f(x) is a positive increasing function ⇒0<f(x)<f(2x)<f(3x)⇒0<1<f(x)f(2x)<f(x)f(3x)⇒x→∞lim1≤x→∞limf(x)f(2x)≤x→∞limf(x)f(3x) By sandwich theorem. ⇒x→∞limf(x)f(2x)=1
Let f:R→R be a positive increasing function with x→∞limf(x)f(3x)=1. Then x→∞limf(x)f(2x)=
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