Derivatives of Inverse and Logarithmic Functions
Learning Objectives
- Calculate the derivative of an inverse function.
- Find the derivative of exponential functions.
- Find the derivative of logarithmic functions.
- Use logarithmic differentiation to determine the derivative of a function.
In this section we begin with the relationship between the derivative of a function and the derivative of its inverse. For functions whose derivatives we already know, we can use this relationship to find derivatives of inverses without having to use the limit definition of the derivative. This formula may be used to extend the power rule to rational exponents.
The Derivative of an Inverse Function
We begin by considering a function and its inverse. If [latex]f(x)[/latex] is both invertible and differentiable, it seems reasonable that the inverse of [latex]f(x)[/latex] is also differentiable. (Figure) shows the relationship between a function [latex]f(x)[/latex] and its inverse [latex]f^{-1}(x)[/latex]. Look at the point [latex](a,f^{-1}(a))[/latex] on the graph of [latex]f^{-1}(x)[/latex] having a tangent line with a slope of [latex](f^{-1})^{\prime}(a)=\frac{p}{q}[/latex]. This point corresponds to a point [latex](f^{-1}(a),a)[/latex] on the graph of [latex]f(x)[/latex] having a tangent line with a slope of [latex]f^{\prime}(f^{-1}(a))=\frac{q}{p}[/latex]. Thus, if [latex]f^{-1}(x)[/latex] is differentiable at [latex]a[/latex], then it must be the case that
We may also derive the formula for the derivative of the inverse by first recalling that [latex]x=f(f^{-1}(x))[/latex]. Then by differentiating both sides of this equation (using the chain rule on the right), we obtain
Solving for [latex](f^{-1})^{\prime}(x)[/latex], we obtain
We summarize this result in the following theorem.
Inverse Function Theorem
Let [latex]f(x)[/latex] be a function that is both invertible and differentiable. Let [latex]y=f^{-1}(x)[/latex] be the inverse of [latex]f(x)[/latex]. For all [latex]x[/latex] satisfying [latex]f^{\prime}(f^{-1}(x))\ne 0[/latex],
Alternatively, if [latex]y=g(x)[/latex] is the inverse of [latex]f(x)[/latex], then
Applying the Inverse Function Theorem
Use the Inverse Function Theorem to find the derivative of [latex]g(x)=\frac{x+2}{x}[/latex]. Compare the resulting derivative to that obtained by differentiating the function directly.
Answer:
The inverse of [latex]g(x)=\frac{x+2}{x}[/latex] is [latex]f(x)=\frac{2}{x-1}[/latex]. Since [latex]g^{\prime}(x)=\frac{1}{f^{\prime}(g(x))}[/latex], begin by finding [latex]f^{\prime}(x)[/latex]. Thus,
Finally,
We can verify that this is the correct derivative by applying the quotient rule to [latex]g(x)[/latex] to obtain
Use the inverse function theorem to find the derivative of [latex]g(x)=\frac{1}{x+2}.[/latex] Compare the result obtained by differentiating [latex]g(x)[/latex] directly.
Answer: [latex]g^{\prime}(x)=-\frac{1}{(x+2)^2}[/latex]
Applying the Inverse Function Theorem
Use the inverse function theorem to find the derivative of [latex]g(x)=\sqrt[3]{x}[/latex].
Answer:
The function [latex]g(x)=\sqrt[3]{x}[/latex] is the inverse of the function [latex]f(x)=x^3[/latex]. Since [latex]g^{\prime}(x)=\frac{1}{f^{\prime}(g(x))}[/latex], begin by finding [latex]f^{\prime}(x)[/latex]. Thus,
Finally,
Find the derivative of [latex]g(x)=\sqrt[5]{x}[/latex] by applying the inverse function theorem.
Answer:
[latex]g(x)=\frac{1}{5}x^{−4/5}[/latex]
Hint
Use the fact that [latex]g(x)[/latex] is the inverse of [latex]f(x)=x^5[/latex].
From the previous example, we see that we can use the inverse function theorem to extend the power rule to exponents of the form [latex]\frac{1}{n}[/latex], where [latex]n[/latex] is a positive integer. This extension will ultimately allow us to differentiate [latex]x^q[/latex], where [latex]q[/latex] is any rational number.
