von David Kedrowski Vor 14 Jahren
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p. 65
Use when rational limits with radicals have the form 0/0 after direct substitution.
The expression 0/0 is indeterminate.
Theorem 1.7 allows this method to work.
Use when rational limits have the form 0/0 after direct substitution.
The expression 0/0 is indeterminate.
Think "simplify."
Theorem 1.7 allows this method to work.
Learn to recognize which limits can be evaluated by direct substitution (Theorems 1.1-1.6).
If the limit of f(x) as x approaches c cannot be evaluated by direct substitution, try to find a function g that agrees with f for all x other than x=c. [Choose g such that the limit of g(x) can be evaluated by direct substitution.]
Apply Theorem 1.7 to conclude analytically that your choice of g works.
Use a graph or table to reinforce your conclusion.
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Epsilon-Delta definition of limit
Dirichlet function
The existence or nonexistence of f(x) at x=c has no bearing on the existence of the limit of f(x) as x approaches c.
Does the graph show a large irregularity of some sort?
Use a table of values that approach the value of interest from both sides.