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oblique assymptotes (1 Viewer)

maths lover

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well im doing some work on oblique asymptotes and wondering if these have any:

  • (X^2+4)/(X-1)
  • ((x^2-1)+5)/(x-1)
  • (x+1)+5/(x-1) this one has one i think y=x+1
 

SpiralFlex

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If the degree of the power of the numerator is 1 above the degree of the denominator. Also, yes they all have oblique asymptotes, you can also find oblique asymptotes by division for the first two.
 
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maths lover

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If the degree of the power of the numerator is 1 above the degree of the denominator. Also, yes they all have oblique asymptotes, you can also find oblique asymptotes by division.
what do you mean by division
 

Deep Blue

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Say you have a function,

f(x) = g(x) + { c / h(x) } where f(x) is your function, g(x) is your oblique asymptote as h(x) goes to infinity and c is the arbitrary constant. In your above examples you need to use the division transformation first. That is the case for a linear oblique asymptote. I don't think you do anything more difficult than that in 3 unit, unless of course you have posted in the wrong section.
 

xV1P3R

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Long divide the top by the bottom to get a whole polynomial number and a fraction. Your non-fraction is then your oblique asymptote.
 

deterministic

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Just divide each term in the numerator and denominator by the highest power of x in the denominator, cancel out any term that goes to 0 as x goes to infinity (ie. anything with powers of x in the denominator after cancellation). Anything left over will be your asymptote. If there is x left over, then it is oblique.

Eg.

hence x-1 is your oblique asymptote
 

cutemouse

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If y=ax+b is an oblique asymptote to the curve y=f(x) then

 

cutemouse

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Just divide each term in the numerator and denominator by the highest power of x in the denominator, cancel out any term that goes to 0 as x goes to infinity (ie. anything with powers of x in the denominator after cancellation). Anything left over will be your asymptote. If there is x left over, then it is oblique.

Eg.

hence x-1 is your oblique asymptote
What about , which has an oblique asymptote y=x+1?
 

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