Extending the Power Rule to Rational Exponents
The power rule may be extended to rational exponents. That is, if [latex]n[/latex] is a positive integer, then
Also, if [latex]n[/latex] is a positive integer and [latex]m[/latex] is an arbitrary integer, then
Proof
The function [latex]g(x)=x^{1/n}[/latex] is the inverse of the function [latex]f(x)=x^n[/latex]. Since [latex]g^{\prime}(x)=\frac{1}{f^{\prime}(g(x))}[/latex], begin by finding [latex]f^{\prime}(x)[/latex]. Thus,
Finally,
To differentiate [latex]x^{m/n}[/latex] we must rewrite it as [latex](x^{1/n})^m[/latex] and apply the chain rule. Thus,
Applying the Power Rule to a Rational Power
Find the equation of the line tangent to the graph of [latex]y=x^{2/3}[/latex] at [latex]x=8[/latex].
Answer:
First find [latex]\frac{dy}{dx}[/latex] and evaluate it at [latex]x=8[/latex]. Since
the slope of the tangent line to the graph at [latex]x=8[/latex] is [latex]\frac{1}{3}[/latex].
Substituting [latex]x=8[/latex] into the original function, we obtain [latex]y=4[/latex]. Thus, the tangent line passes through the point [latex](8,4)[/latex]. Substituting into the point-slope formula for a line and solving for [latex]y[/latex], we obtain the tangent line
Find the derivative of [latex]s(t)=\sqrt{2t+1}[/latex].
Answer:
[latex]s^{\prime}(t)=(2t+1)^{−1/2}[/latex]
Hint
Rewrite as [latex]s(t)=(2t+1)^{1/2}[/latex] and use the chain rule.
So far, we have learned how to differentiate a variety of functions, including trigonometric, inverse, and implicit functions. In this section, we explore derivatives of exponential and logarithmic functions. Exponential functions play an important role in modeling population growth and the decay of radioactive materials. Logarithmic functions can help rescale large quantities and are particularly helpful for rewriting complicated expressions.
Derivative of the Exponential Function
Just as when we found the derivatives of other functions, we can find the derivatives of exponential and logarithmic functions using formulas. As we develop these formulas, we need to make certain basic assumptions. The proofs that these assumptions hold are beyond the scope of this course.
First of all, we begin with the assumption that the function [latex]B(x)=b^x, \, b>0[/latex], is defined for every real number and is continuous. In previous courses, the values of exponential functions for all rational numbers were defined—beginning with the definition of [latex]b^n[/latex], where [latex]n[/latex] is a positive integer—as the product of [latex]b[/latex] multiplied by itself [latex]n[/latex] times. Later, we defined [latex]b^0=1, \, b^{−n}=\frac{1}{b^n}[/latex] for a positive integer [latex]n[/latex], and [latex]b^{s/t}=(\sqrt[t]{b})^s[/latex] for positive integers [latex]s[/latex] and [latex]t[/latex]. These definitions leave open the question of the value of [latex]b^r[/latex] where [latex]r[/latex] is an arbitrary real number. By assuming the continuity of [latex]B(x)=b^x, \, b>0[/latex], we may interpret [latex]b^r[/latex] as [latex]\underset{x\to r}{\lim}b^x[/latex] where the values of [latex]x[/latex] as we take the limit are rational. For example, we may view [latex]{4}^{\pi}[/latex] as the number satisfying
As we see in the following table, [latex]4^{\pi}\approx 77.88[/latex].
[latex]x[/latex] | [latex]4^x[/latex] | [latex]x[/latex] | [latex]4^x[/latex] |
---|---|---|---|
[latex]4^3[/latex] | 64 | [latex]4^{3.141593}[/latex] | 77.8802710486 |
[latex]4^{3.1}[/latex] | 73.5166947198 | [latex]4^{3.1416}[/latex] | 77.8810268071 |
[latex]4^{3.14}[/latex] | 77.7084726013 | [latex]4^{3.142}[/latex] | 77.9242251944 |
[latex]4^{3.141}[/latex] | 77.8162741237 | [latex]4^{3.15}[/latex] | 78.7932424541 |
[latex]4^{3.1415}[/latex] | 77.8702309526 | [latex]4^{3.2}[/latex] | 84.4485062895 |
[latex]4^{3.14159}[/latex] | 77.8799471543 | [latex]4^4[/latex] | 256 |
We also assume that for [latex]B(x)=b^x, \, b>0[/latex], the value [latex]B^{\prime}(0)[/latex] of the derivative exists. In this section, we show that by making this one additional assumption, it is possible to prove that the function [latex]B(x)[/latex] is differentiable everywhere.
We make one final assumption: that there is a unique value of [latex]b>0[/latex] for which [latex]B^{\prime}(0)=1[/latex]. We define [latex]e[/latex] to be this unique value, as we did in Introduction to Functions and Graphs. (Figure) provides graphs of the functions [latex]y=2^x, \, y=3^x, \, y=2.7^x[/latex], and [latex]y=2.8^x[/latex]. A visual estimate of the slopes of the tangent lines to these functions at 0 provides evidence that the value of [latex]e[/latex] lies somewhere between 2.7 and 2.8. The function [latex]E(x)=e^x[/latex] is called the natural exponential function. Its inverse, [latex]L(x)=\log_e x=\ln x[/latex] is called the natural logarithmic function.
