Olson Reese
01/29/2024 · Senior High School
11. Sia data la funzione \( f \), derivabile in \( \mathbb{R} \), tale che \( f(0)=-5, f^{\prime}(0)=-4 \). Allora \( g(x)=|f(x)| \) a) \( g(x) \) presenta un punto angoloso in \( x=0 \) b) \( P(0,5) \in g(x) \) e \( g^{\prime}(0)=-4 \) c) \( g \) è derivabile in \( x=0 \) e \( g^{\prime}(0)=4 \) d) \( g \) è derivabile in \( x=0 \) e \( g^{\prime}(0)=-4 \) e) \( \lim _{x \rightarrow 0^{-}} g^{\prime}(x)=-4 ; \lim _{x \rightarrow 0^{+}} g^{\prime}(x)=4 \)
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\( g \) è derivabile in \( x=0 \) e \( g^{\prime}(0)=4 \).
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