MATH176 Logarithmic and Exponential Function Complete discussion board questions for pre-calculus. I have attached the questions below. DS 1 1. What is a n

MATH176 Logarithmic and Exponential Function Complete discussion board questions for pre-calculus. I have attached the questions below. DS 1
1. What is a natural logarithm? How is it different from and similar to regular
logarithms? Provide examples for how natural logarithms appear in nature or in
natural science.
2. What are two applications of logarithmic and exponential functions in
science?
DS 2
What is the relationship between exponential and logarithmic functions? Include
examples.
DS 3
Graph two logarithmic functions with different bases and their corresponding
exponential functions. What are the similarities and differences in the graphs?
DS 4- Exponential Functions
1. Graph the function.
f ( x) = 2 x −1 + 1
2. Graph the function.
f ( x) = e x − 2
3. Find the accumulated value of an investment of $8500 if it is invested for 3
years at an interest rate of 4.25% and the money is compounded monthly.
4. Find the accumulated value of an investment of $1200 if it is invested for 6
years at an interest rate of 6% and the money is compounded continuously.
DS 5- Logarithmic Functions
1. Evaluate
log 27 9
2. Evaluate
6 log 6 15
3. Graph the function.
h( x) = log 2 ( x − 1)
4. Find the domain of
f ( x) = log 4 ( x + 2)
DS 6 – Exponential Functions
Let
R be the response time of some computer system,
U be the machine utilization (CPU),
S be the service time per transaction,
Q be the queue time (or wait time… pronounced as my last name, Kieu) and
a be the arrival rate (number of log-on users).
The total response time (excluding network delay) is the sum of queue time and
service time. Thus,
R=S+Q
(1)
Generally, the service time is predictable and relatively invariant. The time a
transaction spends in queue, however, varies with the transaction arrival rate a.
Assuming that the arrival and service processes are homogeneous (time-invariant),
the following is true:
R = SQ + S
(2)
According to Queuing Theory (Allen, 2014):
Q=a*R
(3)
Manipulating equations (2) and (3) using Factoring method, we obtain:
R=
S
1 − aS
(4)
1. Show how you manipulate the two equations (2) and (3) to arrive at (4).
2. Create a graph for (4), discuss observations, and make interpretations of this graph.
DS 7 Summary:
Week3
Exponential & Logarithmic Functions
Objectives/Competencies
3.1: Solve exponential and logarithmic functions.
3.2.Graph exponential and logarithmic functions.
3.3 Apply exponential and logarithmic functions to real world problems.
1. What do you think you have learned in Week 3? Math skills? Online
skills? Others?
2. What was the most useful and practical concept learned in Week 3 that
you can easily relate to your real life and/or work experience? Please
substantiate.

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