For a better estimate of [latex]e[/latex], we may construct a table of estimates of [latex]B^{\prime}(0)[/latex] for functions of the form [latex]B(x)=b^x[/latex]. Before doing this, recall that
for values of [latex]x[/latex] very close to zero. For our estimates, we choose [latex]x=0.00001[/latex] and [latex]x=-0.00001[/latex] to obtain the estimate
See the following table.
[latex]b[/latex] | [latex]\frac{b^{-0.00001}-1}{-0.00001}<B^{\prime}(0)<\frac{b^{0.00001}-1}{0.00001}[/latex] | [latex]b[/latex] | [latex]\frac{b^{-0.00001}-1}{-0.00001}<B^{\prime}(0)<\frac{b^{0.00001}-1}{0.00001}[/latex] |
---|---|---|---|
2 | [latex]0.693145<B^{\prime}(0)<0.69315[/latex] | 2.7183 | [latex]1.000002<B^{\prime}(0)<1.000012[/latex] |
2.7 | [latex]0.993247<B^{\prime}(0)<0.993257[/latex] | 2.719 | [latex]1.000259<B^{\prime}(0)<1.000269[/latex] |
2.71 | [latex]0.996944<B^{\prime}(0)<0.996954[/latex] | 2.72 | [latex]1.000627<B^{\prime}(0)<1.000637[/latex] |
2.718 | [latex]0.999891<B^{\prime}(0)<0.999901[/latex] | 2.8 | [latex]1.029614<B^{\prime}(0)<1.029625[/latex] |
2.7182 | [latex]0.999965<B^{\prime}(0)<0.999975[/latex] | 3 | [latex]1.098606<B^{\prime}(0)<1.098618[/latex] |
The evidence from the table suggests that [latex]2.7182<e<2.7183[/latex].
The graph of [latex]E(x)=e^x[/latex] together with the line [latex]y=x+1[/latex] are shown in (Figure). This line is tangent to the graph of [latex]E(x)=e^x[/latex] at [latex]x=0[/latex].
Now that we have laid out our basic assumptions, we begin our investigation by exploring the derivative of [latex]B(x)=b^x, \, b>0[/latex]. Recall that we have assumed that [latex]B^{\prime}(0)[/latex] exists. By applying the limit definition to the derivative we conclude that
Turning to [latex]B^{\prime}(x)[/latex], we obtain the following.
We see that on the basis of the assumption that [latex]B(x)=b^x[/latex] is differentiable at [latex]0, \, B(x)[/latex] is not only differentiable everywhere, but its derivative is
For [latex]E(x)=e^x, \, E^{\prime}(0)=1[/latex]. Thus, we have [latex]E^{\prime}(x)=e^x[/latex]. (The value of [latex]B^{\prime}(0)[/latex] for an arbitrary function of the form [latex]B(x)=b^x, \, b>0[/latex], will be derived later.)
Derivative of the Natural Exponential Function
Let [latex]E(x)=e^x[/latex] be the natural exponential function. Then
In general,
Derivative of an Exponential Function
Find the derivative of [latex]f(x)=e^{\tan (2x)}[/latex].
Answer:
Using the derivative formula and the chain rule,
Combining Differentiation Rules
Find the derivative of [latex]y=\frac{e^{x^2}}{x}[/latex].
Answer:
Use the derivative of the natural exponential function, the quotient rule, and the chain rule.
Find the derivative of [latex]h(x)=xe^{2x}[/latex].
Answer:
[latex]h^{\prime}(x)=e^{2x}+2xe^{2x}[/latex]
Hint
Don’t forget to use the product rule.
Applying the Natural Exponential Function
A colony of mosquitoes has an initial population of 1000. After [latex]t[/latex] days, the population is given by [latex]A(t)=1000e^{0.3t}[/latex]. Show that the ratio of the rate of change of the population, [latex]A^{\prime}(t)[/latex], to the population size, [latex]A(t)[/latex] is constant.
Answer:
First find [latex]A^{\prime}(t)[/latex]. By using the chain rule, we have [latex]A^{\prime}(t)=300e^{0.3t}[/latex]. Thus, the ratio of the rate of change of the population to the population size is given by
The ratio of the rate of change of the population to the population size is the constant 0.3.
