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  1. [14K]Suppose that \(f:(0,1]→ℝ\) is a continuous function. Prove that, it is bounded from above 1 if and only if \(\limsup _{xβ†’ 0+}f(x){\lt}+∞\).

  1. i.e. there exists \(cβˆˆβ„\) such that \(βˆ€ {x∈(0,1]}\) you have \(f(x){\lt}c\)
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