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22 Jun 2013, 02:12
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B
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
35%
(medium)
Question Stats:
69% (01:41) correct
31%
(01:56)
wrong
based on 1374
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A. \(\sqrt{x^2+ 1}\)< 3
B. |2x - 3| < 5
C. |x + 1| > -1
D. x - 2 < 2
E. |x - 1| < 4
How to solve this question without plugging in values?
22 Jun 2013, 03:17
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From the diagram we know that \(-1<x<4\).
A. \(\sqrt{x^2+ 1}< 3\) --> square the inequality (we can do this since both sides are non-negative): \(x^2+1<9\) --> \(x^2<8\) --> \(-2\sqrt{2}<x<2\sqrt{2}\).
B. |2x - 3| < 5 --> \(-5<2x - 3<5\) --> add 3 to each part: \(-2<2x<8\) --> reduce by 2: \(-1<x<4\). BINGO!
C. |x + 1| > -1. No need to test this one. The absolute value is always more than or equal to zero, thus this inequality holds for any value of x.
D. x - 2 < 2 --> \(x<4\).
E. |x - 1| < 4 --> \(-4<x - 1<4\) --> add 1 to each part: \(-3<x<5\).
Answer: B.
Does this make sense?
22 Jun 2013, 03:03
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No need to plug here , from the shaded region we know that -1<x<4 so all you have to do is to check the answer choices whether they match with the given inequality
l 2x-3 l< 5 means that -5 < 2x - 3 < 5
--> -2 < 2x < 8
--> -1 < x < 4
Answer : B
l 2x-3 l< 5 means that -5 < 2x - 3 < 5
--> -2 < 2x < 8
--> -1 < x < 4
Answer : B