If [latex]A(t)=1000e^{0.3t}[/latex] describes the mosquito population after [latex]t[/latex] days, as in the preceding example, what is the rate of change of [latex]A(t)[/latex] after 4 days?
Answer:
996
Hint
Find [latex]A^{\prime}(4)[/latex].
Derivative of the Logarithmic Function
Now that we have the derivative of the natural exponential function, we can use implicit differentiation to find the derivative of its inverse, the natural logarithmic function.
The Derivative of the Natural Logarithmic Function
If [latex]x>0[/latex] and [latex]y=\ln x[/latex], then
More generally, let [latex]g(x)[/latex] be a differentiable function. For all values of [latex]x[/latex] for which [latex]g^{\prime}(x)>0[/latex], the derivative of [latex]h(x)=\ln(g(x))[/latex] is given by
Proof
If [latex]x>0[/latex] and [latex]y=\ln x[/latex], then [latex]e^y=x[/latex]. Differentiating both sides of this equation results in the equation
Solving for [latex]\frac{dy}{dx}[/latex] yields
Finally, we substitute [latex]x=e^y[/latex] to obtain
We may also derive this result by applying the inverse function theorem, as follows. Since [latex]y=g(x)=\ln x[/latex] is the inverse of [latex]f(x)=e^x[/latex], by applying the inverse function theorem we have
Using this result and applying the chain rule to [latex]h(x)=\ln(g(x))[/latex] yields
Taking a Derivative of a Natural Logarithm
Find the derivative of [latex]f(x)=\ln(x^3+3x-4)[/latex].
Answer:
Use (Figure) directly.
Using Properties of Logarithms in a Derivative
Find the derivative of [latex]f(x)=\ln(\frac{x^2 \sin x}{2x+1})[/latex].
Answer:
At first glance, taking this derivative appears rather complicated. However, by using the properties of logarithms prior to finding the derivative, we can make the problem much simpler.
Differentiate: [latex]f(x)=\ln (3x+2)^5[/latex].
Answer:
[latex]f^{\prime}(x)=\frac{15}{3x+2}[/latex]
Hint
Use a property of logarithms to simplify before taking the derivative.
Now that we can differentiate the natural logarithmic function, we can use this result to find the derivatives of [latex]y=\log_b x[/latex] and [latex]y=b^x[/latex] for [latex]b>0, \, b\ne 1[/latex].
Derivatives of General Exponential and Logarithmic Functions
Let [latex]b>0, \, b\ne 1[/latex], and let [latex]g(x)[/latex] be a differentiable function.
- If [latex]y=\log_b x[/latex], then
[latex]\frac{dy}{dx}=\frac{1}{x \ln b}[/latex].More generally, if [latex]h(x)=\log_b (g(x))[/latex], then for all values of [latex]x[/latex] for which [latex]g(x)>0[/latex],[latex]h^{\prime}(x)=\frac{g^{\prime}(x)}{g(x) \ln b}[/latex].
- If [latex]y=b^x[/latex], then
[latex]\frac{dy}{dx}=b^x \ln b[/latex].More generally, if [latex]h(x)=b^{g(x)}[/latex], then[latex]h^{\prime}(x)=b^{g(x)} g^{\prime}(x) \ln b[/latex].
Proof
If [latex]y=\log_b x[/latex], then [latex]b^y=x[/latex]. It follows that [latex]\ln(b^y)=\ln x[/latex]. Thus [latex]y \ln b = \ln x[/latex]. Solving for [latex]y[/latex], we have [latex]y=\frac{\ln x}{\ln b}[/latex]. Differentiating and keeping in mind that [latex]\ln b[/latex] is a constant, we see that
The derivative in (Figure) now follows from the chain rule.
If [latex]y=b^x[/latex], then [latex]\ln y=x \ln b[/latex]. Using implicit differentiation, again keeping in mind that [latex]\ln b[/latex] is constant, it follows that [latex]\frac{1}{y}\frac{dy}{dx}=\text{ln}b.[/latex] Solving for [latex]\frac{dy}{dx}[/latex] and substituting [latex]y=b^x[/latex], we see that
The more general derivative ((Figure)) follows from the chain rule. [latex]_\blacksquare[/latex]
Applying Derivative Formulas
Find the derivative of [latex]h(x)=\large \frac{3^x}{3^x+2}[/latex].
Answer:
Use the quotient rule and (Figure).
Finding the Slope of a Tangent Line
Find the slope of the line tangent to the graph of [latex]y=\log_2 (3x+1)[/latex] at [latex]x=1[/latex].
