![PDF) Α-Compact Spaces and Firmly Α-Continuous Functions * | Saeid Jafari and Md. Hanif Page - Academia.edu PDF) Α-Compact Spaces and Firmly Α-Continuous Functions * | Saeid Jafari and Md. Hanif Page - Academia.edu](https://0.academia-photos.com/attachment_thumbnails/43726002/mini_magick20190215-13846-hriygk.png?1550268809)
PDF) Α-Compact Spaces and Firmly Α-Continuous Functions * | Saeid Jafari and Md. Hanif Page - Academia.edu
![real analysis - Understanding the proof of if $f$ is continuous on a compact set $K$ then $f$ is uniformly continuous on $K$ - Mathematics Stack Exchange real analysis - Understanding the proof of if $f$ is continuous on a compact set $K$ then $f$ is uniformly continuous on $K$ - Mathematics Stack Exchange](https://i.stack.imgur.com/y1uy7.png)
real analysis - Understanding the proof of if $f$ is continuous on a compact set $K$ then $f$ is uniformly continuous on $K$ - Mathematics Stack Exchange
Uniform approximation of continuous functions on compact sets by biharmonic and bisuperharmonic functions in a biharmonic space
![SOLVED: a) Let f:X,dâ†'X,d be a continuous function and let K ⊆ X be a compact set. Prove that f(K) is compact. [4 marks] b) Give an example of a function f:X,dâ†'X2,d SOLVED: a) Let f:X,dâ†'X,d be a continuous function and let K ⊆ X be a compact set. Prove that f(K) is compact. [4 marks] b) Give an example of a function f:X,dâ†'X2,d](https://cdn.numerade.com/ask_images/a47561e69fe7427dadeb8ed42a6e37f4.jpg)
SOLVED: a) Let f:X,dâ†'X,d be a continuous function and let K ⊆ X be a compact set. Prove that f(K) is compact. [4 marks] b) Give an example of a function f:X,dâ†'X2,d
![SOLVED: We know that a continuous function defined over a compact set in R^k is uniformly continuous (see Corollary Class Notes 14). Show that f(c) = 2 Vi € R; NOT uniformly SOLVED: We know that a continuous function defined over a compact set in R^k is uniformly continuous (see Corollary Class Notes 14). Show that f(c) = 2 Vi € R; NOT uniformly](https://cdn.numerade.com/ask_images/a8c4bfc6d58640b1a70c5ccf708cd43c.jpg)
SOLVED: We know that a continuous function defined over a compact set in R^k is uniformly continuous (see Corollary Class Notes 14). Show that f(c) = 2 Vi € R; NOT uniformly
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