• 00:00 Introduction
• 00:18 \(\log_b(x\cdot y)=\log_b(x)+log_b(y)\) Log of a product property. 
• 00:45 \(\log(4)+\log(3)=\log(12)\) example of using the Log of a product property
• 01:30 \(\log_2 (12)=\log_2(3)+\log_2(4)\) example using Log of a product property
• 02:00 \(\log_b(x/y)=\log_b(x)-\log_b(y)\)
• 02:47 \(\log(100)-\log(20)=\log(5)\) example of using Log of quotients property.
• 03:30 \(\log_b(x)^y=y\cdot \log_b(x)\)Log of a power property
• 03:48 \(\log_3(9)^4=4\cdot \log_3(9)\) example of Log of a power property
• 04:50 \(\log_b(b)^x=x\) Log property when the base and argument are the same
• 05:12 \(\log_3(3)^2=2\) example of Log when the base and argument are the same
• 05:25 \(\log(10)^3=3\) example of common Log when the base and argument are the same
• 05:49 \(\log_2(2)=1\) example of when the base and argument are the same with a power of 1 implied.
• 06:10 Using \(\log(2)=.3 \) to find the log(4) example using properties of logs
• 08:25 Rewrite \(\log_4(6x+4)-\log_4(2)\) as a single expression example of using Log properties to simplify a logarithmic expression

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