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Describing the behaviour of a function? (1 Viewer)

sadpwner

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Describe the behaviour of f(x)=1+ (1/x) as x tends to positive and negative infinity.

I am assuming the answer is: As x->infinity y->1 and as x->-infinity y->1

Is this correct?

Also, describe the behaviour of the function f(x)=1+ (1/x) around x=0.

Not sure about this one.
There isn't a wealth of information regarding this so wondering if anyone can help.
 

seventhroot

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So using limits, you're on the right track

So what happens when x gets arbitrarily large? The function approaches 1+ likewise when x gets arbitrary large for negative values the function approaches 1-. We can see that y = 1 is a horizontal asympote because f(x) can never equal 1

Furthermore, at x = 0; there is a vertical asympote because x can also never equal zero. If we take a left hand limit, we can see that the function tends towards negative infinity conversely if we take the right hand limit, f(x) approaches positive infinity
 

integral95

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HSC maths doesn't even teach the concept of 2 sided limits.........
 

braintic

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Definitely 2U
It has never been tested in a 2U HSC exam beyond horizontal asymptotes. And those graphs are just hyperbolae that are learned in the functions topic before the idea of limits is taught.
 

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