M302 Final Exam
probability
P(E) = # of outcomes in event/ total # of outcomes
Which of our famous knots are alternating?
Trefoil, Figure-eight, Granny
icosahedron
V - 12 E - 30 F - 20
dodecahedron
V - 20 E - 30 F - 12
octahedron
V - 6 E - 12 F - 8
cube
V - 8 E - 12 F - 6
Euler characteristic
V - E + F = 2
how many V, E, & F does a Mobius Band have? What is its Euler Characteristic?
V: 0 E: 1 F: 1 V - E + F = 2 0 - 1 + 1 = 0 It's Euler Characteristic is 0.
is it true the product of any two irrational numbers is irrational?
While the product of 2 irrational numbers can sometimes be irrational, there are cases where 2 irrational numbers produce a rational number. example: √8 * √2 = √16 = 4
Does it matter where you cut it?
Yes, it must be cut down its core because when you cut too close to either side it results in 2 bands. One band will be same length as original and contain a half twist (so another Mobius band) whereas the other will be the doubled length and two half twists.
How many 3-dimensional faces does a hyper-cube have?
a hyper-cube has 8 3D faces because its unfolded diagram consists of 8 cubes.
what does it mean for a knot to be alternating?
a knot is an alternating knot if when you follow along the string you see an over-crossing, under-crossing, over-crossing, under-crossing, (...) until you return to your starting point
What is a mathematical knot?
a mathematical knot has a closed loop with no loose ends
Euler circuit
a path that traverses each edge once, reaches every vertex, and returns to the starting point
Unknot
a simple loop of rope. Many forms of the un-knot exist. If a knot can be undone to a simple loop, the starting knot is equivalent to the un-knot
regular polygon
all the sides have the same length and all the angles are the same
integer (Z)
any natural number (1,2,3,...) or any negative natural number (-1,-2,-3,...), or 0.
composite number
any natural number that is not prime.
Natural Numbers (N)
any positive counting number like 1,2,3,4,....
rational number (Q)
any real number that we can write as (p/q), where p and q are integers.
irrational number
any real number that we cannot write as a fraction no matter what
Which sets have the same size as Natural Numbers?
evens, integers, rationals
T or F: every integer is a natural number
false
T or F: if a real number has an infinitely long decimal expansion, then it must be an irrational number
false
T or F: there are no even primes
false - 2
real number (R)
-any number that corresponds to a location on the number line -All real numbers are either rational or irrational.
regular solid
-faces are all identical regular polygons -number of edges coming out of any vertex is the same for all vertices
platonic solid
-faces of the solid are identical regular polygons -number of edges coming out of each vertex is the same for all
The Golden Ratio
-the number φ = (1+√5)/2 = 1.618 -It is the number you get when you make fractions out of the Fibonacci numbers (each Fib. number divided by the previous one)
What are the elements of effective thinking?
1) Understand Deeply 2) Make Mistakes 3) Ask Questions 4) Follow the Flow of Ideas 5) CHANGE (CUMAF)
first 10 numbers of the Fibonacci sequence
1, 1, 2 , 3, 5, 8, 13, 21, 34, 55
How many regular solids are there?
1. tetrahedron 2. cube 3. octahedron 4. dodecahedron 5. icosahedron
Equivalence by Distortion
2 objects are equivalent by distortion if we can stretch, shrink, bend, or twist one to form into the other (without cutting or gluing)
rigid symmetry
motion that preserves original shape or pattern without shrinking, stretching, or distorting
alphabet letters (equivalent by distortion)
(D, O) (E, F, T, Y) (K, X) (K, H) (P, Q) (A, R) (B)
prime number
-a natural number whose only divisors are 1 and itself -It can't be divided evenly by any other number.
How many edges and faces does a Klein bottle have?
E: 0 F: 1
How many F & E does Mobius band have?
F: 1 E: 1
What order does Natural, Integer, Real, and Rational?
N<Z<Q<R
prove there are infinitely many primes
given any natural number we can always find a prime number that is larger than that natural number proven by Euclid
event
group or set of outcomes (Ex: roll a "double" with 2 dice)
golden rectangle
has the base (b) and height (h) that satisfy the golden ratio (1+√5)/2 = 1.618
pythagorean theorem
if a triangle is a right triangle then the square of the length of the hypotenuse is equal to the sum of the squares of the lengths of the other 2 sides
pigeonhole principle
if there are more X objects than X spaces then at least one space will have to hold more than one object
Which sets are bigger than Natural Numbers?
irrationals, reals
What happens when you cut the Mobius Band in half?
its length doubles and has two half twists
no repeats & order does not matter
nCr = N! / (n-r)! * r!
graph
object drawn on a connected plane using a finite set of edges and vertices
fractal
object that displays self-similarity on all scales
outcome
one specific result (Ex: HHT)
Euler Circuit Theorem
only possible if there are an even number of edges for every vertex
random
randomly generated patterns usually exhibit more clustering and often have large empty spaces
examples of reflection
reflection in water
cardinality
size of a set
example of translation
square tiles/hexagon (bee comb)
example of rotation
starfish
self-similarity
the characteristic of looking the same as or similar to itself under increasing magnification
duality
the number of faces of a platonic solid correspond with the number of vertices of another platonic solid and vice versa
examples of rigid symmetry
translation, reflection, rotation
T or F: between every two rational numbers there is a rational number
true
T or F: every integer is a rational number
true
T or F: every integer is a real number
true
T or F: every irrational number is a real number
true
T or F: every natural number is either a Fibonacci number, or it can be written as a sum of non-consecutive Fibonacci numbers
true
one-to-one correspondence
two collections of objects that are equally numerous
tetrahedron
v- 4 e- 6 f- 4
are there infinitely many nonprimes?
yes there are infinitely many non-primes proven by the sequence (4, 6, 8, 10, 12, ....) because all of these numbers can be divided by 2 and the sequence goes on forever