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Explain the self-inflicted form for the statement.

Vidyadip · Accepted Answer

Statement of Self-Disruptive Statement: The form for the statement which is always untrue is called 'Self-disruptive form for statement'.
Form of self-defeating statement: $p\ \&\ \sim\ p$
$P\ \&\ \sim\ p$ form truth table

Column Sequence $\rightarrow$	$1$	$2$	$૩$
Row Sequence $\downarrow$	$p$	$\sim p$	$p\ \& \sim\ p$
$1$	$T$	$F$	$F$
$2$	$F$	$T$	$F$
		$1 ( \sim )$	$1, 2 (\&)$

$p\ \&\ \sim\ p$ is a self-defeating form of statement $($substitutionary statements may be related to the past, present or future, as well as to a variety of subjects.$)$ But their true value is always untrue.
We will see the various parables of $p\ \&\ \sim\ p$ and the realization of their true values from the following table:

Sr. No.	Replacement statements of $p\ \&\ \sim\ p$	Replication of statements	The veracity of the statements
$1$	Jawaharlal Nehru of India Matham was the Prime Minister. $($Truth$)$ and Jawaharlal Nehru was the first head of India There were no ministers. $($False$)$	$J\ \&\ \sim\ J$	False
$2$	Keshubhai is American. $($False$)$ and Keshubhai Not American. $($Truth$)$	$K\ \&\ \sim\ K$	False

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