Calculus Early Transcendentals

Howard Anton, Irl Bivens, Stephen Davis

Chapter 3

TOPICS IN DIFFERENTIATION - all with Video Answers

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Section 1

Implicit Differentiation

Problem 1

(a) Find $d y / d x$ by differentiating implicitly.
(b) Solve the equation for $y$ as a function of $x,$ and find $d y / d x$ from that equation.
(c) Confirm that the two results are consistent by expressing the derivative in part (a) as a function of $x$ alone.

$x+x y-2 x^{3}=2$

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Gregory H.

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Problem 2

(a) Find $d y / d x$ by differentiating implicitly.
(b) Solve the equation for $y$ as a function of $x,$ and find $d y / d x$ from that equation.
(c) Confirm that the two results are consistent by expressing the derivative in part (a) as a function of $x$ alone.

$\sqrt{y}-\sin x=2$

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Problem 3

Find $d y / d x$ by implicit differentiation.
$x^{2}+y^{2}=100$

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Problem 4

Find $d y / d x$ by implicit differentiation.
$x^{3}+y^{3}=3 x y^{2}$

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Problem 5

Find $d y / d x$ by implicit differentiation.
$x^{2} y+3 x y^{3}-x=3$

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Problem 6

Find $d y / d x$ by implicit differentiation.
$x^{3} y^{2}-5 x^{2} y+x=1$

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Problem 7

Find $d y / d x$ by implicit differentiation.
$\frac{1}{\sqrt{x}}+\frac{1}{\sqrt{y}}=1$

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Problem 8

Find $d y / d x$ by implicit differentiation.
$x^{2}=\frac{x+y}{x-y}$

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Problem 9

Find $d y / d x$ by implicit differentiation.
$\sin \left(x^{2} y^{2}\right)=x$

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Problem 10

Find $d y / d x$ by implicit differentiation.
$\cos \left(x y^{2}\right)=y$

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Problem 11

Find $d y / d x$ by implicit differentiation.
$\tan ^{3}\left(x y^{2}+y\right)=x$

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Problem 12

Find $d y / d x$ by implicit differentiation.
$\frac{x y^{3}}{1+\sec y}=1+y^{4}$

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Problem 13

Find $d^{2} y / d x^{2}$ by implicit differentiation.
$2 x^{2}-3 y^{2}=4$

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Problem 14

Find $d^{2} y / d x^{2}$ by implicit differentiation.
$x^{3}+y^{3}=1$

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Problem 15

Find $d^{2} y / d x^{2}$ by implicit differentiation.
$x^{3} y^{3}-4=0$

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Problem 16

Find $d^{2} y / d x^{2}$ by implicit differentiation.
$x y+y^{2}=2$

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Problem 17

Find $d^{2} y / d x^{2}$ by implicit differentiation.
$y+\sin y=x$

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Problem 18

Find $d^{2} y / d x^{2}$ by implicit differentiation.
$x \cos y=y$

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Problem 19

Find the slope of the tangent line to the curve at the given points in two ways: first by solving for $y$ in terms of $x$ and differentiating and then by implicit differentiation.
$x^{2}+y^{2}=1 ;(1 / 2, \sqrt{3} / 2),(1 / 2,-\sqrt{3} / 2)$

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Problem 20

Find the slope of the tangent line to the curve at the given points in two ways: first by solving for $y$ in terms of $x$ and differentiating and then by implicit differentiation.
$y^{2}-x+1=0 ;(10,3),(10,-3)$

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Problem 21

Determine whether the statement is true or false. Explain your answer.
If an equation in $x$ and $y$ defines a function $y=f(x)$ implicitly, then the graph of the equation and the graph of $f$ are identical.

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Problem 22

Determine whether the statement is true or false. Explain your answer.
The function
$$f(x)=\left\{\begin{array}{cc}{\sqrt{1-x^{2}},} & {0<x \leq 1} \\ {-\sqrt{1-x^{2}},} & {-1 \leq x \leq 0}\end{array}\right.$$
is defined implicitly by the equation $x^{2}+y^{2}=1$

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Problem 23

Determine whether the statement is true or false. Explain your answer.

The function $|x|$ is not defined implicitly by the equation $(x+y)(x-y)=0$

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Problem 24

Determine whether the statement is true or false. Explain your answer.

If $y$ is defined implicitly as a function of $x$ by the equation $x^{2}+y^{2}=1,$ then $d y / d x=-x / y .$

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Problem 25

Use implicit differentiation to find the slope of the tangent line to the curve at the specified point, and check that your answer is consistent with the accompanying graph on the next page.
$x^{4}+y^{4}=16 ;(1, \sqrt[4]{15}) \quad[\text { Lamé's special quartic }]$

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Problem 26

Use implicit differentiation to find the slope of the tangent line to the curve at the specified point, and check that your answer is consistent with the accompanying graph on the next page.
$y^{3}+y x^{2}+x^{2}-3 y^{2}=0 ;(0,3) \quad[\text {trisectrix}]$

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Problem 27

Use implicit differentiation to find the slope of the tangent line to the curve at the specified point, and check that your answer is consistent with the accompanying graph on the next page.
$2\left(x^{2}+y^{2}\right)^{2}=25\left(x^{2}-y^{2}\right) ;(3,1) \quad[\text { lemniscate }]$

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Problem 28

Use implicit differentiation to find the slope of the tangent line to the curve at the specified point, and check that your answer is consistent with the accompanying graph on the next page.
$x^{2 / 3}+y^{2 / 3}=4 ;(-1,3 \sqrt{3}) \quad[\text { four-cusped hypocycloid }]$

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Problem 29

In the accompanying figure, it appears that the ellipse $x^{2}+x y+y^{2}=3$ has horizontal tangent lines at the points of intersection of the ellipse and the line $y=-2 x$ Use implicit differentiation to explain why this is the case.

