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Question
assignment 3.5a
pre-calculus assignment: graphing log functions
graph the following. include 2 key points, and their coordinates. draw the vertical asymptote and an equation for the asymptote.
- $f(x)=\log_3(x-2)$
- $y=\log_2 x -1$
- $y=3+\log_2 x$
- $f(x)=\frac{1}{2}\ln x$
- $f(x)=\frac{1}{2}\log(x-1)-2$
- $f(x)=5-2\log(x+1)$
find each of the following without using a calculator.
- $\ln e =$
- $\log_5 1 =$
- $\log_6 4 =$
convert to logarithmic form.
- $e^3=t$
- $8^t=x$
- $e^x=7.3891$
convert to exponential form.
- $\log_5 5=1$
- $\log 7=0.845$
First Set: Evaluate Logarithms (No Calculator)
Step1: Use $\ln e=1$ property
$\ln e = 1$ (by definition, $\log_b b=1$)
Step2: Use $\log_b 1=0$ property
$\log_5 1 = 0$ (by definition, $\log_b 1=0$)
Step3: Rewrite $\log_6 4$ as change of base
$\log_6 4 = \frac{\ln 4}{\ln 6}$ (change of base formula $\log_b a=\frac{\ln a}{\ln b}$)
Step1: Exponential to logarithmic ($b^y=x\to\log_b x=y$)
For $e^3=t$: $\ln t = 3$
Step2: Exponential to logarithmic ($b^y=x\to\log_b x=y$)
For $8^t=x$: $\log_8 x = t$
Step3: Logarithmic to exponential ($\log_b x=y\to b^y=x$)
For $e^z=7.3891$: $\ln 7.3891 = z$
Step4: Logarithmic to exponential ($\log_b x=y\to b^y=x$)
For $\log_5 5=1$: $5^1 = 5$
Step5: Logarithmic to exponential ($\log_b x=y\to b^y=x$)
For $\log_7 7=0.845$: $7^{0.845} = 7$
For each function, identify the vertical asymptote (where the argument of the log is 0), find 2 key points by substituting $x$-values, and state the function equation.
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