8.3 – Logarithmic Functions and Inverses

What is a logarithm? A logarithm is the power to which a number must be raised in order to get some other number For example, the base ten logarithm of 100 is 2, because ten raised to the power of two is 100: 100 = 102 because log 10100 = 2

Convert

Remember: If y = bx then logby = x Ex: Write the following equations in logarithmic form Remember: If y = bx then logby = x If 25 = 52 then Log525=2 If 729 = 36 then Log3729=6 If 1 = 100 then Log101=0 If then

Let’s try some: Converting between the two forms. Expo Form Log Form

Common Logs A common log is a logarithm that uses base 10. You can write the common logarithm log10y as log y (they are the logs you use on your calculator, with no base shown it = 10) Scientists use common logarithms to measure acidity, which increases as the concentration of hydrogen ions in a substance. The pH of a substance equals

Evaluating Logarithms Ex: Evaluate log816 Log816=x Write an equation in log form 16 = 8x Convert to exponential form 24 = (23)x Rewrite using the same base. In this case, base of 2 24 = 23x Power of exponents 4 = 3x Set the exponents equal to each other x=4/3 Solve for x Therefore, Log816=4/3

Evaluating Logarithms Ex: Evaluate Write an equation in log form Convert to exponential form Rewrite using the same base. In this case, base of 2. Use negative expos! -5 = 6x Set the exponents equal to each other x=-5/6 Solve for x Therefore,

Let’s try some Evaluate the following: