# tra09 - CALCULUS Trancedental Functions. Higher Derivatives...

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Unformatted text preview: CALCULUS Trancedental Functions. Higher Derivatives 1. Find f ( x ), f 00 ( x ), f 000 ( x ), and f (4) ( x ) for the following function: f ( x ) =- 2 sin(- 3 x ) 2. Find f ( x ), f 00 ( x ), f 000 ( x ), and f (4) ( x ) for the following function: f ( x ) =- 5 log(- 5 x ) 3. Find f ( x ), f 00 ( x ), f 000 ( x ), and f (4) ( x ) for the following function: f ( x ) =- 4 cos(4 x ) 4. Find f ( x ), f 00 ( x ), f 000 ( x ), and f (4) ( x ) for the following function: f ( x ) = 2 ln(- 2 x ) 5. Find f ( x ), f 00 ( x ), f 000 ( x ), and f (4) ( x ) for the following function: f ( x ) =- 5 log(- x ) 6. Find f ( x ), f 00 ( x ), f 000 ( x ), and f (4) ( x ) for the following function: f ( x ) =- 5 cos(- 4 x ) 7. Find f ( x ), f 00 ( x ), f 000 ( x ), and f (4) ( x ) for the following function: f ( x ) =- 3 (4)- 4 x 8. Find f ( x ), f 00 ( x ), f 000 ( x ), and f (4) ( x ) for the following function: f ( x ) = 2(10)- 3 x 9. Find f ( x ), f 00 ( x ), f 000 ( x ), and f (4) ( x ) for the following function: f ( x ) = 5 log 2 (4 x ) 10. Find f ( x ), f 00 ( x ), f 000 ( x ), and f (4) ( x ) for the following function: f ( x ) = 4 (3)- x A n s w e r s : 1 . f ( x ) = 6 c o s (- 3 x ) f ( x ) = 1 8 s in (- 3 x ) f ( x ) =- 5 4 c o s (- 3 x )...
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## This note was uploaded on 04/11/2011 for the course MATH 1400 taught by Professor Grether during the Fall '08 term at North Texas.

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tra09 - CALCULUS Trancedental Functions. Higher Derivatives...

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