# Ch3-6WS - parametrically by y = sec t x = tan t< t< 2 2...

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Mrs. Waldron BC Calculus 604 Ch 3.6 Chain Rule Worksheet 1. a) x(t) = (3t -2) 3 (t-6) b) 2 5x y = (3x +4) 2. Find the derivatives of each of the following, given the table below. x f(x) g(x) f '(x) g '(x) 2 8 2 1/3 -3 3 3 -4 2 π 5 a) f(x)/g(x) at x = 2 b)f(g(x)) at x = 2 c) f (x) at x = 2 d) 2 1 g (x) at x = 2 e) 2 2 f (x) + g (x) at x = 3

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3. Find the line tangent to the right-hand hyperbola branch defined
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Unformatted text preview: parametrically by: y = sec t, x = tan t < t < 2 2 π π-at the point ( ) 1, 2 where t = 4 π . 4. Find the following derivatives: a) ( ) 1 y = csc(x) + cot(x)-b) 3 4 y = x (2x - 5) c) y = 4 sec x + tan x d) 2 x y = 1 + x f) r = sec 2x tan 2x 5. Find the equation of the line tangent to the curve at the point given: x = t – sin t, y = 1 – cos t, t = 3 π...
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## This note was uploaded on 02/16/2012 for the course CALCULUS 0064 taught by Professor Waldron during the Fall '10 term at Broward College.

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Ch3-6WS - parametrically by y = sec t x = tan t< t< 2 2...

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