Product rule of logarithms

Product rule of logarithms

Basic Concepts: What is a logarithm?, Converting from logarithmic form to exponential form
Related Concepts: Logarithmic scale: Richter scale (earthquake), Logarithmic scale: pH scale, Logarithmic scale: dB scale

Lessons

logb(XY)=logbX+logbY \log_b(X \cdot Y) = \log_b X + \log_b Y
  • Introduction
    How and when to use the product rule:
    Without using a calculator, evaluate: log2(1632) {\log_2(16 \cdot 32)}
  • 1.
    log33+log327{\log_3 \sqrt{3} + \log_3 \sqrt{27}}
  • 2.
    Express as a single logarithm:
    a)
    log26+log25\log_2 6 + \log_2 5

    b)
    log3100+log65 \log_3 100 + \log_6 5\

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8.
Logarithmic Functions
8.1
What is a logarithm?
8.2
Converting from logarithmic form to exponential form
8.3
Evaluating logarithms without a calculator
8.4
Common logarithms
8.5
Natural log: ln
8.6
Evaluating logarithms using change-of-base formula
8.7
Converting from exponential form to logarithmic form
8.8
Solving exponential equations with logarithms
8.9
Product rule of logarithms
8.10
Quotient rule of logarithms
8.11
Combining product rule and quotient rule in logarithms
8.12
Evaluating logarithms using logarithm rules
8.13
Solving logarithmic equations
8.14
Graphing logarithmic functions
8.15
Finding a logarithmic function given its graph
Sixth Year Maths
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