Answer:
To find the slope, we must evaluate [latex]\frac{dy}{dx}[/latex] at [latex]x=1[/latex]. Using (Figure), we see that
By evaluating the derivative at [latex]x=1[/latex], we see that the tangent line has slope
Find the slope for the line tangent to [latex]y=3^x[/latex] at [latex]x=2[/latex].
Answer:
[latex]9 \ln (3)[/latex]
Hint
Evaluate the derivative at [latex]x=2[/latex].
Logarithmic Differentiation
At this point, we can take derivatives of functions of the form [latex]y=(g(x))^n[/latex] for certain values of [latex]n[/latex], as well as functions of the form [latex]y=b^{g(x)}[/latex], where [latex]b>0[/latex] and [latex]b\ne 1[/latex]. Unfortunately, we still do not know the derivatives of functions such as [latex]y=x^x[/latex] or [latex]y=x^{\pi}[/latex]. These functions require a technique called logarithmic differentiation, which allows us to differentiate any function of the form [latex]h(x)=g(x)^{f(x)}[/latex]. It can also be used to convert a very complex differentiation problem into a simpler one, such as finding the derivative of [latex]y=\frac{x\sqrt{2x+1}}{e^x \sin^3 x}[/latex]. We outline this technique in the following problem-solving strategy.
Problem-Solving Strategy: Using Logarithmic Differentiation
- To differentiate [latex]y=h(x)[/latex] using logarithmic differentiation, take the natural logarithm of both sides of the equation to obtain [latex]\ln y=\ln (h(x))[/latex].
- Use properties of logarithms to expand [latex]\ln (h(x))[/latex] as much as possible.
- Differentiate both sides of the equation. On the left we will have [latex]\frac{1}{y}\frac{dy}{dx}[/latex].
- Multiply both sides of the equation by [latex]y[/latex] to solve for [latex]\frac{dy}{dx}[/latex].
- Replace [latex]y[/latex] by [latex]h(x)[/latex].
Using Logarithmic Differentiation
Find the derivative of [latex]y=(2x^4+1)^{\tan x}[/latex].
Answer:
Use logarithmic differentiation to find this derivative.
Using Logarithmic Differentiation
Find the derivative of [latex]y=\large \frac{x\sqrt{2x+1}}{e^x \sin^3 x}[/latex].
Answer: This problem really makes use of the properties of logarithms and the differentiation rules given in this chapter.
Extending the Power Rule
Find the derivative of [latex]y=x^r[/latex] where [latex]r[/latex] is an arbitrary real number.
Answer:
The process is the same as in (Figure), though with fewer complications.
Use logarithmic differentiation to find the derivative of [latex]y=x^x[/latex].
Answer:
[latex]\frac{dy}{dx}=x^x(1+\ln x)[/latex]
Hint
Follow the problem solving strategy.
Find the derivative of [latex]y=(\tan x)^{\pi}[/latex].
Answer:
[latex]y^{\prime}=\pi (\tan x)^{\pi -1} \sec^2 x[/latex]
Hint
Use the result from (Figure).
Key Concepts
- On the basis of the assumption that the exponential function [latex]y=b^x, \, b>0[/latex] is continuous everywhere and differentiable at 0, this function is differentiable everywhere and there is a formula for its derivative.
- We can use a formula to find the derivative of [latex]y=\ln x[/latex], and the relationship [latex]\log_b x=\frac{\ln x}{\ln b}[/latex] allows us to extend our differentiation formulas to include logarithms with arbitrary bases.
- Logarithmic differentiation allows us to differentiate functions of the form [latex]y=g(x)^{f(x)}[/latex] or very complex functions by taking the natural logarithm of both sides and exploiting the properties of logarithms before differentiating.
Key Equations
- Inverse function theorem [latex](f^{-1})^{\prime}(x)=\frac{1}{f^{\prime}(f^{-1}(x))}[/latex] whenever [latex]f^{\prime}(f^{-1}(x))\ne 0[/latex] and [latex]f(x)[/latex] is differentiable.
- Power rule with rational exponents [latex]\frac{d}{dx}(x^{m/n})=\frac{m}{n}x^{(m/n)-1}[/latex].
- Derivative of the natural exponential function [latex]\frac{d}{dx}(e^{g(x)})=e^{g(x)} g^{\prime}(x)[/latex]
- Derivative of the natural logarithmic function [latex]\frac{d}{dx}(\ln (g(x)))=\frac{1}{g(x)} g^{\prime}(x)[/latex]
- Derivative of the general exponential function [latex]\frac{d}{dx}(b^{g(x)})=b^{g(x)} g^{\prime}(x) \ln b[/latex]
- Derivative of the general logarithmic function [latex]\frac{d}{dx}(\log_b (g(x)))=\frac{g^{\prime}(x)}{g(x) \ln b}[/latex]
For the following exercises, use the graph of [latex]y=f(x)[/latex] to
- sketch the graph of [latex]y=f^{-1}(x)[/latex], and
- use part a. to estimate [latex](f^{-1})^{\prime}(1)[/latex].
