log3(log7(8−log2(x2+4x+5)))>0log2(x2+4x+5)<1x2+4x+3<0⇒x∈(−3,−1)−1≤x−27x+10≤1⇒x∈[−2,−1]α=−3,β=−1,γ=−2,δ=−1α2+β2+γ2+δ2=15 option (1)
Let the domains of the functions
f(x)=log4log3log7(8−log2(x2+4x+5)) and g(x)=sin−1(x−27x+10) be (α,β) and [γ,δ], respectively. Then α2+β2+γ2+δ2 is equal to :-
Held on 4 Apr 2025 · Verified 6 Jul 2026.
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