Set of all possible real values of a such that the inequality $(x-(a-1))(x-(a^2+2))<0$ holds for all $x$ belongs to $(1,3)$ needs to be found. I tried by putting $x=2$ in the inequality, but nothing good resulted. I thought I would get the idea but it was not that easy. Help me with it with any new idea and explain the mistake in mine.
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Notice that $a^2+2 \ge a-1$ and $a^2+2$ and $a-1$ are the roots. We want $(1,3) \subseteq (a-1, a^2+2)$.
Hence we want $ a-1 \le 1 $ and $a^2+2 \ge 3$.
Siong Thye Goh
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X belongs to (1,3) – user532267 Feb 17 '18 at 19:10
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1sorry, I think wrongly just now. updated my guide. – Siong Thye Goh Feb 17 '18 at 19:19