Answer:
a.
b. [latex](f^{-1})^{\prime}(1) \approx 2[/latex]Answer:
a.
b. [latex](f^{-1})^{\prime}(1) \approx -1/\sqrt{3}[/latex]For the following exercises, use the functions [latex]y=f(x)[/latex] to find
- [latex]\frac{df}{dx}[/latex] at [latex]x=a[/latex] and
- [latex]x=f^{-1}(y)[/latex].
- Then use part b. to find [latex]\frac{df^{-1}}{dy}[/latex] at [latex]y=f(a)[/latex].
5. [latex]f(x)=6x-1, \, x=-2[/latex]
6. [latex]f(x)=2x^3-3, \, x=1[/latex]
Answer:
a. 6 b. [latex]x=f^{-1}(y)=(\frac{y+3}{2})^{1/3}[/latex] c. [latex]\frac{1}{6}[/latex]
7. [latex]f(x)=9-x^2, \, 0\le x\le 3, \, x=2[/latex]
8. [latex]f(x)= \sin x, \, x=0[/latex]
Answer:
a. 1 b. [latex]x=f^{-1}(y)= \sin^{-1} y[/latex] c. 1
For each of the following functions, find [latex](f^{-1})^{\prime}(a)[/latex].
9. [latex]f(x)=x^2+3x+2, \, x\ge -1, \, a=2[/latex]
10. [latex]f(x)=x^3+2x+3, \, a=0[/latex]
Answer:
[latex]\frac{1}{5}[/latex]
11. [latex]f(x)=x+\sqrt{x}, \, a=2[/latex]
12. [latex]f(x)=x-\frac{2}{x}, \, x<0, \, a=1[/latex]
Answer:
[latex]\frac{1}{3}[/latex]
13. [latex]f(x)=x + \sin x, \, a=0[/latex]
14. [latex]f(x)= \tan x+3x^2, \, a=0[/latex]
Answer:
1
For each of the given functions [latex]y=f(x)[/latex],
- find the slope of the tangent line to its inverse function [latex]f^{-1}[/latex] at the indicated point [latex]P[/latex], and
- find the equation of the tangent line to the graph of [latex]f^{-1}[/latex] at the indicated point.
15. [latex]f(x)=\frac{4}{1+x^2}, \, P(2,1)[/latex]
16. [latex]f(x)=\sqrt{x-4}, \, P(2,8)[/latex]
Answer:
a. 4 b. [latex]y=4x[/latex]
17. [latex]f(x)=(x^3+1)^4, \, P(16,1)[/latex]
Answer:
a. [latex]-\frac{1}{13}[/latex] b. [latex]y=-\frac{1}{13}x+\frac{18}{13}[/latex]
19. [latex]f(x)=x^5+3x^3-4x-8, \, P(-8,1)[/latex]
For the following exercises, use the given values to find [latex](f^{-1})^{\prime}(a)[/latex].
20. [latex]f(\pi)=0, \, f^{\prime}(\pi)=-1, \, a=0[/latex]
Answer:
-1
21. [latex]f(6)=2, \, f^{\prime}(6)=\frac{1}{3}, \, a=2[/latex]
22. [latex]f(\frac{1}{3})=-8, \, f^{\prime}(\frac{1}{3})=2, \, a=-8[/latex]
Answer:
[latex]\frac{1}{2}[/latex]
23. [latex]f(\sqrt{3})=\frac{1}{2}, \, f^{\prime}(\sqrt{3})=\frac{2}{3}, \, a=\frac{1}{2}[/latex]
24. [latex]f(1)=-3, \, f^{\prime}(1)=10, \, a=-3[/latex]
Answer:
[latex]\frac{1}{10}[/latex]
For the following exercises, find [latex]f^{\prime}(x)[/latex] for each function.
