Implications In Mathematical Logic
Two statements p and q can be made into one new statement of compound sentences into the form "if p then q". New statements arranged in this way are either implied statements or conditional / conditional statements of p and q statements. The "if p" part is called the reason or cause (antecedent / hypothesis) and the "then q" is called conclution or consequence (conclusion or consequence).
Information:
p → q reads "if p then q"
p : It's a cloudy day
q : Now it will rain
p → q: If it's cloudy now it will rain
Information :
T : True
F : False/wrong
Similarly this article.
Sorry if there is a wrong word.
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Referensi :
Formula of Implications
p → q
Information:
p → q reads "if p then q"
Examples of Implications in Mathematical Logic
q : Now it will rain
p → q: If it's cloudy now it will rain
Truth Table of Implications
The value of the truth of the implication statement is determined by the truth value of each component not by the relationship of the two sole statements. The value of truth implication is as follows:The implication p → q is false if p is true and q is wrong, in other probability p → q is true.
Information :
T : True
F : False/wrong
Similarly this article.
Sorry if there is a wrong word.
The end of word wassalamualaikum wr. wb
Referensi :
- To'Ali's book math group accounting and sales
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