4.6 KiB
State De Morgan's Law for n sets
For any sets A_1, A_2, \dots, A_n:
\left(\bigcup_{i=1}^n A_i\right)^c = \bigcap_{i=1}^n A_i^c
\left(\bigcap_{i=1}^n A_i\right)^c = \bigcup_{i=1}^n A_i^c
The complement of a union is the intersection of complements, and vice versa.
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State the Distributive Law for sets A, B, and C
A \cap (B \cup C) = (A \cap B) \cup (A \cap C)
A \cup (B \cap C) = (A \cup B) \cap (A \cup C)
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State the inclusion-exclusion principle for a finite collection of sets A_1, A_2, A_3, \dots A_n where n=2
n = 2 case:
|A \cup B| = |A| + |B| - |A \cap B|
n = 3 case:
|A \cup B \cup C| = |A| + |B| + |C| - |A \cap B| - |A \cap C| - |B \cap C| + |A \cap B \cap C|
For a finite collection of sets A_1, A_2, A_3, \dots A_n, we have
\left| \bigcup_{i=1}^n A_i \right| = \sum_{i=1}^n |A_i| - \sum_{i < j} |A_i \cap A_j| + \sum_{i < j < k} |A_i \cap A_j \cap A_k| - \dots + (-1)^{n-1} |A_1 \cap A_2 \cap \dots \cap A_n|
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For the function
f: A \to B
State the following of f:
- Domain
- Co-domain
- Range
AB- Set of all possible outputs of
f(not necessarilyB)
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State definition for each the following:
- Random experiment
- Outcome
- Sample space
- Event
- A random experiment is a process by which we observe something uncertain
- An outcome is a result of a random experiment
- The sample space
Sis the set of all possible outcomes - An event is a subset of the sample space
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State the Axioms of Probability
Axioms of Probability
- For any event
A,P(A) \geq 0 P(S) = 1- If
A_1, A_2, A_3, \dotsare disjoint events, thenP(A_1 \cup A_2 \cup A_3 \cup \dots) = P(A_1) + P(A_2) + P(A_3) + \dots
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In a finite sample space S, where all outcomes are equally likely, what is the probability of any event A?
P(A) = \frac{|A|}{|S|}
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What is P(A^c) in terms of P(A)?
P(A^c) = 1 - P(A)
Follows from the axioms: A and A^c are disjoint, and A \cup A^c = S, so P(A) + P(A^c) = P(S) = 1.
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Define conditional probability P(A|B)
The probability of A given B (when P(B) > 0):
P(A|B) = \frac{P(A \cap B)}{P(B)}
In the equally-likely case:
P(A|B) = \frac{|A \cap B|}{|B|}
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State the chain rule of probability for n events
P(A_1 \cap A_2 \cap \cdots \cap A_n) = P(A_1)\,P(A_2|A_1)\,P(A_3|A_1,A_2)\cdots P(A_n|A_1,A_2,\dots,A_{n-1})
Each factor conditions on all previously listed events.
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What conditions must hold for three events A, B, C to be independent?
All four conditions must hold:
P(A \cap B) = P(A)P(B)P(A \cap C) = P(A)P(C)P(B \cap C) = P(B)P(C)P(A \cap B \cap C) = P(A)P(B)P(C)
Pairwise independence alone is not sufficient.
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What does it mean for n events A_1, A_2, \dots, A_n to be independent?
Every subset of the events must satisfy the product rule. That is, for all i < j < k < \dots:
P(A_i \cap A_j) = P(A_i)P(A_j)
P(A_i \cap A_j \cap A_k) = P(A_i)P(A_j)P(A_k)
\vdots
P(A_1 \cap A_2 \cap \cdots \cap A_n) = \prod_{i=1}^n P(A_i)
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If A_1, A_2, \dots, A_n are independent, what is P(A_1 \cup A_2 \cup \cdots \cup A_n)?
P(A_1 \cup A_2 \cup \cdots \cup A_n) = 1 - \prod_{i=1}^n (1 - P(A_i))
Derived by taking the complement (none of the events occur) and using independence.
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What is the difference between disjoint and independent?
- Disjoint:
AandBcannot occur at the same time.A \cap B = \empty - Independent:
Adoes not give any information aboutB
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State the Law of Total Probability using event B and its complement
P(A) = P(A|B)\,P(B) + P(A|B^c)\,P(B^c)
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State the general Law of Total Probability for a partition of the sample space
If B_1, B_2, B_3, \dots is a partition of S, then for any event A:
P(A) = \sum_i P(A \cap B_i) = \sum_i P(A|B_i)\,P(B_i)
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State Bayes' Rule for two events A and B
For P(A) \neq 0:
P(B|A) = \frac{P(A|B)\,P(B)}{P(A)}
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State Bayes' Rule when B_1, B_2, \dots form a partition of S
For any event A with P(A) \neq 0:
P(B_j|A) = \frac{P(A|B_j)\,P(B_j)}{\displaystyle\sum_i P(A|B_i)\,P(B_i)}
The denominator expands P(A) via the Law of Total Probability.
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State the meaning of conditionally independent between events A and B given event C. Note P(C) \gt 0.
P(A \cap B \mid C) = P(A \mid C)P(B \mid C)
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State the multiplication rule for P(A \cap B)
P(A \cap B) = P(A|B)\,P(B) = P(B|A)\,P(A)
Rearrangement of the definition of conditional probability.