Each question in this section has four choices (a), (b), (c) and (d...

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Each question in this section has four choices (a), (b), (c) and (d) out of which only one is correct. Mark your choices as follows:
(a) STATEMENT-1 is True, STATEMENT-2 is True; STATEMENT-2 is a correct explanation for STATEMENT-1
(b) STATEMENT-1 is True, STATEMENT-2 is True; STATEMENT-2 is NOT a correct explanation for STATEMENT-1
(c) STATEMENT-1 is True, STATEMENT-2 is False
(d) STATEMENT-1 is False, STATEMENT-2 is True
Statement-1: Let \( p0 \) and \( \alpha_{1}, \alpha_{2}, \ldots, \alpha_{9} \) be the nine roots of \( x^{9}=p \), then
\[
\Delta=\left|\begin{array}{lll}
\alpha_{1} & \alpha_{2} & \alpha_{3} \\
\alpha_{4} & \alpha_{5} & \alpha_{6} \\
\alpha_{7} & \alpha_{8} & \alpha_{9}
\end{array}\right|=0
\]
Statement-2: If two rows of a determinant are identical, then determinant equals zero.
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