event B has something in common with event A
event B has something in common with event A
event B has something in common with event A
Event B has something in common with Event A.
the probabilty of both events is true. but which is most reliable is probabilty of B as it is more near to 1( total probabilty of any event)
The probability of event A occurring given event B has occurred is an example of conditional probability.
event B has something in common with event A
event B has something in common with event A
Event B has something in common with Event A.
Not necessarily. It will all depend on the statements A and B.
Unconditional statements are statements that are invoked unconditionally. Conditional statements have a controlling expression, while unconditional statements do not. For example: void f (bool b) { if (b==true) do_something(); // conditional statement (controlled by the expression b==true) do_something_else(); // unconditional (executes regardless of b's value) }
the probabilty of both events is true. but which is most reliable is probabilty of B as it is more near to 1( total probabilty of any event)
Circular logic would be a statement or series of statements that are true because of another statement, which is true because of the first. For example, statement A is true because statement B is true. Statement B is true because statement A is true
All of those statements are true. There is no exception.
If you mean straight line equation: y = mx+b then m is the slope and b is the y intercept
Unfortunately, not having the full statements will make this more difficult to answer. (A) is False; (B) is True; (C) is Imcomplete and therefore could be true or false.
Answer this question… Event 1 has a connection to Event 2.
There is a dual for every Boolean operation. For example the dual of (a AND b) is not(not A or not B). The first says TRUE if a and b are both TRUE. The second says that FALSE if a is FALSE or b is FALSE. Both statements are equivalent. This equivalency is also referred to by DeMorgan's Theorem.