Continuity of a discrete function

peeyush_ali
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given a function F(x) = 1 ,x=1
2 ,x=2
3 ,x=3


The above function is a 3 pointed graph. it is continuous . Is it just because every point has a specific value..please someone explain this..??
 
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peeyush_ali said:
given a function F(x) = 1 ,x=1
2 ,x=2
3 ,x=3The above function is a 3 pointed graph. it is continuous . Is it just because every point has a specific value..please someone explain this..??
That function is not continuous, at least not on the reals (it is however, continuous on the integers in the range [1,3]).
 
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Generally, when you talk about a continuous function, you can imagine a graph of the function being drawn with a single curve. In your case, it jumps from integer values, so it would be discontinuous in real space.

I believe the term for the function you have is generally referred to as ``piecewise continuous.''
 
It might be pointwise equal to a continuous function but, since it is not stated, no conclusion can be drawn.
 
Any function with a discrete domain is continuous on its domain, since you have defined the function on a discrete domain, it is mathematically correct to say that the function is continuous everywhere in its domain.
 
Civilized said:
Any function with a discrete domain is continuous on its domain, since you have defined the function on a discrete domain, it is mathematically correct to say that the function is continuous everywhere in its domain.

Civilized is right. On the domain {1,2,3}, the function is continuous. It isn't even defined on other domains, so you can't make a determination of its continuity on the other domains.
Fenn said:
Generally, when you talk about a continuous function, you can imagine a graph of the function being drawn with a single curve. In your case, it jumps from integer values, so it would be discontinuous in real space.

I believe the term for the function you have is generally referred to as ``piecewise continuous.''

This is true for the simple cases, but not always. For example see the http://en.wikipedia.org/wiki/Cantor_function" . Also, the function defined is not piecewise continuous, but is continuous as mentioned above.
 
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Civilized said:
Any function with a discrete domain is continuous on its domain, since you have defined the function on a discrete domain, it is mathematically correct to say that the function is continuous everywhere in its domain.

u are right.. civilized
 
Hootenanny said:
That function is not continuous, at least not on the reals (it is however, continuous on the integers in the range [1,3]).

continuity exists in the function just because the function value is mapped in its domain (in this case "specifically...")
 

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