Given that lim x l2 fsxd 4 lim x l2 tsxd 22 lim x l2 hsxd 0 find the limits that exist. If the limit does not exist, explain why. (a) lim xl 2 f fsxd 1 5tsxdg (b) lim xl 2 f tsxdg3 (c) lim xl2 sfsxd (d) lim xl 2 3fsxd tsxd (e) lim xl 2 tsxd hsxd (f) lim xl 2 tsxdhsxd
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Textbook Solutions for Biocalculus: Calculus for Life Sciences
Question
924 Evaluate the limit, if it exists. 9. lim xl 5 x 2 2 6x 1 5 x 2 5 10. lim xl 4 x 2 2 4x x 2 2 3x 2 4 11. lim xl 5 x 2 2 5x 1 6 x 2 5 12. lim xl21 2x 2 1 3x 1 1 x 2 2 2x 2 3 13. lim tl23 t 2 2 9 2t 2 1 7t 1 3 14. lim xl21 x 2 2 4x x 2 2 3x 2 4 15. lim hl0 s4 1 hd 2 2 16 h 16. lim hl 0 s2 1 hd 3 2 8 h 17. lim xl22 x 1 2 x 3 1 8 18. lim hl 0 s1 1 h 2 1 h 19. lim xl24 1 4 1 1 x 4 1 x 20. lim xl21 x 2 1 2x 1 1 x 4 2 1 21. lim xl16 4 2 sx 16x 2 x 2 22. lim tl 0 S 1 t 2 1 t 2 1 t D 23. lim tl0 S 1 ts1 1 t 2 1 t D 24. lim x
Solution
The first step in solving 2.4 problem number 9 trying to solve the problem we have to refer to the textbook question: 924 Evaluate the limit, if it exists. 9. lim xl 5 x 2 2 6x 1 5 x 2 5 10. lim xl 4 x 2 2 4x x 2 2 3x 2 4 11. lim xl 5 x 2 2 5x 1 6 x 2 5 12. lim xl21 2x 2 1 3x 1 1 x 2 2 2x 2 3 13. lim tl23 t 2 2 9 2t 2 1 7t 1 3 14. lim xl21 x 2 2 4x x 2 2 3x 2 4 15. lim hl0 s4 1 hd 2 2 16 h 16. lim hl 0 s2 1 hd 3 2 8 h 17. lim xl22 x 1 2 x 3 1 8 18. lim hl 0 s1 1 h 2 1 h 19. lim xl24 1 4 1 1 x 4 1 x 20. lim xl21 x 2 1 2x 1 1 x 4 2 1 21. lim xl16 4 2 sx 16x 2 x 2 22. lim tl 0 S 1 t 2 1 t 2 1 t D 23. lim tl0 S 1 ts1 1 t 2 1 t D 24. lim x
From the textbook chapter Limits: Algebraic Methods you will find a few key concepts needed to solve this.
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