Warm Up 10/3/13 1) The graph of the derivative of f, f ’, is given. Which of the following statements is true about f? (A) f is decreasing for -1 < x <

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Warm Up 10/3/13 1) The graph of the derivative of f, f ’, is given. Which of the following statements is true about f? (A) f is decreasing for -1 < x < 1. (B) f is increasing for -2 < x < 0. (C) f is increasing for 1 < x < 2 (D) f has a local minimum at x = 0 (E) f is not differentiable at x = -1 and x = 1. 2) If the line tangent to the graph of the function f at the point (1, 7) passes through the point (-2,-2) then f ’ (1) is (A) -5 (B) 1(C) 3(D) 7(E) undefined 3) Let g be a twice differentiable function with g ’ (x) > 0 and g ” (x) > 0 for all real numbers x, such that g(4) = 12 and g(5) = 18. Of the following, which is a possible value for g(6)? (A) 15(B) 18(C) 21(D) 24(E) 27 4) The function f is continuous for -2 < x < 1 and differentiable for -2 < x < 1. If f(-2) = -5 and f(1) = 4, which of the following statements could be false? (A) There exists c, where -2 < c < 1, such that f(c) = 0 (B) There exists c, where -2 < c < 1, such that f ’ (c) = 0 (C) There exists c, where -2 < c < 1, such that f(c) = 3 (D) There exists c, where -2 < c < 1, such that f ’ (c) = 3 (E) There exists c, where -2 f(x) for all x on the closed interval [-2, 1]. CALCULATOR ACTIVE 5) A particle moves along the x-axis so that at any time t > 0, its velocity is given by v(t) = cos(0.9t). What is the acceleration of the particle at time t = 4?

Explicit vs. Implicit Implicit y + x 2 = 3 Explicit y = -x Solved for y y as a function of x Not Solved for y

Derivative will be written as Example: Determine for y 2 + xy + 3x = 9

Determine y’ for the equation:

Your Turn Determine y’ for the equation x 2 y – y 2 x = 3x

Let y 3 x + y 2 x 2 = 6 1.Confirm that the point (2,1) is a point on the curve. 2.Find the slope of the curve at the point (2,1). Is the graph increasing or decreasing at that point? Explain. 3.Write an equation of the tangent line to the curve at the point (2,1) 4.Write an equation of the normal line to the curve at the point (2,1)

Let x 2 (x 2 + y 2 ) = 10 1.Confirm that the point (-1,3) is a point on the curve. 2.Find the slope of the curve at the point (-1,3). Determine whether the graph is increasing or decreasing at the point. 3.Write an equation of the tangent line to the curve at the point (-1,3) 4.Write an equation of the normal line to the curve at the point (-1,3) YOUR TURN

The second derivative is written Example: Determine for y 2 + x 2 = 25 Your Turn x 2 – y 2 = 9