CH#4: Necessary and Sufficient Conditions
conditional arguments: 2 main premise and conclusion
1.) one premise wil state a necessary or sufficient condition 2.) the other premise will affirm or deny on of the condiitons
sufficient condition
A is enough for B to happen, if we know A we know enough to know B, relationship can be explained in terms of cause: A is enough for B to happen knowledge: if we know A we know enough to know B truth: if A is true, B must also be true
all and only statements
ALL signals a sufficent condition for example: all basket ball players are tall ONLY signals a necessary condition for example: only women are biological mothers
counterexample
a counter example shows that the statement is false for example: counterexample to "all basketball players are tall" Michael Jordan is a famous basketball player and is not tall.
good conditional arguments
affirms the sufficient condition: modus ponen= P then Q, P, therefore Q deny's the necessary condition: modus tollens= P then Q, not Q, therefor not P P= SUFFICIENT Q=NECESSARY
deductive arguments
arguments in which if the premises are true, the conclusion must also be true, true in all possible worlds these are valid sound argument
both necessary and sufficient
conditions that are both necessary and sufficient are expressed by using if and only if, this relation holds only when we have what is basically a definition
bad conditional arguments
deny the sufficient condition and affirm the necessary condition
negations
if a then b= if not a then not b if not a then b= if not b then a if a then not b= if b then not a
if.. then statements
if= the antecedent which signals a sufficient condition then= the consequent which signal a necessary condition
only if statements
introduces a necessary condition example= elvis is still alive only if jim morrison is still alive, jim morrision being alive is necessary for elvis being alive
a condition can be....
necessary or sufficient
unless statements
not A unless B= B is necessary for A A unless B= B is necessary for not A
testing conditional arguments for validity
rule 1: affirm the sufficient rule 2: deny's the necessary
conditional statements
we often have to state that one thing is a condition for another, for example: being at least 16 years old is a condition for being a licensed driver
necessary condition
x is required for y, if x is not true y is not true
