Susan Colley Vector Calculus 4th Edition Chapter 4 Exercise 4.1 Maxima and Minima in Several Variables

Vector Calculus 4th Edition Chapter 4 Maxima and Minima in Several Variables

Page 262 Problem 1 Answer

Given f(x) = e^2x

To find the Taylor polynomials.Using the method of polynomial.

To find the Taylor polynomials.

Recall that the Taylor polynomial of the function f at the given point a of the kth order is calculated with:

Tk(x) = f(a)+f′(a)(x−y)+f′′(a)/2!(x−a)²+…+f(k)(a)/k!(x−a)k

So in this task we have f(x) = e^2x,k=4 and  a=0.

From there we calculate:

​f(a) = f(0) ⇒ 1

f′(0) = 2

f′′(0) = 4

f′′′(0) = 8

f(iv) = 16

Finally the polynomial is given with:

T4(x) = 1+2x+2x²+4/3x³+2/3x⁴

The Taylor polynomials is T4 (x) = 1+2x+2x²+4/3x³+2/3x⁴

Page 262 Problem 2 Answer

Given f(x)= ln(1+x)

To find the Taylor polynomials.Using the method of polynomial.

To find the Taylor polynomials.

Recall that the Taylor polynomial of the function f at the given point a of the k th order is calculated with:

Tk(x) = f(a)+f′(a)(x−y)+f′′(a)/2!(x−a)²+…+f(k)(a)/k!(x−a)k

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So in this task we have f(x)=ln(1+x), k=3 and a=0.

From there we calculate:

f(a) = f(0) = 0​

f′(x) = 1/1+x

f′(0) = 1

f′′(x) = −1/(1+x)²

f′′(0) = −1

f′′′(x) = 2/(1+x)³

f′′′(0) = 2

Finally the polynomial is given with:

T3(x) = x−x²/2+x³/3

The Taylor polynomials is T3 (x) = x−x²/2+x³/3

Page 262 Problem 3 Answer

Given f(x) = 1/x²

To find the Taylor polynomials.Using the method of polynomial.

To find the Taylor polynomials.

Recall that the Taylor polynomial of the function f at the given point a of the kth order is calculated with:

Tk(x) = f(a)+f′(a)(x−y)+f′′(a)/2!(x−a)²+…+f(k)(a)/k!(x−a)k

So in this task, we have f(x) = 1/x², k = 4 and a=1.

From there we calculate:

f(a) = f(1) = 1

​f′(x) = −2/x³

f′(1) = −2

f′′(x) = 6/x⁴

f′′(1) = 6

f′′′(x) = −24/x⁵

f′′′(1) = −24

f(iv)(x) = 120/x⁶

f{(iv)}(1) = 120

Finally the polynomial is given with:

T4(x) = 1 − 2(x−1) + 3(x−1)² − 4(x−1)³ + 5(x−1)4

The Taylor polynomials is T4 (x) = 1 − 2(x−1) + 3(x−1)² − 4 (x−1)³ + 5(x−1)⁴

Page 262 Problem 4 Answer

Given f(x)=√x

To find the Taylor polynomials.Using the method of polynomial.

To find the Taylor polynomials.

Recall that the Taylor polynomial of the function f at the given point a of the k th order is calculated with:

Tk (x)=f(a)+f′(a)(x−y)+f′′(a)/2!(x−a)²+…+f(k)(a)/k!(x−a)k

So in this task we have f(x)=√x, k=3 and a=1.

From there we calculate:

f(a) = 1

f′(x) = 1/2√x

f′(1) =1 /2

f′′(x) = −1/4×3/2

f′′(1) = −1/4

f′′′(x) = 3/8×5/2

f′′′(1) = 3/8

Finally the polynomial is given with:

T3(x) = 1 + 1/2(x−1 )−1/8 (x−1)² + 1/16(x−1)³

The Taylor polynomials is T3

(x) = 1+ 1/2(x−1) − 1/8(x−1)² + 1/16(x−1)³

Page 262 Problem 5 Answer

Given f(x)=√x

To find the Taylor polynomials.Using the method of polynomial.

To find the Taylor polynomials.

Recall that the Taylor polynomial of the function f at the given point a of the kth order is calculated with:

Tk(x) = f(a)+f′(a)(x−y)+f′′(a)/2!(x−a)²+…+f(k)(a)/k!(x−a)k

So in this task we have f(x)=√x, k=3 and a=9.

From there we calculate:

f(a)=f(9)=3​

f′(x)=1/2√x

f′(1)=1/6

f′′(x)=−1/4x​3/2

f′′(1)=−1/108

f′′′(x)=3/8x​5/2

f′′′(1)=1/648

Finally the polynomial is given with:

T3 (x)=3+1/6(x−9)−1/216(x−9)²+1/3888(x−9)³

The Taylor polynomials is T3 (x)=3+1/6(x−9)−1/216(x−9)²+1/3888(x−9)³

Page 262 Problem 6 Answer

Given f(x)=sinx

To find the Taylor polynomials.Using the method of polynomial.

