Exam 2 Practice 1

# Exam 2 Practice 1 - f x x = 13 f t ′ for 1 2 sin f t t =...

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MORE PRACTICE. Find the indicated derivative in each case. You should try to simplify your answers if you can. Try quotient rule on problems 1, 10, 17, and 18. 1. ( ) f t for 3 ( ) 1 t f t t = + 2. ( ) f x for 2 3 1 ( ) x f x x + = 3. dz dx for 3 4 ( 1) (5 ) z x x = + - 4. ( ) f m for 1 ( ) sec(2 ) f m m = 5. ( ) f x ′′ for 5 ( ) 3 2 x f x x = 6. ( ) f ′ Γ for 6 ( ) 1 f β Γ + Γ Γ = - 7. dy dt for 3 ln(ln(2 )) y t = 8. ( ) g x for ( ) x g x x e = 9. ( ) x r for 3 ( ) 3 3 3 x r r r r = + - +

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10. ( ) h y for ln ( ) 1 ln y h y y = - 11. dz dm for 2 log(10 ) m z = 12. ( ) f x for 2 ( ) sinh( 1)
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Unformatted text preview: f x x = + 13. ( ) f t ′ for 1 2 ( ) sin f t t- = 14. ( ) g θ ′ for 2 ( ) 3 tan (4 ) g = + 15. ( ) f x ′ for ( 29 3 ( ) cos 1 f x x x = + 16. dy du for (cot1 cot ) y u π = + 17. ( ) g z ′ for 2 2 ( ) az e g z a z = + 18. ( ) f x ′ for ( 29 2 3 ( ) 2 ax f x x =-19. ( ) a t ′ for 4 1 cos ( ) ln 1 cos t a t t- = +...
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## This note was uploaded on 04/02/2008 for the course MATH 124 taught by Professor Kennedy during the Spring '08 term at Arizona.

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Exam 2 Practice 1 - f x x = 13 f t ′ for 1 2 sin f t t =...

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