Concept explainers
a.
To give conclusion of the given limit.
a.
Explanation of Solution
Given:
Conclusion:
If
If p (c) =0 it could be cancel the factor of a polynomial of p (x)
With a factor of a polynomial q (x) and a resulting rational function
has no limit at x = c
b.
To give conclusion of the given limit.
b.
Explanation of Solution
Given:
Conclusion:
If
If p (c) =1 it could be cancel the factor of a polynomial of p (x)
With a factor of a polynomial q (x) and a resulting rational function
has finite limit.
c.
To give conclusion of the given limit
c.
Explanation of Solution
Given:
Conclusion:
If
Limit does not exist because 0 in the denominator results undefined.
d.
To give conclusion of the given limit
d.
Explanation of Solution
Given:
..
Conclusion:
If
If f (x) is a rational function where p (x) and q (x) are polynomials with q (c) =0 and
p (c) = 0 we can cancel the factor of a polynomial of p (x) With a factor of a polynomial
q (x) and a resulting rational function has no limit at x = c
Chapter 11 Solutions
PRECALCULUS W/LIMITS:GRAPH.APPROACH(HS)
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