The set of real values of x satisfying log12(x2−6x+12)≥−2 is
A
(−∞,2]
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B
[2,4]
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C
[4,+∞]
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D
Noneofthese
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Solution
The correct option is B[2,4] log12(x2−6x+12)≥−2 ...(i)
For log to be defined, x2−6x+12>0 ⇒(x−3)2+3>0, which is true ∀xϵR.
From (i), x2−6x+12≤(12)−2 ⇒x2−6x+12≤4⇒x2−6x+8≤0⇒(x−2)(x−4)≤0⇒2≤x≤4;∴xϵ[2,4].