Curve Sketching Limits with Infinity Asymptotes

1. Curve SketchingLimits with InfinityAsymptotes Lesson 4.4

2. To infinity and beyond … What Happens? • We wish to investigate what happens when functions go …

3. Limits with Infinity • What happens to a function in the long run N1

4. Rules for Manipulating Limits • Note rules on page 218 • Note special limits n is a positive rational number k > 0

5. go to zero Manipulating, Evaluating • Symbolically • Use Calculatorlimit((x+2)/((3x-5),x,+) • Graph and observe

6. Rational Functions • Leading terms dominate • m = n => limit = an/bm • m > n => limit = 0 • m < n => asymptote linear diagonal or higher power polynomial

7. Rational Functions • Vertical asymptotes • where denominator = 0 • Y-intercepts • where x = 0 • X-intercepts • where numerator = 0

8. Example • Find • horizontal asymptote • vertical asymptote(s) • zeros • y-intercept

9. Example • Find • horizontal asymptote • vertical asymptote(s) • zeros • y-intercept

10. Finding Other Asymptotes • Use PropFrac to get • If power of numerator is larger by two • result of PropFrac is quadratic • asymptote is a parabola

11. Example • Consider • Propfrac gives

12. Example • Note the parabolic asymptote

13. Vertical Tangents • Consider a function continuous at P(c, f(c)) • Vertical tangent at P ifare either both c

14. Cusp • Again, consider a function continuous at P(c, f(c)) • A cusp exists whenare both infinite and opposite in sign

15. Assignment • Lesson 4.4 • Page 227 • Exercises 5 – 47 odd