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B
(−∞,−1)∪(−1,2]
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C
[2,∞)
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D
(−∞,−1)∪(1,2)
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Solution
The correct option is B(−∞,−1)∪(−1,2] 2x2−x+1−1x+1≥2x−1x3+1 ⇒2x2−x+1−1x+1−2x−1x3+1≥0 ⇒x2−x−2(x+1)(x2−x+1)≤0 ⇒(x+1)(x−2)(x+1)(x2−x+1)≤0 ⇒x−2x2−x+1≤0, where x≠−1
x2−x+1>0 as D=1−4=−3<0
Hence, x−2≤0⇒x≤2 ∴x∈(−∞,−1)∪(−1,2]