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☆☆☆☆☆the first is "all statement" and the second is " existential statement"
if i dont not like carrots then i do not like vegetables
if its September its your birthday
If the conditional (if, then) is true, then the contrapositive (reversed; if not, then not) will be also true. And vice versa, if the conditional is false, its contrapositive will be also false. for example,
If a graph passes the vertical line test, then it is a graph of a function. (True)
If a graph is not a graph of a function, then it will not pass the vertical line test. (True)
Yes, but only if the original if-then was true.
The converse of the statement "If it is summer, then it is warm outside' would be if it is warm outside then it is summer.
If I do not like Math then I do not like Science.
A conclusion provided by deductive reasoning
In a two-column proof, it is true that the left column states your reasons.
What must be true
The vertex is the point at which the two lines or rays meet.
y -> x
It is True!
It's Figure A
The answer is false
True. In that case, each of the statements is said to be the contrapositive of the other.
Figure B
Converse: If p r then p q and q rContrapositive: If not p r then not (p q and q r) = If not p r then not p q or not q r
Inverse: If not p q and q r then not p r = If not p q or not q r then not p r
A syllogism- apex
(apex) its 110
