Exam 3: Differentiation Rules

If $f ( x ) = 2 e ^ { x } - 3 x ^ { e } + \sqrt { e }$ , find $f ^ { \prime } ( x )$ .

The quantity q of Zeng Athletic Shoes which are sold depends on the selling price p. [That is, q = f(p).] (a) If you know that f (150) = 14,000, what can you say about the sale of these shoes? (b) If you know that $f ^ { \prime } ( 150 ) = - 100$ , what does that tell you about the sale of these shoes? (c) The total revenue, R, earned through the sale of Zeng shoes is given by $R = p \cdot q$ . Find $\frac { d R } { d p } \text { when } p = 150$ (d) Suppose that the shoes are currently priced at $150. What effect will lowering the price likely have on the total revenue? Justify your answer.

Let $F ( x ) = \sin ( g ( x ) )$ where g is differentiable. Find $F ^ { \prime } ( x )$

Find the point where the tangent to the curve $y = x \sqrt { 3 - x }$ has zero slope.

If $f ( x ) = 1 / x ^ { 2 }$ , find $f ^ { \prime \prime } ( 1 )$ .

Consider the curve given by $x = t ^ { 2 } + 3 , y = 2 t ^ { 3 } - t$ Find $\frac { d ^ { 2 } y } { d x ^ { 2 } }$ at the point corresponding to $t = 2$

Given $f ( 3 ) = 5 , f ^ { \prime } ( 3 ) = 1.1 , g ( 3 ) = - 4 \text { and } g ^ { \prime } ( 3 ) = 0.7 \text {, find the value of } ( f \cdot g ) ^ { \prime } ( 3 ) \text {. }$

Show that the curves $3 x ^ { 2 } + 2 x - 3 y ^ { 2 } = 1$ and $6 x y + 2 y = 0$ are orthogonal.

There are two lines passing through the point (1, 0) tangent to the parabola $y ^ { 2 } + 4 x = 0$ . Find their equations.

Find the derivative of $f ( t ) = \frac { t ^ { 3 } + 3 } { t }$ .

Find the value of the limit $\lim _ { x \rightarrow 0 } \frac { \sin x } { 2 x }$ .

Suppose that u and v are differentiable functions and that $w = u \circ v$ and $u ( 0 ) = 1 ,$ $v ( 0 ) = 2$ $u ^ { \prime } ( 0 ) = 3 , u ^ { \prime } ( 2 ) = 4 , v ^ { \prime } ( 0 ) = 5 , v ^ { \prime } ( 2 ) = 6$ Find $w ^ { \prime } ( 0 )$

If $f ( x ) = \sqrt { 3 x }$ , find $f ^ { \prime } ( 3 )$

Find the derivative of $f ( x ) = \sqrt { 9 x }$ .

Profit (in dollars) for a company when x units of a certain product are produced is given by $P ( x ) = ( 100 - x ) \ln x$ when x > 1.(a) What is the marginal profit (the derivative of the profit function)? (b) If the current production level is x = 15, is the profit increasing or decreasing? (c) If the current production level is x = 40, is the profit increasing or decreasing? (d) At approximately what production level does the profit function reach its maximum value? What is the maximum profit?

Suppose you are given a function f where $f ( 4 ) = 5 , f ^ { \prime } ( 4 ) = - 2 \text { and } f ^ { \prime \prime } ( 4 ) = 3 \text {. If } F ( x ) = \sqrt { x } f ( x )$ determine: (a) $F ^ { \prime } ( 4 )$ (b) $F ^ { \prime \prime } ( 4 )$

Let $f ( x ) = \log _ { 2 } x$ . Find the value of $f ^ { \prime } ( 1 )$ .

Given $f ( x ) = \frac { x - 4 } { x - 1 }$ , find an equation of the line(s) tangent to the graph of $y = f ( x )$ and parallel to $y - 3 x + 7 = 0$ .

The position of a particle moving along the x-axis is given by $x = 0.08 \sin ( 12 t + 0.3 )$ meters, where t is measured in seconds.(a) Determine the position, velocity, and acceleration of the particle when t = 0.65.(b) Show that the acceleration of the particle is proportional to its position, but in the opposite direction.

Let $f ( x ) = e ^ { - x ^ { 2 } }$ Find the value of $f ^ { \prime \prime } ( 1 )$