4.1 - 4.2: Basic rules for derivatives The Basic Derivative Rules (using Leibniz notation): a) Derivative of a constant: d c= dx b) Derivative of a power xn (n is any real number, may or may not be an integer): d n x = dx c) Derivative of ex : d x e = dx d) Derivative of a constant times a function: d (cf (x)) = dx e) Derivative of lnx: d lnx = dx f) Derivative of sum or difference: d (f (x) ± g(x)) = dx g) Derivative of a product of two functions d (f (x)g(x)) = dx h) Derivative of a quotion of two functions d dx f (x) g(x) Example 1. Find the derivatives of: a) e. 4 b) x 5 c) 3ex d) ex lnx 1 = e) √ x − x2 f ) x2 e x g) lnx −x x3 h) ex x2 + 1 i) x3 x+2 u2 eu j) 2u + 1 2 Example 2. Find the equation of the tangent line to the graph of f (x) = x+5 x at the point where x = 1. Example 3. Find the point on the graph of f (x) = x2 − 3x + 2 such that the tangent line of the graph at that point is: 1. horizontal 2. parallel to the line y = 2x − 1 3. perpendicular to the line y = 2x − 1 Example 4. The position of a ball is governed by the equation s(t) = 2t3 + t2 − 7t + 3, where t in seconds and s in meters. a) Calculate the velocity of the ball at time t 3 b) Compute the ball’s velocity after 5 s c) When is the ball at rest (v(t) = 0)? Marginal Analysis Definition: If C(x), R(x), and P (x) are the cost, revenue, and profit functions, respectively, then the instantaneous rate of change i.e. derivatives C 0 (x), R0 (x), and P 0 (x) are the marginal cost, marginal revenue, and marginal profit. 4 Example 5. In order to produce x units, a company cost C(x) = 20, 000 + 7x + 0.5x2 . a) Calculate the marginal cost function b) When 2000 units are produced, find the marginal cost c) Compute the cost of producing 2001 units 5