Question 2 [10] Let {fn (2)} be a sequence of continuous complex functions defined on D C C and f(z) be a complex function defined on D. Prove by e-N definition that if fn(z) converges uniformly to f(z) on compacts in D, then the limiting function f is also continuous. 0₁0. fn 3 f for z For every Z in K E > = N(6) € ₁ s.t. Unz N₁ | fn (2) - f(z)] < 1/10 N= . in any compact sets K≤p. @fn 75 20, 2 820 sit.lzx]<8>lfe)-f(x)]<- continuons for z in D. For every z, & in D. VE>O, we choose the above N and f if Iz-*|< 8, then s.t | f(2)= f(a)| = |f₁z) - fn(z) + tn (2) - fn(x) + fn(x) – frasl ≤ | fn(z) - f1z)| + | fn(²2) - fn(x) |+| fricas) _flox) | = D E 1/4 + 1/3+1/²/3 = 3 =.E.