Sec 3.6: DERIVATIVES OF LOGARITHMIC FUNCTIONS

Sec 3.6: DERIVATIVES OF LOGARITHMIC FUNCTIONS Example:

Sec 3.6: DERIVATIVES OF LOGARITHMIC FUNCTIONS Example:

Sec 3.6: DERIVATIVES OF LOGARITHMIC FUNCTIONS Example: Example:

Sec 3.6: DERIVATIVES OF LOGARITHMIC FUNCTIONS Prop: Example:

Sec 3.6: DERIVATIVES OF LOGARITHMIC FUNCTIONS Example:

Sec 3.6: DERIVATIVES OF LOGARITHMIC FUNCTIONS Example:

Sec 3.6: DERIVATIVES OF LOGARITHMIC FUNCTIONS The calculation of derivatives of complicated functions involving products, quotients, or powers can often be simplified by taking logarithms. The method used in the following example is called logarithmic differentiation.

Sec 3.6: DERIVATIVES OF LOGARITHMIC FUNCTIONS Example: If variables appear in the base and in the exponent : logarithmic differentiation can be used in this case

Sec 3.6: DERIVATIVES OF LOGARITHMIC FUNCTIONS THE NUMBER e AS A LIMIT Example:

Sec 3.6: DERIVATIVES OF LOGARITHMIC FUNCTIONS

Sec 3.6: DERIVATIVES OF LOGARITHMIC FUNCTIONS