Evaluate and simplify y'.
y = 4u²+u / 8u+1

{Use of Tech} The Witch of Agnesi The graph of y = a³ / (x² + a²) , where a is a constant, is called the witch of Agnesi (named after the 18th-century Italian mathematician Maria Agnesi).

Let a = 3 and find an equation of the line tangent to y = 27 / (x² + 9) at x = 2.

Derivative calculations Evaluate the derivative of the following functions at the given point.

f(t) = 1/t+1; a=1

Evaluate dy/dx and dy/dx|x=2 if y= x+1/x+2

21–30. Derivatives

b. Evaluate f'(a) for the given values of a.

f(x) = 1/x+1; a = -1/2;5

Tangent lines Suppose f(2)=2 and f′(2) =3. Let g(x) = x²f(x) and h(x) = f(x) / x−3.

b. Find an equation of the line tangent to y = h(x) at x=2.

Given that f(1)=2 and f′(1)=2 , find the slope of the curve y=xf(x) at the point (1, 2).

Find the derivative the following ways:

Using the Product Rule or the Quotient Rule. Simplify your result.

f(x) = x(x-1)

Find the derivative the following ways:

Using the Product Rule or the Quotient Rule. Simplify your result.

g(t) = (t + 1)(t² - t + 1)

Find the derivative the following ways:

Using the Product Rule or the Quotient Rule. Simplify your result.

f(x) = (x - 1)(3x + 4)

Find the derivative the following ways:

Using the Product Rule or the Quotient Rule. Simplify your result.

h(z) = (z³ + 4z² + z)(z - 1)

First and second derivatives Find f′(x),f′′(x).

f(x) = x/x+2

Derivatives from a table Use the following table to find the given derivatives. <IMAGE>

d/dx (f(x)g(x)) |x=1

Derivatives from graphs Use the figure to find the following derivatives. <IMAGE>

d/dx (f(x)g(x)) | x=4

Derivatives from graphs Use the figure to find the following derivatives. <IMAGE>

d/dx (xg(x)) | x=2

The line tangent to the curve y=h(x) at x=4 is y = −3x+14. Find an equation of the line tangent to the following curves at x=4.

y = (x²-3x)h(x)

Suppose the line tangent to the graph of f at x=2 is y=4x+1 and suppose y=3x−2 is the line tangent to the graph of g at x=2. Find an equation of the line tangent to the following curves at x=2.

y = f(x)g(x)

Given that p(x) = (5e^x+10x⁵+20x³+100x²+5x+20) ⋅ (10x⁵+40x³+20x²+4x+10), find p′(0) without computing p′(x).

Product Rule for three functi​​ons Assume f, g, and h are differentiable at x.

a. Use the Product Rule (twice) to find a formula for d/dx (f(x)g(x)h(x)).

Find the slope of the graph of f(x) = 2 + xe^x at the point (0, 2).

Derivatives Find and simplify the derivative of the following functions.

f(t) = t⁵/³e^t

Find and simplify the derivative of the following functions.

y = (3t−1)(2t−2)^-1

Find and simplify the derivative of the following functions.

h(x) = (x − 1)(x³+ x² + x+1)

Find and simplify the derivative of the following functions.

f(x) = e^x(x³ − 3x² + 6x − 6)

Find and simplify the derivative of the following functions.

h(x) = (5x⁷ + 5x)(6x³ + 3x² + 3)

7–14. Find the derivative the following ways:

a. Using the Product Rule (Exercises 7–10) or the Quotient Rule (Exercises 11–14). Simplify your result.

y = x² - a² / x-a, where a is a constant

7–14. Find the derivative the following ways:

a. Using the Product Rule (Exercises 7–10) or the Quotient Rule (Exercises 11–14). Simplify your result.

y = x² - 2ax +a² / x-a, where a is a constant

Product Rule for three functi​​ons Assume f, g, and h are differentiable at x.

b. Use the formula in (a) to find d/dx(e^x(x−1)(x+3))

