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Infinite Limits and Limits to Infinity: Horizontal and Vertical Asymptotes.

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Presentation on theme: "Infinite Limits and Limits to Infinity: Horizontal and Vertical Asymptotes."— Presentation transcript:

1 Infinite Limits and Limits to Infinity: Horizontal and Vertical Asymptotes

2 Recall… The notation tells us how the limit fails to exist by denoting the unbounded behavior of f(x) as x approaches c. Infinity is not a number!

3 Properties of Infinite Limits Let c and L be real numbers and let f and g be functions such that and 1.Sum or difference: Consider:

4 Properties of Infinite Limits Let c and L be real numbers and let f and g be functions such that and 1.Product: if L > 0 if L < 0 Consider:

5 Properties of Infinite Limits Let c and L be real numbers and let f and g be functions such that and 1.Quotient: Consider:

6 Definition - Vertical Asymptotes If f(x) approaches infinity (or negative infinity) as x approaches c from the left or the right, then the line x = c is a vertical asymptote of the graph of f. vertical asymptote

7 Determining Infinite Limits

8 The pattern… Is c even or odd? Sign of p(x) when x = c oddpositive oddnegative evenpositive evennegative and c is a positive integer

9 Using the pattern…

10

11 Limits at Infinity denotes that as x increases without bound, the function value approaches L L can have a numerical value, or the limit can be infinite if f(x) increases (decreases) without bound as x increases without bound

12 Horizontal Asymptotes The line y = L is a horizontal asymptote of f if or Notice that a function can have at most two HORIZONTAL asymptotes (Why?)

13 0 0 Horizontal Asymptote(s):__________

14 Note: It IS possible for a graph to cross its horizontal asymptote!!!!!! 2 2 Horizontal Asymptote(s):__________

15 0 1

16 0 0

17 Theorem – Limits at Infinity 1.If r is a positive rational number and c is any real number, then The second limit is valid only if x r is defined when x < 0 0 0 0 0

18 Using the Theorem 00 2 0 0

19 Guidelines for Finding Limits at ±∞ of Rational Functions 1.If the degree of the numerator is ___________ the degree of the denominator, then the limit of the rational function is ___. 2.If the degree of the numerator is _______ the degree of the denominator, then the limit of the rational function is the __________________ _______________________. 3.If the degree of the numerator is ___________ the degree of the denominator, then the limit of the rational function _______________. greater than 0 less than equal to the ratio of the leading coefficients is infinite

20 Using the Guidelines… 0 2 1313 ∞

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