a) To prove V= 1 2 e 2 2 +2 3 2 decays exponentially fast by using V ˙ ≤ − kV . b) To show from part (a), e 2 (t),e(t) → 0 . c) To show e 1 (t) → 0 exponentially fast. Concept Introduction: ➢ Lorenz equations x ˙ = σ ( y − x ) y ˙ = rx − y − xz z ˙ = xy − bz Here σ, r, b > 0 The solution of Lorenz equations oscillates irregularly for a wide range of parameters, never exactly repeating but always remains in a bounded region of phase space. ➢ The equations governing error dynamics are e ˙ 1 = σ ( e 2 − e 1 ) e ˙ 2 = − e 2 − 20u(t)e 3 e ˙ 3 = 5u(t)e 2 − be 3 ➢ The Liapunov function has the form 1 2 d dt ( e 2 2 + 4e 3 2 )

Question

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Answer 1

Question

Chapter 9.6, Problem 1E

Interpretation Introduction

Interpretation:

a) To prove V=12e22+232 decays exponentially fast by using V˙≤−kV.

b) To show from part (a), e2(t),e(t)→0.

c) To show e1(t)→0 exponentially fast.

Concept Introduction:

➢ Lorenz equations

x˙=σ(y−x)y˙=rx−y−xzz˙=xy−bzHere σ, r, b > 0

The solution of Lorenz equations oscillates irregularly for a wide range of parameters, never exactly repeating but always remains in a bounded region of phase space.

➢ The equations governing error dynamics are

e˙1=σ(e2−e1)e˙2=−e2−20u(t)e3e˙3=5u(t)e2−be3

➢ The Liapunov function has the form

12ddt(e22 + 4e32)

Expert Solution & Answer

Answer to Problem 1E

Solution:

a) It is proved that the V=12e22+232 decaying exponentially fast.
b) It is shown that e2(t),e(t)→0(decaying exponentially fast).
c) It is shown that e1(t)→0 exponentially fast.

Explanation of Solution

a)

V˙=−e22−4be32

e2 and e3 are error dynamic terms.

The given condition is

V˙≤−kV

Putting V˙=−e22−4be32 and V =12e22 + 2e32 in the above equation

−e22−4be32≤−k(12e22 + 2e32)−e22−4be32≤−k12e22−k2e32

Comparing the coefficients of L.H.S and R.H.S

−1<−k12

∴k<2

And

4b < 2k

∴k < 2b

Thus the inequality holds until k < min{ 2 , 2b }

Now from the given condition

V˙≤−kV

Replacing V˙ =dVdt in the above equation

dVdt≤−kV

dV≤−kV.dt

dVV≤−k.dt

Integrating the above equation

∫dVV≤−∫k.dt

logV≤−kT+logV0

Rearranging the above equation

log(VV0)≤−kT

(VV0)≤e−kT

∴V≤V0e−kT

From the above expression, it is proved that the function decays exponentially.
b)

From the part (a)

12e22< V <V0e−kT

Rearranging above equation,

e22< 2V < 2V0e−kT

Taking the square root of the above equation

e2< 2V < 2V0e−kT

∴e2< 2V0e−kT2

From the above expression, e2 tends to zero exponentially fast.

Again from the part (a)

2e32< V <V0e−kT

e3 < V02e−kT2

Hence e3 tend to zero exponentially fast.
c)

From the system

e˙1=σ(e2−e1)

Putting e2=2V0e−kT2 in above equation

e˙1+σe1=σ 2V0e−kT2

de1dt+σe1=σ 2V0e−kT2

This is the first-order differential equation,

Put ddt=D in the above equation

(D+σ)e1=σ 2V0e−kT2

To find the solution of the above differential equation, first, find the solution of complementary function.

(D+σ)e1=0(D+σ)=0D=−σ

Therefore the solution of complementary function is

CF = c1em1t

∴CF = c1e- σt

The particular integral of the function is

P.I=σ 2V0e-kT2(D+σ)

Put D=−k2

P.I= - 2σ 2V0e-kT2(k - 2σ)

The solution of the differential equation is

e1=P.I + C.F

∴e1= -2σ 2V0e-kT2(k - 2σ) + c1e- σt

Since in the above equation, both terms contain exponentially decaying terms, e1 decays exponentially fast.

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Answer 2

Question

Chapter 9.6, Problem 1E

Interpretation Introduction

Interpretation:

a) To prove V=12e22+232 decays exponentially fast by using V˙≤−kV.

b) To show from part (a), e2(t),e(t)→0.

c) To show e1(t)→0 exponentially fast.

Concept Introduction:

➢ Lorenz equations

x˙=σ(y−x)y˙=rx−y−xzz˙=xy−bzHere σ, r, b > 0

The solution of Lorenz equations oscillates irregularly for a wide range of parameters, never exactly repeating but always remains in a bounded region of phase space.

➢ The equations governing error dynamics are

e˙1=σ(e2−e1)e˙2=−e2−20u(t)e3e˙3=5u(t)e2−be3

➢ The Liapunov function has the form

12ddt(e22 + 4e32)

Expert Solution & Answer

Answer to Problem 1E

Solution:

a) It is proved that the V=12e22+232 decaying exponentially fast.
b) It is shown that e2(t),e(t)→0(decaying exponentially fast).
c) It is shown that e1(t)→0 exponentially fast.

