roadrage75
Member
- Joined
- Feb 20, 2007
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- HSC
- 2007
The function f has domain R and it is continuous at the point 0.
It satifisfies the condition: f(x+y) = f(x) + f(y). Prove f is contintinuous at point a, for all real a.
im lost as to what to do! i've worked out, and i think im right, that f(0) must = 0, but apart from that i'm stuck.
I have tried implicitly differentiating both sides, which did get me an answer, but somehow, i don't think i'm supposed to do it that way. Any ideas?
It satifisfies the condition: f(x+y) = f(x) + f(y). Prove f is contintinuous at point a, for all real a.
im lost as to what to do! i've worked out, and i think im right, that f(0) must = 0, but apart from that i'm stuck.
I have tried implicitly differentiating both sides, which did get me an answer, but somehow, i don't think i'm supposed to do it that way. Any ideas?
