Computers
To Begin with, we make up a table of successive products of 2
1 = a bit
2 x 1 =
2 x 2 x 1 =
2 x 2 x 2 x 1 =
2 x 2 x 2 x 2 x 1 = a nibble
2 x 2 x 2 x 2 x 2 x 1 = 32 etc
28 = a byte
Compute in decimal and in hexi-decimal
Ans: 29 and 1D

6. From: The Lore of Large Numbers by Philip J
From: The Lore of Large Numbers by Philip J. Davis, Random House Printing 1961
Problem Set # 1
How many different one digit numbers are there?
How many different two digit numbers are there?
Which is large LXXXVIII or C?

7. Invent your own for any remaining
trillion = 1012 (3 x 3) + 3 = 12
quadrillion = 1015 (3 x 4) + 3 = 15
vigintillion = 1063 (3 x 20) + 3 = 63
Invent your own for any remaining
e.g. Kasher and Newman in their book “Mathematics and the Imagination”
10100 = one googol
10googolplex = pme googolplex

8. Standard prefixes for large multiples
Adopted by an international committee on weights and measures in Paris in the fall of 1958

9. Algebra and Calculator order of operations

10. Example: Order of Operations

11. Use the correct order of operations
1st law of exponents 2 n + 2 m = 2 (m + n)
2nd law of exponents [a m] n = a m n

12. Significant Figures, Accuracy and Order of Magnitude
The order of magnitude of a number is the number which results when the given number has been rounded to one signficant figure.
A hardware store displays a gallon jug full of pea beans. The prize is for a bicycle. The person guessing the closest to the actual number wins. Put in an estimate.

13. Small numbers

14. And their names

15. Hint! Sometimes Division by Zero is camouflaged!
OOPS! What is wrong with this.
Hint! Sometimes Division by Zero is camouflaged!

16. Let us investigate this converging series
Etc.
1st term
2nd
4th
3rd
Do this for up to the 5th term in the series and see how close you get to e. Is the series converging? How would you prove it?

17. More on the Lore of Numbers!
Wilson’s Theorem1 states that a number N is a prime if and only if it divides the number:
1 x 2 x 3 x 4 x 5 x … x (N – 1) + 1
Try this for the number 11 which is known to be a prime! Try this for a number known not to be a prime.
Verify (but not by Wilson’s theorem) that 1973 is a Prime Number. Explain how you would attempt this.
1For a proof of Wilson’s Theorem, see Elementary Number Theory by J.V. Upensky and M.A. Heaslet, McGraw-Hill, 1939, p.153

18. Microsoft Excel is a Powerful Scientific Tool

19. Where did this come from?

20. Which results in Using Mathematica 4.0
My TI 85 calculator gave !
Who gets the 4 mills per month?

21. Done on a TI-85 calculator

22. And finally using GW Basic

23. My 2008 Honda Accord Real Life Example Principal % Rate / period
Three Years
Monthly Payment