$\forall \epsilon > 0, \exists \delta > 0, |x-a| < \delta \Rightarrow |f(x)-f(a)| < \epsilon$ önermesinin olumsuzu aşağıdakilerden hangisidir?
A) $\exists \epsilon > 0, \forall \delta > 0, |x-a| < \delta \Rightarrow |f(x)-f(a)| \geq \epsilon$
B) $\exists \epsilon > 0, \forall \delta > 0, |x-a| < \delta \land |f(x)-f(a)| \geq \epsilon$
C) $\exists \epsilon > 0, \forall \delta > 0, |x-a| < \delta \Rightarrow |f(x)-f(a)| > \epsilon$
D) $\exists \epsilon > 0, \forall \delta > 0, |x-a| < \delta \land |f(x)-f(a)| < \epsilon$