To find the Taylor polynomials.

Recall that the Taylor polynomial of the function f at the given point a  of the kth  order is calculated with:

Tk(x)=f(a)+f′(a)(x−y)+f′′(a)/2!(x−a)²+…+f(k)(a)/k!(x−a)k

So in this task we have f(x)=sin(x),k=5 and a=0.

From there we calculate:

f(a)=f(0)=0​

f′(x)=cos(x)

f′(0)=1

f′′(x)=−sin(x)

f′′(0)=0

f′′′(x)=−cos(x)

f′′′(0)=−1

Forf(iv) (x)=sin(x)

f{(iv)} (0)=0

f(5) (x)=cos(x)

f{(5)}(0)=1

Finally the polynomial is given with:

T5(x)=x−x³/6+x⁵/120

The Taylor polynomials  is T5 (x)=x−x³/6+x⁵/120

Page 262 Problem 7 Answer

Given: f(x)=sinx

To find the Taylor polynomials pk of given order k at the indicated point a.

Using the method of maxima function method.

Critical points of a function of couple variables denote the points at which both partial derivatives of the function remain zero.

To find the Taylor polynomials pk of given order k at the indicated point a,

Tk (x)=f(a)+f′(a)(x−a)+f′′ (a)/2!(x−a)²+…+f(k)(a)/k!(x−a)k

f′(x)⇒cos(x)⇒f′(π²)=0

f′′(x)⇒−sin(x)⇒f′′(π²)=−1

f′′′(x)⇒−cos(x)⇒f′′′(π²)=0

f4(x)⇒sin(x)⇒f4(π²)=1

f(5)(x)⇒cos(x)⇒f(5)(π²)=0

T5(x)=1−(x−π²)²/2+(x−π²)⁴/24

The Taylor polynomial is T5

(x)=1−(x−π/2)²/2+(x−π/2)⁴/24.

Page 262 Problem 8 Answer

Given: f(x,y)=1/(x²+y²+1)

To find the first- and second-order Taylor polynomials.

Using the method of maxima function method.

Critical points of a function of couple variables denote the points at which both partial derivatives of the function remain zero.

To find the first- and second-order Taylor polynomials,

f(0,0)=1

∂f/∂x⇒−2x(x²+y²+1)²

⇒∂f/∂x(0,0)=0

∂f/∂y⇒−2y

(x²+y²+1)²⇒∂f/∂y(0,0)=0

∂²f/∂x²⇒6x²−2y²−2/(x²+y²+1)³⇒∂²f/∂x²

(0,0)=−2/∂²f/∂x∂y⇒8xy

(x²+y²+1)³⇒∂²f/∂x∂y(0,0)=0

T1(x)=1

T2(x)=1−x²−y²

The polynomial is given as T2(x)=1−x²−y².

Page 262 Problem 9 Answer

Given: f(x,y)=1/(x²+y²+1)

To find the first- and second-order Taylor polynomials.

Using the method of maxima function method.The first-order Taylor Polynomial at a point (a,b)

is given by L(x)=f(a,b)+fx(a,b)⋅(x−a)+fy(a,b)⋅(y−b)

where fx,fy are the partial derivatives with respect to x and y, respectively.

The second-order Taylor Polynomial, given that the first-order polynomial has been calculated, is given by Q(x)=L(x)+fxx(a,b)²(x−a)²+fxy(a,b)²(x−a)(y−b)+fyy(a,b)²(y−b)²

Critical points of a function of couple variables denote the points at which both partial derivatives of the function remain zero.

To find the first- and second-order Taylor polynomials,

f(1,−1)=1/3

∂f/∂x⇒−2x(x²+y²+1)²

⇒∂f/∂x(1,−1)=−2/9

∂f/∂y⇒−2y(x²+y²+1)²

 ⇒∂f/∂y(1,−1)=2/9

∂²f/∂y²⇒6y²−2x²−2(x²+y²+1)³

⇒∂²f∂y²(1,−1)=2/27

∂²f/∂x²⇒6x²−2y²−2/(x²+y²+1)³

⇒∂²f/∂x²(1,−1)=2/27

∂²f/∂x∂y⇒8xy(x²+y²+1)³

⇒∂²f/∂x∂y(1,−1)=−8/27

T1(x)=1/3−2(x−1)/9+2(y+1)/9

T2(x)=1/3−2(x−1)/9+2(y+1)/9+(x−1)²/27−8(x−1)(y+1)/27+(y+1)²/27

The polynomials are given as T1 (x)=1/3−2(x−1)/9+2(y+1) 9

and  T2(x)=1/3−2(x−1)/9+2(y+1)/9+(x−1)^2/27−8(x−1)(y+1)/27+(y+1)²/27.

Page 262 Problem 10 Answer

Given: f(x,y)=e2x+y

To find the first- and second-order Taylor polynomials.

Using the method of maxima function method.

Critical points of a function of couple variables denote the points at which both partial derivatives of the function remain zero.

