5 Must Know Facts For Your Next Test

1. When solving exponential equations, rewrite both sides of the equation with a common base.
2. Common bases frequently used include 2, e (Euler's number), and 10.
3. Logarithmic equations can often be simplified by converting terms to a common base.
4. Having a common base allows the use of properties like $a^m = a^n \Rightarrow m = n$ to solve equations.
5. In some cases, you may need to use logarithms to find the common base if it isn't immediately apparent.

Review Questions

• How do you simplify $2^{3x} = 8$ using a common base?
• What property allows you to set exponents equal when working with a common base?
• Explain how using a common base can simplify the process of solving logarithmic equations.

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