Unit 7: Limits




          2.   Find the following limit if it exists. Specify any horizontal or vertical asymptotes of the  Notes
               graph of the function.



          Solution

               As x    – , cos x keeps ocillating between 1 and –1, so cos  x keeps oscillating between
                                                               2
                             2
               0 and 1, thus cos  x + 1 keeps oscillating between 1 and 2. Consequently,
                                                           2
               doesn’t exist. There are no horizontal asymptotes. As cos  x + 1 is defined everywhere, there

               are no vertical asymptotes.
          3.   Let

               Determine:




               Specify horizontal and vertical asymptotes if any.
          Solution
                           2
               As x    , cos  x + 1 keeps oscillating between 1 and 2. So:



               Also:



               Thus        doesn’t exist.

               The horizontal asymptote is the x­axis. The vertical asymptote is the y­axis.

          4.   Let

               Determine:




               Specify horizontal and vertical asymptotes if any.
          Solution










               When x   –7+, we have 2x – 1   –15 < 0 and x + 7   0 and x + 7 > 0, so:










                                           LOVELY PROFESSIONAL UNIVERSITY                                   207