26. [latex]f(x)=x^2 e^x[/latex]
Answer:
[latex]f^{\prime}(x) = 2xe^x+x^2 e^x[/latex]
27. [latex]f(x)=\frac{e^{−x}}{x}[/latex]
28. [latex]f(x)=e^{x^3 \ln x}[/latex]
Answer:
[latex]f^{\prime}(x) = e^{x^3 \ln x}(3x^2 \ln x+x^2)[/latex]
29. [latex]f(x)=\sqrt{e^{2x}+2x}[/latex]
30. [latex]f(x)=\large \frac{e^x-e^{−x}}{e^x+e^{−x}}[/latex]
Answer:
[latex]f^{\prime}(x) = \large \frac{4}{(e^x+e^{−x})^2}[/latex]
31. [latex]f(x)=\frac{10^x}{\ln 10}[/latex]
32. [latex]f(x)=2^{4x}+4x^2[/latex]
Answer:
[latex]f^{\prime}(x) = 2^{4x+2} \cdot \ln 2+8x[/latex]
33. [latex]f(x)=3^{\sin 3x}[/latex]
34. [latex]f(x)=x^{\pi} \cdot \pi^x[/latex]
Answer:
[latex]f^{\prime}(x) = \pi x^{\pi -1} \cdot \pi^x + x^{\pi} \cdot \pi^x \ln \pi [/latex]
35. [latex]f(x)=\ln(4x^3+x)[/latex]
36. [latex]f(x)=\ln \sqrt{5x-7}[/latex]
Answer:
[latex]f^{\prime}(x) = \frac{5}{2(5x-7)}[/latex]
37. [latex]f(x)=x^2 \ln 9x[/latex]
38. [latex]f(x)=\log(\sec x)[/latex]
Answer:
[latex]f^{\prime}(x) = \frac{\tan x}{\ln 10}[/latex]
39. [latex]f(x)=\log_7 (6x^4+3)^5[/latex]
40. [latex]f(x)=2^x \cdot \log_3 7^{x^2-4}[/latex]
Answer:
[latex]f^{\prime}(x) = 2^x \cdot \ln 2 \cdot \log_3 7^{x^2-4} + 2^x \cdot \frac{2x \ln 7}{\ln 3}[/latex]
For the following exercises, use logarithmic differentiation to find [latex]\frac{dy}{dx}[/latex].
41. [latex]y=x^{\sqrt{x}}[/latex]
42. [latex]y=(\sin 2x)^{4x}[/latex]
Answer:
[latex]\frac{dy}{dx} = (\sin 2x)^{4x} [4 \cdot \ln(\sin 2x) + 8x \cdot \cot 2x][/latex]
43. [latex]y=(\ln x)^{\ln x}[/latex]
44. [latex]y=x^{\log_2 x}[/latex]
Answer:
[latex]\frac{dy}{dx} = x^{\log_2 x} \cdot \frac{2 \ln x}{x \ln 2}[/latex]
45. [latex]y=(x^2-1)^{\ln x}[/latex]
46. [latex]y=x^{\cot x}[/latex]
Answer:
[latex]\frac{dy}{dx} = x^{\cot x} \cdot [−\csc^2 x \cdot \ln x+\frac{\cot x}{x}][/latex]
47. [latex]y= \large \frac{x+11}{\sqrt[3]{x^2-4}}[/latex]
48. [latex]y=x^{-1/2}(x^2+3)^{2/3}(3x-4)^4[/latex]
Answer:
[latex]\frac{dy}{dx} = x^{-1/2}(x^2+3)^{2/3}(3x-4)^4 \cdot [\frac{-1}{2x}+\frac{4x}{3(x^2+3)}+\frac{12}{3x-4}][/latex]
49. [T] Find an equation of the tangent line to the graph of [latex]f(x)=4xe^{x^2-1}[/latex] at the point where
[latex]x=-1[/latex]. Graph both the function and the tangent line.
50. [T] Find the equation of the line that is normal to the graph of [latex]f(x)=x \cdot 5^x[/latex] at the point where [latex]x=1[/latex]. Graph both the function and the normal line.
Answer: [latex]y=\frac{-1}{5+5 \ln 5}x+(5+\frac{1}{5+5 \ln 5})[/latex]
51. [T] Find the equation of the tangent line to the graph of [latex]x^3-x \ln y+y^3=2x+5[/latex] at the point where [latex]x=2[/latex]. (Hint: Use implicit differentiation to find [latex]\frac{dy}{dx}[/latex].) Graph both the curve and the tangent line.
52. Consider the function [latex]y=x^{1/x}[/latex] for [latex]x>0[/latex].
- Determine the points on the graph where the tangent line is horizontal.
- Determine the intervals where [latex]y^{\prime}>0[/latex] and those where [latex]y^{\prime}<0[/latex].
Answer:
a. [latex]x=e \approx 2.718[/latex] b. [latex]y^{\prime}>0[/latex] on [latex](e,\infty)[/latex], and [latex]y^{\prime}<0[/latex] on [latex](0,e)[/latex]
53. The formula [latex]I(t)=\frac{\sin t}{e^t}[/latex] is the formula for a decaying alternating current.
- Complete the following table with the appropriate values.
