Let p: ‘It is hot’ and q: ‘It is raining’. The verbal statement for ( p^ ~q)->p is
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Answer:
It is hot and it is not raining then it is hot....
Step-by-step explanation:
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The verbal statement for ( p^ ~q)->p is
If it is hot and not raining, then it is hot
Explanation:
- The opposite of the given mathematical statement is the negation of a statement in mathematics. If "P" is a statement, then "P" is the statement's negation.
- Two propositions, also known as simple assertions, are linked by the AND operator to form a particular type of compound statement known as a conjunction.
- The AND or logical conjunction operator is represented by the symbol "color red Large wedge." It has the appearance of a reversed V.
- A logical implication connective or operator is used to unite two simple statements to create a complex statement known as an implication (also known as a conditional statement).
- The logical implication operator is represented by an arrow moving right.
Therefore,
^ means and
~ means not
-> means if then
So, ( p^ ~q)->p is If it is hot and not raining, then it is hot
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