The statement p rarr(q rarr p) is equiv...

The statement `p rarr(q rarr p)` is equivalent to

`p rarr(p ^^ q)`

`p rarr (p harr q)`

`p rarr(p rarr q)`

`p rarr(p vv q)`

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p harr q is logically equivalent to

Let p be the statement ''x is an irrational number'', q be the statement'' y is a transcendental number'' and r be the statement'' x is a rational number iff y is a transcendental number.'' Statement-1 : r is equivalent to either q or p Statement-2 : r is equivalent to ~(p iff~q) .

P ^^ (q ^^ r) is logically equivalent to

The negation of p ^^(q rarr ~r) is

Statement-1 : ~(p iff~q) is equivalent to p iffq Statement-2 : ~(p iff~q) is tautology.

The negation of p rarr (~ p vv q) is

The proposition (p rarr ~ p) ^^(~ p rarr p) is a

Negation of the statement p t (q ^^ r) is

If p and q be two statement, then the conditional statement prarrq is false, when :

~ [(~p) ^^q] is logically equivalent to

HIMALAYA PUBLICATION-MATHEMATICAL REASONING-Question Bank

The contrapositive of the inverse of p rarr ~q is
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The converse of the contrapositive p rarr q is
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The negation of q vv ~(p ^^ r) is
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The proposition (p rarr ~ p) ^^(~ p rarr p) is a
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(p ^^ ~ q) ^^(~ p vv q) is
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The negation of the proposition"If 2 is prime then 3 is odd" is
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The incorrect statement is
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The converse of the contrapositive of the conditional p rarr ~q is
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The negation of p ^^(q rarr ~r) is
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Which of the following is not true?
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The negation of p rarr (~ p vv q) is
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The inverse of the proposition (p ^^ ~q) to r is
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The negation of the proposition " If a quadrilateral is a square then ...
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The contrapositive of the statement "if x^{2}-1=q 0 then x=q-1 or (x=q...
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It is not true that "Roses are yellow implies violets are green" The ~...
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p harr q is logically equivalent to
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Let S be a non-empty subset of R . Consider the following statement P:...
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The statement p rarr(q rarr p) is equivalent to
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Which of the following statements is a tautology?
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~(p vv q) vv(~ p ^^ q) is logically equivalent to
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