[latex]t[/latex] [latex]\frac{\sin t}{e^t}[/latex] 0 (i) [latex]\frac{\pi}{2}[/latex] (ii) [latex]\pi[/latex] (iii) [latex]\frac{3\pi}{2}[/latex] (iv) [latex]2\pi[/latex] (v) [latex]2\pi[/latex] (vi) [latex]3\pi[/latex] (vii) [latex]\frac{7\pi}{2}[/latex] (viii) [latex]4\pi[/latex] (ix) - Using only the values in the table, determine where the tangent line to the graph of [latex]I(t)[/latex] is horizontal.
54. [T] The population of Toledo, Ohio, in 2000 was approximately 500,000. Assume the population is increasing at a rate of 5% per year.
- Write the exponential function that relates the total population as a function of [latex]t[/latex].
- Use a. to determine the rate at which the population is increasing in [latex]t[/latex] years.
- Use b. to determine the rate at which the population is increasing in 10 years.
Answer:
a. [latex]P=500,000(1.05)^t[/latex] individuals b. [latex]P^{\prime}(t)=24395 \cdot (1.05)^t[/latex] individuals per year c. 39,737 individuals per year
55. [T] An isotope of the element erbium has a half-life of approximately 12 hours. Initially there are 9 grams of the isotope present.
- Write the exponential function that relates the amount of substance remaining as a function of [latex]t[/latex], measured in hours.
- Use a. to determine the rate at which the substance is decaying in [latex]t[/latex] hours.
- Use b. to determine the rate of decay at [latex]t=4[/latex] hours.
56. [T] The number of cases of influenza in New York City from the beginning of 1960 to the beginning of 1961 is modeled by the function
[latex]N(t)=5.3e^{0.093t^2-0.87t}, \, (0\le t\le 4)[/latex],
where [latex]N(t)[/latex] gives the number of cases (in thousands) and [latex]t[/latex] is measured in years, with [latex]t=0[/latex] corresponding to the beginning of 1960.
- Show work that evaluates [latex]N(0)[/latex] and [latex]N(4)[/latex]. Briefly describe what these values indicate about the disease in New York City.
- Show work that evaluates [latex]N^{\prime}(0)[/latex] and [latex]N^{\prime}(3)[/latex]. Briefly describe what these values indicate about the disease in New York City.
Answer:
a. At the beginning of 1960 there were 5.3 thousand cases of the disease in New York City. At the beginning of 1963 there were approximately 723 cases of the disease in New York City. b. At the beginning of 1960 the number of cases of the disease was decreasing at rate of -4.611 thousand per year; at the beginning of 1963, the number of cases of the disease was decreasing at a rate of -0.2808 thousand per year.
57. [T] The relative rate of change of a differentiable function [latex]y=f(x)[/latex] is given by [latex]\frac{100 \cdot f^{\prime}(x)}{f(x)}\%[/latex]. One model for population growth is a Gompertz growth function, given by [latex]P(x)=ae^{−b \cdot e^{−cx}}[/latex] where [latex]a, \, b[/latex], and [latex]c[/latex] are constants.
- Find the relative rate of change formula for the generic Gompertz function.
- Use a. to find the relative rate of change of a population in [latex]x=20[/latex] months when [latex]a=204,b=0.0198,[/latex] and [latex]c=0.15.[/latex]
- Briefly interpret what the result of b. means.
For the following exercises, use the population of New York City from 1790 to 1860, given in the following table.
Years since 1790 | Population |
0 | 33,131 |
10 | 60,515 |
20 | 96,373 |
30 | 123,706 |
40 | 202,300 |
50 | 312,710 |
60 | 515,547 |
70 | 813,669 |
58. [T] Using a computer program or a calculator, fit a growth curve to the data of the form [latex]p=ab^t[/latex].
Answer:
[latex]p=35741(1.045)^t[/latex]
59. [T] Using the exponential best fit for the data, write a table containing the derivatives evaluated at each year.
Answer:
Years since 1790 | [latex]P''[/latex] |
---|---|
0 | 69.25 |
10 | 107.5 |
20 | 167.0 |
30 | 259.4 |
40 | 402.8 |
50 | 625.5 |
60 | 971.4 |
70 | 1508.5 |
61. [T] Using the tables of first and second derivatives and the best fit, answer the following questions:
- Will the model be accurate in predicting the future population of New York City? Why or why not?
- Estimate the population in 2010. Was the prediction correct from a.?
Glossary
- logarithmic differentiation
- is a technique that allows us to differentiate a function by first taking the natural logarithm of both sides of an equation, applying properties of logarithms to simplify the equation, and differentiating implicitly
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