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Can someone help to know how to do horizontal asymptote please?!??

User PhillFox
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2 Answers

6 votes
6 votes

Answer:

See Explanation

Explanation:

In a rational equation, horizontal asymptotes are based on the highest degree of the polynomials on the numerator and denominator.

If it is top-heavy (higher degree on the numerator), then there is no asymptote.

Ex:
(x^(6) +4)/(x^(3) +3). The degree of the numerator is 6 and the denominator degree is 3; 6>3, so no asymptote.

If it is bottom-heavy (higher degree on denominator), then the x-axis (y=0) is the horizontal asymptote.

Ex:
(x^(2)+x+5 )/(x^(5)-3). The highest degree of the numerator is 2 vs the highest degree of 5 on the denominator. Thus, the equation is bottom-heavy and the asymptote is at 0.

If the degrees are the same, you take the coefficient of the variables with the highest degrees and then divide.

Ex.
(6x^(2)-3x+1)/(2x^(2)+3). Take the coefficients of the x^2 (which is the highest degree variable). You should get 6 and 2. And then divide them in order to get:

y=6/2 = 3

User Lucatrv
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3.1k points
16 votes
16 votes

Answer:

The horizontal asymptote of a rational function can be determined by looking at the degrees of the numerator and denominator.

Degree of numerator is less than degree of denominator: horizontal asymptote at y = 0.

Degree of numerator is greater than degree of denominator by one: no horizontal asymptote; slant asymptote.

Can someone help to know how to do horizontal asymptote please?!??-example-1
Can someone help to know how to do horizontal asymptote please?!??-example-2
User Santosh Anand
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3.2k points