PROBLEM 01
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(1 point) Given that limx→af(x)=0, limx→ag(x)=0, limx→ah(x)=1, limx→ap(x)=∞, limx→aq(x)=∞. Which of the following limits are indeterminate forms? For those that are not an indeterminate form, evaluate the limit where possible. Enter I to indicate an indeterminate form, INF for positive infinity, NINF for negative infinity, and D for the limit does not exist or we don't have enough information to determine the limit. (a) limx→a[f(x)]g(x)= (b) limx→a[f(x)]p(x)= (c) limx→a[h(x)]p(x)= (d) limx→a[p(x)]f(x)= (e) limx→a[p(x)]q(x)= (f) limx→ap(x)−−−−√q(x)= |
PROBLEM 02
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4.4: Problem 2 |
PROBLEM 03
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(1 point) Find the limit. Use l'Hospital's Rule if appropriate. Use INF to represent positive infinity, NINF for negative infinity, and D for the limit does not exist. limx→15lnx−5x−1= You have attempted this problem 1 time. |
PROBLEM 04
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1 point) limx→0+x5sin(x)
Answer:
You have attempted this problem 2 times. |
PROBLEM 05
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(1 point) limx→∞(1+3x)x11
You have attempted this problem 1 time. |
PROBLEM 06
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(1 point) Find the following limits, using l'Hopital's rule if appropriate limx→0+x√4ln(x) = Note: You can earn partial credit on this problem. You have attempted this problem 2 times. |
PROBLEM 07
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(1 point) Compute limx⟶0(cosx)1/x2= You have attempted this problem 1 time. |
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張旭微積分上下學期線上課程 |
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