Definition 4.6.4. Let (S,d) and (T , p) be metric spaces and f : S → T a given function. We say fis continuous at e e S provided for any E> 0, there exists a ô > 0 such that f (Ba(c, 6)) C B, (f(c), €). We use the notation B, and Ba to ensure there is no confusion between the open balls defined by the metrics p and d, respectively. Suppose (A, r) and (D, t) are metric spaces. Let g : D→ A Using Definition 4.6.4 as a guide, write out what it means for g to be continuous at c e D. Your sentence should start `gis continuous at c € D provided.

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**Definition 4.6.4.** Let \((S, d)\) and \((T, \rho)\) be metric spaces and \(f : S \to T\) a given function. We say \(f\) is continuous at \(c \in S\) provided for any \(\epsilon > 0\), there exists a \(\delta > 0\) such that \( f\left( B_d(c, \delta) \right) \subseteq B_\rho \left( f(c), \epsilon \right) \). We use the notation \(B_\rho\) and \(B_d\) to ensure there is no confusion between the open balls defined by the metrics \(\rho\) and \(d\), respectively. --- **Exercise:** Suppose \((A, r)\) and \((D, t)\) are metric spaces. Let \(g : D \to A\). Using Definition 4.6.4 as a guide, write out what it means for \(g\) to be continuous at \(c \in D\). Your sentence should start "g is continuous at c in D provided.....''.