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Problem 30

(a) A student claims that the ellipse $x^{2}-x y+y^{2}=1$ has a horizontal tangent line at the point $(1,1) .$ Without doing any computations, explain why the student's claim must be incorrect.
(b) Find all points on the ellipse $x^{2}-x y+y^{2}=1$ at which the tangent line is horizontal.

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Problem 31

(a) Use the implicit plotting capability of a CAS to graph the equation $y^{4}+y^{2}=x(x-1)$
(b) Use implicit differentiation to help explain why the graph in part (a) has no horizontal tangent lines.
(c) Solve the equation $y^{4}+y^{2}=x(x-1)$ for $x$ in terms of $y$ and explain why the graph in part (a) consists of two parabolas.

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Problem 32

Use implicit differentiation to find all points on the graph of $y^{4}+y^{2}=x(x-1)$ at which the tangent line is vertical.

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Problem 33

These exercises deal with the rotated ellipse $C$ whose equation is $x^{2}-x y+y^{2}=4.$
Show that the line $y=x$ intersects $C$ at two points $P$ and $Q$ and that the tangent lines to $C$ at $P$ and $Q$ are parallel.

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Problem 34

These exercises deal with the rotated ellipse $C$ whose equation is $x^{2}-x y+y^{2}=4.$
Prove that if $P(a, b)$ is a point on $C,$ then so is $Q(-a,-b)$ and that the tangent lines to $C$ through $P$ and through $Q$ are parallel.

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Problem 35

Find the values of $a$ and $b$ for the curve $x^{2} y+a y^{2}=b$ if the point $(1,1)$ is on its graph and the tangent line at $(1,1)$ has the equation $4 x+3 y=7$

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Problem 36

At what point(s) is the tangent line to the curve $y^{3}=2 x^{2}$ perpendicular to the line $x+2 y-2=0 ?$

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Problem 37

Two curves are said to be orthogonal if their tangent lines are perpendicular at each point of intersection, and two families of curves are said to be orthogonal trajectories of one another if each member of one family is orthogonal to each member of the other family. This terminology is used in these exercises.

The accompanying figure shows some typical members of the families of circles $x^{2}+(y-c)^{2}=c^{2}$ (black curves) and $(x-k)^{2}+y^{2}=k^{2}$ (gray curves). Show that these families are orthogonal trajectories of one another. [Hint: For the tangent lines to be perpendicular at a point of intersection, the slopes of those tangent lines must be negative reciprocals of one another.]

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Problem 38

Two curves are said to be orthogonal if their tangent lines are perpendicular at each point of intersection, and two families of curves are said to be orthogonal trajectories of one another if each member of one family is orthogonal to each member of the other family. This terminology is used in these exercises.

The accompanying figure shows some typical members of the families of hyperbolas $x y=c$ (black curves) and $x^{2}-y^{2}=k$ (gray curves), where $c \neq 0$ and $k \neq 0 .$ Use the hint in Exercise 37 to show that these families are orthogonal trajectories of one another.

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Problem 39

(a) Use the implicit plotting capability of a CAS to graph the curve $C$ whose equation is $x^{3}-2 x y+y^{3}=0$
(b) Use the graph in part (a) to estimate the $x$ -coordinates of a point in the first quadrant that is on $C$ and at which the tangent line to $C$ is parallel to the $x$ -axis.
(c) Find the exact value of the $x$ -coordinate in part (b)

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Problem 40

(a) Use the implicit plotting capability of a CAS to graph the curve $C$ whose equation is $x^{3}-2 x y+y^{3}=0$.
(b) Use the graph to guess the coordinates of a point in the first quadrant that is on $C$ and at which the tangent line to $C$ is parallel to the line $y=-x$
(c) Use implicit differentiation to verify your conjecture in part (b).

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Problem 41

Prove that for every nonzero rational number $r,$ the tangent line to the graph of $x^{r}+y^{r}=2$ at the point $(1,1)$ has slope $-1 .$

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Problem 42

Find equations for two lines through the origin that are tangent to the ellipse $2 x^{2}-4 x+y^{2}+1=0$.

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Problem 43

Write a paragraph that compares the concept of an explicit definition of a function with that of an implicit definition of a function.

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Problem 44

A student asks: "Suppose implicit differentiation yields an undefined expression at a point. Does this mean that $d y / d x$ is undefined at that point?" Using the equation $x^{2}-2 x y+y^{2}=0$ as a basis for your discussion, write a paragraph that answers the student's question.

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