9–61. Evaluate and simplify y'.

y = (2x−3)x^3/2

Finding derivatives from a table Find the values of the following derivatives using the table. <IMAGE>

c. d/dx ((f(x)g(x)) |x=3

7–14. Find the derivative the following ways:

a. Using the Product Rule (Exercises 7–10) or the Quotient Rule (Exercises 11–14). Simplify your result.

f(w) = w³ -w / w

7–14. Find the derivative the following ways:

a. Using the Product Rule (Exercises 7–10) or the Quotient Rule (Exercises 11–14). Simplify your result.

g(s) = 4s³ - 8s² +4s / 4s

Find an equation of the line tangent to the given curve at a.

y = (x + 5) / (x - 1); a = 3

Use a graphing utility to graph the curve and the tangent line on the same set of axes.

y = (x + 5) / (x - 1); a = 3

Find an equation of the line tangent to the given curve at a.

y = 2x² / (3x - 1); a = 1

Use a graphing utility to graph the curve and the tangent line on the same set of axes.

y = 2x² / (3x - 1); a = 1

Derivatives Find and simplify the derivative of the following functions.

g(x) = e^x / x²-1

Derivatives Find and simplify the derivative of the following functions.

h(x) = (x−1)(2x²-1) / (x³-1)

Derivatives Find and simplify the derivative of the following functions.

g(w) = √w+w / √w-w

Derivatives Find and simplify the derivative of the following functions.

h(w) = w⁵/³ / w⁵/³+1

Derivatives Find and simplify the derivative of the following functions.

g(x) = x⁴/³-1 / x⁴/³+1

Population growth Consider the following population functions.

a. Find the instantaneous growth rate of the population, for t≥0.

p(t) = 600 (t²+3/t²+9)

Population growth Consider the following population functions.

b. What is the instantaneous growth rate at t=5?

p(t) = 600 (t²+3/t²+9)

Population growth Consider the following population functions.

c. Estimate the time when the instantaneous growth rate is greatest.

p(t) = 600 (t²+3/t²+9)

Population growth Consider the following population functions.

e.Use a graphing utility to graph the population and its growth rate.

p(t) = 600 (t²+3/t²+9)

Higher-order derivatives Find f′(x),f′′(x), and f′′′(x).

f(x) = 1/x

Given that f(1) = 5, f′(1) = 4, g(1) = 2, and g′(1) = 3 , find d/dx (f(x)g(x))∣ ∣x=1 and d/dx (f(x) / g(x)) ∣ x=1.

Find the slope of the line tangent to the graph of f(x) = x / x+6 at the point (3, 1/3) and at (-2, -1/2).

Derivatives Find and simplify the derivative of the following functions.

f(x) = x /x+1

Derivatives Find and simplify the derivative of the following functions.

f(x) = 2e^x-1 / 2e^x+1

Derivatives Find and simplify the derivative of the following functions.

s(t) = t⁴/³ / e^t

Derivatives from a table Use the following table to find the given derivatives. <IMAGE>

d/dx (xf(x) / g(x)) |x=4

Derivatives from tangent lines Suppose the line tangent to the graph of f at x=2 is y=4x+1 and suppose y=3x−2 is the line tangent to the graph of g at x=2. Find an equation of the line tangent to the following curves at x=2.

b. y = f(x) / g(x)

Use differentiation to verify each equation.

d/dx(x / √1−x²) = 1 / (1−x²)^3/2.

