Let a,b,c be the sides of a triangle where a≠b≠c and λϵR.If the roots of the equation x2+2(a+b+c)x+3λ(ab+bc+ca)=0 are real. then
A
λ<43
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B
λ<53
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C
λϵ(13,53)
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D
λϵ(43,53)
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Solution
The correct option is Aλ<43 ∴ a, b, c are sides of a triangle and a≠b≠c∴|a−b|<|c|⇒a2+b2−2ab<c2 Similarly, we have a2+c2−2bc<a2;c2+a2−2ca<b2 On adding, we get a2+b2+c2<2(ab+bc+ca)⇒a2+b2+c2ab+bc+ca<2...(1)∴ Roots of the given equation are real ∴(a+b+c)2−3λ(ab+bc+ca)≥0⇒a2+b2+c2ab+bc+ca≥3λ−2...(2)