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if A then B (original) if not A then not B (inverse)
B is between A and C.
If a b = 0, then either a = 0 or b = 0, or both.
A therefore B A is true Therefore B is true Logically..... A is true A is false Therefore B is false
There are different ways of writing a pseudocode statement but the concept remains, it can be presented: /*Declare variables Total (number (3)) = 0 A (number (2)) =10 B (number (2)) =14 begin Total=A+B end
if a is true, then b must be true
A mathematical statement of the form if A then B would be a conditional statement.
A conditional statement.
B and C only..........plato users only
[object Object]
A conditional statement.
b
A conditional statement
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The conditional statement "If A then B" is equivalent to "Not B or A" So, the inverse of "If A then B" is the inverse of "Not B or A" which is "Not not B and not A", that is "B and not A",
It is what you get in an inference, after negating both sides. That is, if you have a statement such as: if a then b the inverse of this statement is: if not a then not b Note that the inverse is NOT equivalent to the original statement.
It is a statement of succession.