{[ promptMessage ]}

Bookmark it

{[ promptMessage ]}

13144 Filled notes

# 13144 Filled notes - 2 4 2 3 x x x x f-= Rule 5 The...

This preview shows pages 1–3. Sign up to view the full content.

Lesson 4 – Basic Rules of Differentiation 1 Lesson 4 Basic Rules of Differentiation We can use the limit definition of the derivative to find the derivative of every function, but it isn’t always convenient. Fortunately, there are some rules for finding derivatives which will make this easier. First, a bit of notation: [ ] ) ( x f dx d is a notation that means “the derivative of f with respect to x , evaluated at x .” Rule 1: The Derivative of a Constant [ ] , 0 = c dx d where c is a constant. Example 1: If , 17 ) ( - = x f find ) ( ' x f . Rule 2: The Power Rule [ ] 1 - = n n nx x dx d for any real number n Example 2: If , ) ( 5 x x f = find ) ( ' x f . Example 3: If x x f = ) ( , find ) ( ' x f . Example 4: If , 1 ) ( 3 x x f = find ) ( ' x f .

This preview has intentionally blurred sections. Sign up to view the full version.

View Full Document
Lesson 4 – Basic Rules of Differentiation 2 Rule 3: Derivative of a Constant Multiple of a Function [ ] [ ] ) ( ) ( x f dx d c x cf dx d = where c is any real number Example 5: If , 3 ) ( 4 x x f - = find ) ( ' x f . Example 6: If , 5 ) ( 3 2 x x f = find ) ( ' x f . Rule 4: The Sum/Difference Rule [ ] [ ] [ ] ) ( ) ( ) ( ) ( x g dx d x f dx d x g x f dx d ± = ± Example 7: Find the derivative: . 7
This is the end of the preview. Sign up to access the rest of the document.

Unformatted text preview: 2 4 ) ( 2 3 x x x x f +--= Rule 5: The Derivative of the Exponential Function [ ] x x e e dx d = Example 8: Find the derivative: x e x x x f 6 2 4 3 ) ( 3 3 +-+ = Lesson 4 – Basic Rules of Differentiation 3 Rule 6: The Derivative of an Exponential Function (base is not e ) [ ] ( 29 x x a a a dx d ⋅ = ln Example 9: Find the derivative: x x f 4 ) ( = Rule 7: The Derivative of the Logarithmic Function [ ] x x dx d 1 | | ln = , provided ≠ x Example 10: Find the derivative: ) ln( 6 2 5 ) ( x x x f +--= Example 11: Find the derivative: x x x x x f 9 6 ) ( 2 10-+-= Example 12: Let 2 3 3 4 2 3 ) ( x x x f-= . Find ) ( ' f and ) 64 ( ' f . From this lesson, you should be able to State the basic rules for finding derivatives Select the appropriate rule to use for a given problem Find the derivative of a function using the basic rules...
View Full Document

{[ snackBarMessage ]}

### Page1 / 3

13144 Filled notes - 2 4 2 3 x x x x f-= Rule 5 The...

This preview shows document pages 1 - 3. Sign up to view the full document.

View Full Document
Ask a homework question - tutors are online