15–48. Derivatives Find the derivative of the following functions.

y = e^x x^e

Evaluate and simplify y'.

y = (3x+5)¹⁰ √x²+5 / (x³+1)⁵⁰

Use the given graphs of f and g to find each derivative. <IMAGE>

b. d/dx (f(x)g(x)) |x=1

Use the given graphs of f and g to find each derivative. <IMAGE>

c. d/dx ((f(x) / g(x)) |x=3

Finding derivatives from a table Find the values of the following derivatives using the table. <IMAGE>

b. d/dx ((f(x) / g(x)) |x=

15–48. Derivatives Find the derivative of the following functions.

y = 4^-x sin x

9–61. Evaluate and simplify y'.

y = e^tan x (tan x−1)

9–61. Evaluate and simplify y'.

y = e^6x sin x

Find the derivative of the following functions.

y = e^-x sin x

Find the derivative of the following functions.

y = x sin x

Derivatives of sin^n x Calculate the following derivatives using the Product Rule.

c. d/dx (sin⁴ x)

Witch of Agnesi Let y(x²+4)=8 (see figure). <IMAGE>

c. Solve the equation y(x²+4)=8 for y to find an explicit expression for y and then calculate dy/dx.

Let ƒ(x) = (x - 3) (x + 3)²

a. Verify that ƒ'(x) = 3(x - 1) (x + 3) and ƒ"(x) = 6 (x + 1).

{Use of Tech} Beak length The length of the culmen (the upper ridge of a bird’s bill) of a t-week-old Indian spotted owlet is modeled by the function L(t)=11.94 / 1 + 4e^−1.65t, where L is measured in millimeters.

a. Find L′(1) and interpret the meaning of this value.

{Use of Tech} Beak length The length of the culmen (the upper ridge of a bird’s bill) of a t-week-old Indian spotted owlet is modeled by the function L(t)=11.94 / 1 + 4e^−1.65t, where L is measured in millimeters.

b. Use a graph of L′(t) to describe how the culmen grows over the first 5 weeks of life.

Find the derivatives of the functions in Exercises 1–42.

𝔂 = (x + 1)² (x² + 2x)

Find the derivatives of the functions in Exercises 1–42.

__

s = √ t .

1 + √ t

Suppose that functions ƒ(x) and g(x) and their first derivatives have the following values at x = 0 and x = 1.

x ƒ(x) g(x) ƒ'(x) g'(x)

0 1 1 -3 1/2

1 3 5 1/2 -4

Find the first derivatives of the following combinations at the given value of x.

b. ƒ(x)g²(x), x = 0

Suppose that functions ƒ(x) and g(x) and their first derivatives have the following values at x = 0 and x = 1.

x ƒ(x) g(x) ƒ'(x) g'(x)

0 1 1 -3 1/2

1 3 5 1/2 -4

Find the first derivatives of the following combinations at the given value of x.

c. ƒ(x) , x = 1

g(x) + 1

Find the derivatives of the functions in Exercises 1–42.

𝔂 = 1 x² csc 2

2 x

Find the derivatives of the functions in Exercises 1–42.

𝔂 = x⁻¹/² sec (2x)²

Find all points (x, y) on the graph of y = x/(x − 2) with tangent lines perpendicular to the line y = 2x + 3.

Generalizing the Product Rule The Derivative Product Rule gives the formula

d/dx (uv) = u (dv/dx) + (du/dx) v

for the derivative of the product uv of two differentiable functions of x.

b. What is the formula for the derivative of the product u₁u₂u₃u₄ of four differentiable functions of x?

Assume that functions f and g are differentiable with f(2) = 3, f'(2) = −1, g(2) = −4, and g'(2) = 1. Find an equation of the line perpendicular to the line tangent to the graph of F(x) = (f(x) + 3) / (x − g(x)) at x = 2.

Find the derivatives of the functions in Exercises 17–28.

y = ((x + 1)(x + 2)) / ((x − 1)(x − 2))

Find the derivative of each function.

$y=(3x+5)^2$

Find the derivative of each function.

$f\left(t\right)=2t(t^{-3}+t^{2/3})$

Find the derivative of the function.

$y=\frac{2-3t}{4t^2+7}$

Find the derivative of the function.

$f\left(x\right)=\frac{2x-1}{x^3+2}$

Find the derivative of the function.

$g\left(y\right)=\frac{5y^2+2y-1}{y^2-2}$