How do you find the limit of #|x-7|/(x-7) # as x approaches 7?

1 Answer
George C.
Jun 24, 2016

The left and right limits disagree, so there is no limit as #x->7#

Explanation:

If #x > 7# then #abs(x-7)/(x-7) = (x-7)/(x-7) = 1#

If #x < 7# then #abs(x-7)/(x-7) = (-(x-7))/(x-7) = -1#

Hence:

#lim_(x->7^+) abs(x-7)/(x-7) = 1#

#lim_(x->7^-) abs(x-7)/(x-7) = -1#

Since the right and left limits are unequal, there is no two sided limit at #x=7#.

graph{abs(x-7)/(x-7) [4.24, 9.79, -1.266, 1.508]}

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