To find the first- and second-order Taylor polynomials,

f(0,0)=1

∂f/∂x⇒2^e2x+y⇒∂f/∂x(0,0)=2

∂f/∂y⇒e^2x+y⇒∂f/∂y(0,0)=1

∂²f/∂x²⇒4e2x+y⇒∂²f/∂x²(0,0)=4

∂²f/∂x∂y⇒2e2x+y ⇒∂²f/∂x∂y(0,0)=2

T1(x)=1+2x+y

T2(x)=1+2x+y+2x²+2xy+y²/2

The polynomial is given as T2(x)=1+2x+y+2x²+2xy+y²/2.

Page 262 Problem 11 Answer

Given: f(x,y)=e2xcos3y

To find the first- and second-order Taylor polynomials.

Using the method of maxima function method.

Critical points of a function of couple variables denote the points at which both partial derivatives of the function remain zero.

To find the first- and second-order Taylor polynomials,

f(0,π)=−1

∂f/∂x⇒2e2xcos3y

⇒∂f/∂x(0,π)=−2

∂f/∂y⇒−3e2x sin3y⇒∂f/∂y(0,π)=0

∂²f/∂y²⇒−9e2x cos3y⇒∂²f/∂y²(0,π)=9

∂²f/∂x∂y⇒−6e2xsin3y⇒∂²f/∂x∂y(0,π)=0

T1(x)=−1−2x

T2(x)=−1−2x−2x²+9/2(y−π)²

The polynomial is given as T2(x)=−1−2x−2x²+9/2(y−π)².

Page 262 Problem 12 Answer

Given: f(x,y,z)=ye3x+ze2y

To find the first- and second-order Taylor polynomials.

Using the method of maxima function method.

Critical points of a function of couple variables denote the points at which both partial derivatives of the function remain zero.

To find the first- and second-order Taylor polynomials,

f(0,0,2)=2

∂f/∂x⇒3ye3x ⇒∂f/∂x(0,0,2)=0

∂f/∂z⇒e2y ⇒∂f/∂z(0,0,2)=1

∂²f/∂x∂y⇒3e3x ⇒∂²f/∂x∂y(0,0,6i)=3

Simplify,

∂²f/∂y∂z⇒2e2y⇒∂²f/∂y∂z(0,0,6)=2

∂²f/∂x∂z⇒0⇒∂²f/∂x∂z(0,0,6)=0

T1(x)=5y+z

T2 (x)=y+z+3xy+4y²+2yz

The polynomial is T2(x)=y+z+3xy+4y²+2yz.

Page 262 Problem 13 Answer

Given: f(x,y,z)=xy−3y²+2xz,a=(2,−1,1)

To find the first- and second-order Taylor polynomials.

Using the method of maxima function method.

Critical points of a function of couple variables denote the points at which both partial derivatives of the function remain zero.

To find the first- and second-order Taylor polynomials,

f(2,−1,1)=−1

∂f/∂x⇒y+2z⇒∂f/∂x(2,−1,1)=1

∂f/∂z⇒2x⇒∂f/∂z(2,−1,1)=4

T1(x)=1+x+8y+4z

T2=f

The polynomial is T2=f

Page 262 Problem 14 Answer

Given: f(x,y,z)=1/(x²+y²+z²+1)

To find the first- and second-order Taylor polynomials.

Using the method of maxima function method.

Critical points of a function of couple variables denote the points at which both partial derivatives of the function remain zero.

To find the first- and second-order Taylor polynomials,

f(0,0,0)=1

∂f/∂x⇒−2x

(x²+y²+z²+1)²

⇒∂f/∂x(0,0,0)=0

∂²f/∂x²⇒6x²−2y²−2z²−2(x²+y²+z²+1)³

⇒∂²f/∂x²(0,0,0)=−2

∂²f/∂z²⇒6z²−2x²−2y²−2(x²+y²+z²+1)³

⇒∂²f/∂z²(0,0,0)=−2

∂²f/∂x∂z⇒8xz(x²+y²+z²+1)³

⇒∂²f/∂x∂z(0,0,0)=0

T1(x)=1

T2(x)=1−x²−y²−z²

The polynomial is given as T1(x)=1

T2(x)=1−x²−y²−z².

Page 262 Problem 15 Answer

Given: f(x,y,z)=sinxyz,a=(0,0,0)

To find the first- and second-order Taylor polynomials.

Using the method of maxima function method.

Critical points of a function of couple variables denote the points at which both partial derivatives of the function remain zero.

To find the first- and second-order Taylor polynomials,

f(0,0,0)=0

∂f/∂x⇒yzcosxyz

⇒∂f/∂x(0,0,0)=0

∂²f/∂x²⇒−y²z²sinxyz

⇒∂²f/∂x²(0,0,0)=0

∂²f/∂x∂y⇒zcosxyz−xyz2/sinxyz

⇒∂²f/∂x∂y(0,0,0)=0

∂²f/∂x∂z=cosxyz−xy²/zsinxyz

⇒∂²f/∂x∂z(0,0,0)=0

T1(x)=0

T2(x)=0

The polynomial is given as T1(x)=0.