Mutual Independence for 3 events

AI Thread Summary
To prove that events A and (B intersection C) are mutually independent, it is essential to understand the distinction between the two expressions. A and (B intersection C) represent two separate events, while A union (B intersection C) describes a single event. The concept of independence applies only to the relationship between two or more events, making the first statement relevant for analysis. Clarity in the definitions of A, B, and C is crucial for establishing their independence. Understanding these fundamentals is key to addressing the question effectively.
madness26
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how do i prove that A and (B intersection C) are mutually independent?
first of all how do i even read that question, is it read: A union (B intersection C) ??
 
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madness26 said:
how do i prove that A and (B intersection C) are mutually independent?
first of all how do i even read that question, is it read: A union (B intersection C) ??

To start with you need to know something about A, B, and C.

A and (B intersection C)
describes two events.
A union (B intersection C)
describes one event.

The notion of independence is meaningful only when discussing two or more events. Therefore only the first statement is meaningful.
 

Thread 'Formal derivation of statement from Peano Arithmetic system'

I was reading a Bachelor thesis on Peano Arithmetic (PA). PA has the following axioms (not including the induction schema): $$\begin{align} & (A1) ~~~~ \forall x \neg (x + 1 = 0) \nonumber \\ & (A2) ~~~~ \forall xy (x + 1 =y + 1 \to x = y) \nonumber \\ & (A3) ~~~~ \forall x (x + 0 = x) \nonumber \\ & (A4) ~~~~ \forall xy (x + (y +1) = (x + y ) + 1) \nonumber \\ & (A5) ~~~~ \forall x (x \cdot 0 = 0) \nonumber \\ & (A6) ~~~~ \forall xy (x \cdot (y + 1) = (x \cdot y) + x) \nonumber...
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