- #1
mrs.malfoy
- 3
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A function f is said to be symmetrically continuous at X0 if
lim [f(X0 + h) - f(X0 - h)]= 0
h-> 0
Show that if f is continuous at X0, it is symmetrically continuous there but not conversely.
lim [f(X0 + h) - f(X0 - h)]= 0
h-> 0
Show that if f is continuous at X0, it is symmetrically continuous there but not conversely.