1. Along with various other stuff NATS206-2 24 Jan 2008
Math Review
Along with various other stuff
NATS206-2
24 Jan 2008

2. Pythagoras of Samos (570-500 B.C) and the Invention of Mathematics
Pythagoras founded a philosophical and religious school in Croton (Italy) that had enormous influence. Members of the society were known as mathematikoi. They lived a monk-like existence, had no personal possessions and were vegetarians. The society included both men and women. The beliefs that the Pythagoreans held were:
that at its deepest level, reality is mathematical in nature,
that philosophy can be used for spiritual purification,
that the soul can rise to union with the divine,
that certain symbols have a mystical significance, and
that all brothers of the order should observe strict loyalty and secrecy.

3. Samos
Pythagoras Quotes:
“Numbers rule the Universe”
“Geometry is knowledge of eternally existent”
“Number is the within of all things”

4. Abstract Mathematics 2 sheep + 2 sheep = 4 sheep
1000 Persian Ships x 100 Persians/ship = 100,000 Persians
-Or –
2 + 2 = 4
100 x 1000 = 100,000
Why bother with the sheep and Persians?

5. Powers
Xn means X multiplied by itself n times, where n is referred to as the power.
Example: 22 = Raising a number to the power of two is also called squaring or making a square. Why is this?
Example: 23 = 8. Raising a number to the power of three is also called cubing or making a cube. Why is this?

6. Powers, Continued… The power need not be an integer.
Fractional Powers:
Example: 21/2= Raising a number to the power of 1/2 is also called taking the square root.
Negative Powers:
Raising a number to a negative power is the same as dividing 1 by the number to the positive power, I.e.
X-n = 1/Xn
Example: 3-2 = 1/32 = 1/9 =

7. Powers, Continued
Some mathematical operations are made easier using powers, for example:
Xn  Xm = Xn+m
therefore 32 = 4  8 = 22  23 = 22+3= 25= 32

8. Powers of Ten Xn means X multiplied by itself n times
10n means 10 multiplied by itself n times
10-n means 1 divided by 10n
Powers of ten are particularly easy
1=100; 10=101; 100=102; 1000=103; 10,000=104
Obviously, the exponent counts the number of zeros.
For negative powers of ten, the exponent counts the number of places to the right of the decimal point
1=100; 0.1=10-1; 0.01=10-2; 0.001=10-3; =10-4

9. Example There are approximately 100 billion stars in the sky.
1 billion = 1000 million = 109
100 billion = 100 x 109 =102 x 109 =1011
There are at least 100 billion galaxies.
So there are at least 1011 x1011=1022 stars in the Universe

10. Scientific Notation
Any number can be written as a sequence of integers multiplied by powers of ten. For example
1,234,567 = 106
Notice that on the left there are 6 places after the 1 and on the right ten is raised to the power of 6.
Examples:
# of people in USA = 295,734,134= 108
Tallest building, meters = 5.495102 (not 103)

11. Examples How many seconds in 1 year? 60 seconds in 1 minute
60 minutes in 1 hour
24 hours in 1 day
days in 1 year
Sec/year = 60x60x24x365.25

12. Significant Figures
The relative importance of the digits in a number written in scientific notation decrease to the right.
For example, 106 is very close to 106, but 106 is quite different from 106.
Let’s say that we are lazy and we don’t want to write down all those digits. We can transmit most of the information by writing 1.234106. The number of digits that we keep is number of significant figures.
106 has 7 significant figures, but
1.234106 has 4 significant figures.

13. How Many Significant Figures are Displayed on Your Calculator?

14. Examples Net Weight of People in the USA
# of people in USA = 295,734,134= 108
Average weight of a US Male = 185 lbs
Average weight of a US Female = 163 lbs

15. Digression on Zero
Why is zero important? Because it enables the place-value number system just described. It is difficult to deal with large numbers without zero.
Zero was first used in ancient Babylon (modern Iraq) in the 3rd century BC.
Our use of zero comes from India through the Islamic world and China. The word zero comes from the arabic sifr; the symbol from China. Zero seems to have been invented in India in the 5th century AD, but whether this was independent of the Babylonians is debated.
Independently, Mayan mathematicians in the 3rd century AD developed a place-value number system with zero, but based on 20 rather than ten.

16. Digression on Mayan Mathematics
The ancient Maya were accomplished mathematicians who developed a number system based on 20 (perhaps they didn’t wear shoes).

17. Examples What fraction of your life is this class occupying?
Average lifespan for males in USA = years
Average lifespan for females in USA = 78.7 years
Average length of NATS206 class = 1 hour and 15 minutes

18. Some Simple Geometry Circles:
The ratio of the circumference of a circle (C) to the diameter (D) is called  (‘pi’), C/D= . The quantity is the same for all circles =
The area (A) of a circle is related to the diameter by
A= 1/4 D2
Sometime radius (R) is used in place of diameter. The radius of a circle or sphere is equal to half its diameter: R=D/2

19. Digression on  Source Date Value Old Testament 500 BC 3 Archimedes
3.1463
Tsu Ch’ung Chi
450 AD
355/113
Al’Khwarizimi
800 AD
3.1416
Ludolph Van Ceulen
1600
35 digits
Ramanujan
1900
Derived formula
Chudnovskys/Ramanujan
1990
2 billion digits
Project Gutenberg
1995
1,254,539 digits

20. Example How far is it from the north pole to the equator?
Diameter of Earth = 7901 miles

21. Archimedes: Antiquity’s Greatest Scientist
The discovery Archimedes was most proud of

22. Spheres The volume (V) of a sphere is equal to
V = 4/3 R3 or V = 1/6 D3
We measure volume in units of length cubed, for example meters cubed, which is usually denoted as m3, though you might sometimes see it spelled out as meters cubed.
We can also measure the area on the surface of a sphere, called the surface area (A),
A = 4R2 or A = D2

23. Visualize taking each little segment in this drawing, laying it flat, measuring its area, and adding them all together. This would give you the surface area.

24. Examples What is the area of a room has dimensions of 15’ x 20’?
What is the area of a room in square feet if the dimensions are 3 yards by 4 yards?
What are the dimensions of a square room with an equal area?

25. Example
What is the area of the Earth?
Diameter of Earth = 12,756 km