MHT CET · Maths · Mathematical Reasoning
Negation of a statement 'If \(\forall x, x\) is a complex number then \(x^2<0\) ' is
- A \(\exists x, x\) is not a complex number and \(x^2 \geq 0\)
- B \(\exists x, x\) is not a complex number and \(x^2<0\)
- C \(\forall x, x\) is not a complex number and \(x^2 \geq 0\)
- D \(\forall \mathrm{x}, \mathrm{x}\) is not a complex number and \(\mathrm{x}^2<0\)
Answer & Solution
Correct Answer
(C) \(\forall x, x\) is not a complex number and \(x^2 \geq 0\)
Step-by-step Solution
Detailed explanation
\(\because\) Negation of 'if \(p\) then \(q\) ' is ' \(p\) and not q'.
Hence the required negation is
\(\forall x, x\) is a complex number and \(x^2 \geq 0\)
Hence the required negation is
\(\forall x, x\) is a complex number and \(x^2 \geq 0\)
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