Statement - I : (p ^^ ~ q) ^^ (~ p ^^ q)...

Statement - I : `(p ^^ ~ q) ^^ (~ p ^^ q)` is a fallacy.
Statement - II : `(p rarr q) harr (~q rarr ~ p)` is a tautology.

Statement - I is true, statement-II is false

Statement - I is false, Statement - II is true.

Statement - I is true, Statement - II is true, Statement - II is a correct explanation for Statement - I

Statement-I is true, Statement-II is true, Statement-II is not a correct explanation for statement-I

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(p ^^ ~q) ^^ (~p vv q) is

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Observe the following statements : Statements - I : (p vv q) ^^ (~p ^^ ~q) is a contradiction. Statement - II : A statement pattern is called a contradiction, it it is a always false, whatever may the truth values of its consitutes statements.

Observe the following statements Statement - I : p vv ~(p ^^ q) is a tautology Statement - II : A statement pattern is called a tautology, if it is always true, whatever may be the true value of constitute statements.

The statement ~(p ^^ q) vv q

Let p and q be any two propositons Statement 1 : (p rarr q) harr q vv ~p is a tautology Statement 2 : ~(~p ^^ q) ^^ (p vv q) harr p is fallacy

The statement ~(p harr ~q) is

Statement -1 : ~(P harr ~q) is equivalent to p harr q Statement - 2 : ~(P harr ~q) is a tautology.

DIPTI PUBLICATION ( AP EAMET)-MATHEMATICAL REASONING [APPENDIX - 4]-Exercise

The truth table of (~q) rArr~ p is
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The truth table of (~p) ^^ q rArr p is
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The truth table of p vv (~q) rArr p is
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The truth table of p vv (~q) rArr p is
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The truth table of (~p) vv q rArr p is
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p v (~p) is
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p ^^ (~p) is
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p ^^ (~q) rArr p is
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p rArr p vv q is
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(p rArr q) ^^ (q rArr r) rArr (p rArr r) is
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[(~p) rArr p] ^^ [p rArr (~p)] is
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(~q) ^^ p ^^ (p rArr q) is
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(p rArr q) rarr [(r vv p) rArr (r vv q)] is
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(p rArr q) rarr [(r vv p) rArr (r vv q)] is
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[p ^^ (~ q)] ^^ [(~p) vv q] is
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p rArr p' is
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The statement ~(p harr ~q) is
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Statement - I : (p ^^ ~ q) ^^ (~ p ^^ q) is a fallacy. Statement - ...
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Which of the following is the universal quantifier ?
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Which of the following is the existential quantifier ?
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Statement - I : `(p ^^ ~ q) ^^ (~ p ^^ q)` is a fallacy. Statement - II : `(p rarr q) harr (~q rarr ~ p)` is a tautology.

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DIPTI PUBLICATION ( AP EAMET)-MATHEMATICAL REASONING [APPENDIX - 4]-Exercise

Statement - I : `(p ^^ ~ q) ^^ (~ p ^^ q)` is a fallacy.
Statement - II : `(p rarr q) harr (~q rarr ~ p)` is a tautology.