Terms
Notation (write the notation and the diagram)
Diagrams
Formulas
Applications
100
The set of all possible outcomes
What is the Universe
100
The union of sets A and B
What is AuB
100
A two circle diagram to represent similarities and differences
What is a Venn diagram
100
Addition rule
What is P(aub)= P(a) + P(b) - P(anb)
100
roll one dice. what is the probability that it is a six
What is (1/6)
200
The probability figured by performing trials and recording results
What is experimental probability
200
The Intersection of sets A and B
What is AnB
200
representing how 2 or more groups relate to 2 or more other groups based on how many participants are within each intersection of groups
What is 2-way frequency chart
200
one way to find P(anb)
What is P(a)xP(b/a)
200
what is the probability that you will roll a three on your second roll of a dice, given that you rolled a 3 on your first roll
What is (1/6)
300
The probability attained by knowledge of how the probability should present itself
What is expected probability
300
the complement of A
What is A^c
300
A revision on the original 2-circle diagram to enable use of different relationships between the two or more circles
What is a Euler diagram
300
The conditional probability rule to find P(b/a)
What is P(b/a)=P(anb)/P(a)
300
draw the diagram for ((A^c)nB)^c
400
A set that is fully composed within a different set
What is a subset
400
A given that B already occured
What is A/B
400
a diagram showing probabilities and how they change as possibilities occur.
What is a tree diagram
400
What is equivalent to P(a)xP(b/a)
What is P(b)xP(a/b)
400
if we roll two dice, what is the probability that our sum is greater than nine
What is (6/36) = (1/6)
500
A set that shares no values with a different set
What is disjoint
500
The entire set of all possibilities
What is U
500
which diagram would you use to compare hair color, eye color, and gender? Give a reason and draw how this diagram would look
euler diagram or 2-way frequency table
500
Bayes theorem
What is P(a/b)=(p(b/a)xp(a))/(p(b))
500
Given a fair coin and an unfair coin (only heads) what is the probability that you chose the fair coin, given that you have flipped heads.
What is (1/3)