Did this video help you?
Laws & Change of Base (Edexcel International AS Maths: Pure 2)
Revision Note
Laws of Logarithms
What are the laws of logarithms?
- There are many laws or rules of indices, for example
- am x an = am+n
- (am)n = amn
- There are equivalent laws of logarithms (for a > 0)
- There are also some particular results these lead to
- Two of these were seen in the notes Logarithmic Functions
- Beware …
- … log (x + y) ≠ log x + log y
How do I use the laws of logarithms?
- Laws of logarithms can be used to …
- … simplify expressions
- … solve logarithmic equations
- … solve exponential equations
Examiner Tip
- Remember to check whether your solutions are valid. log (x+k) is only defined if x > -k. You will lose marks if you forget to reject invalid solutions.
Worked example
Did this video help you?
Change of Base
What is the change of base formula?
- We can rewrite a logarithm as a multiple of a logarithm of any different positive base using the formula
What is the use of the change of base formula?
- This formula had more use when calculators were less advanced
- Some old calculators only had a button for logarithm of base 10
- To calculate on these calculators you would have to enter
- The formula is only needed in a small number of cases
- This is given in the formulae booklet in case it is needed
- The formula can be useful when evaluation a logarithm where the two numbers are powers of a common number
- The formula can be useful when you are solving equations and two logarithms have different bases
- For example, if you have and within the same equation
- You can rewrite as which simplifies to
- Or you can rewrite as which simplifies to
- For example, if you have and within the same equation
- The formula also allows you to derive and use a formula for switching the numbers:
-
- Using the fact that
Examiner Tip
- It is very rare that you will need to use the change of base formula
- Only use it when the bases of the logarithms are different
You've read 0 of your 5 free revision notes this week
Sign up now. It’s free!
Did this page help you?