Explanation of Solution

a)

V˙=−e22−4be32

e2 and e3 are error dynamic terms.

The given condition is

V˙≤−kV

Putting V˙=−e22−4be32 and V =12e22 + 2e32 in the above equation

−e22−4be32≤−k(12e22 + 2e32)−e22−4be32≤−k12e22−k2e32

Comparing the coefficients of L.H.S and R.H.S

−1<−k12

∴k<2

And

4b < 2k

∴k < 2b

Thus the inequality holds until k < min{ 2 , 2b }

Now from the given condition

V˙≤−kV

Replacing V˙ =dVdt in the above equation

dVdt≤−kV

dV≤−kV.dt

dVV≤−k.dt

Integrating the above equation

∫dVV≤−∫k.dt

logV≤−kT+logV0

Rearranging the above equation

log(VV0)≤−kT

(VV0)≤e−kT

∴V≤V0e−kT

From the above expression, it is proved that the function decays exponentially.
b)

From the part (a)

12e22< V <V0e−kT

Rearranging above equation,

e22< 2V < 2V0e−kT

Taking the square root of the above equation

e2< 2V < 2V0e−kT

∴e2< 2V0e−kT2

From the above expression, e2 tends to zero exponentially fast.

Again from the part (a)

2e32< V <V0e−kT

e3 < V02e−kT2

Hence e3 tend to zero exponentially fast.
c)

From the system

e˙1=σ(e2−e1)

Putting e2=2V0e−kT2 in above equation

e˙1+σe1=σ 2V0e−kT2

de1dt+σe1=σ 2V0e−kT2

This is the first-order differential equation,

Put ddt=D in the above equation

(D+σ)e1=σ 2V0e−kT2

To find the solution of the above differential equation, first, find the solution of complementary function.

(D+σ)e1=0(D+σ)=0D=−σ

Therefore the solution of complementary function is

CF = c1em1t

∴CF = c1e- σt

The particular integral of the function is

P.I=σ 2V0e-kT2(D+σ)

Put D=−k2

P.I= - 2σ 2V0e-kT2(k - 2σ)

The solution of the differential equation is

e1=P.I + C.F

∴e1= -2σ 2V0e-kT2(k - 2σ) + c1e- σt

Since in the above equation, both terms contain exponentially decaying terms, e1 decays exponentially fast.

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Answer 3

Question

Chapter 9.6, Problem 1E

Interpretation Introduction

Interpretation:

a) To prove V=12e22+232 decays exponentially fast by using V˙≤−kV.

b) To show from part (a), e2(t),e(t)→0.

c) To show e1(t)→0 exponentially fast.

Concept Introduction:

➢ Lorenz equations

x˙=σ(y−x)y˙=rx−y−xzz˙=xy−bzHere σ, r, b > 0

The solution of Lorenz equations oscillates irregularly for a wide range of parameters, never exactly repeating but always remains in a bounded region of phase space.

➢ The equations governing error dynamics are

e˙1=σ(e2−e1)e˙2=−e2−20u(t)e3e˙3=5u(t)e2−be3

➢ The Liapunov function has the form

12ddt(e22 + 4e32)

Expert Solution & Answer

Answer to Problem 1E

Solution:

a) It is proved that the V=12e22+232 decaying exponentially fast.
b) It is shown that e2(t),e(t)→0(decaying exponentially fast).
c) It is shown that e1(t)→0 exponentially fast.

Explanation of Solution

a)

V˙=−e22−4be32

e2 and e3 are error dynamic terms.

The given condition is

V˙≤−kV

Putting V˙=−e22−4be32 and V =12e22 + 2e32 in the above equation

−e22−4be32≤−k(12e22 + 2e32)−e22−4be32≤−k12e22−k2e32

Comparing the coefficients of L.H.S and R.H.S

−1<−k12

∴k<2

And

4b < 2k

∴k < 2b

Thus the inequality holds until k < min{ 2 , 2b }

Now from the given condition

V˙≤−kV

Replacing V˙ =dVdt in the above equation

dVdt≤−kV

dV≤−kV.dt

dVV≤−k.dt

Integrating the above equation

∫dVV≤−∫k.dt

logV≤−kT+logV0

Rearranging the above equation

log(VV0)≤−kT

(VV0)≤e−kT

∴V≤V0e−kT

From the above expression, it is proved that the function decays exponentially.
b)

From the part (a)

12e22< V <V0e−kT

Rearranging above equation,

e22< 2V < 2V0e−kT

Taking the square root of the above equation

e2< 2V < 2V0e−kT

∴e2< 2V0e−kT2

From the above expression, e2 tends to zero exponentially fast.

Again from the part (a)

2e32< V <V0e−kT

e3 < V02e−kT2

Hence e3 tend to zero exponentially fast.
c)

From the system

e˙1=σ(e2−e1)

Putting e2=2V0e−kT2 in above equation

e˙1+σe1=σ 2V0e−kT2

de1dt+σe1=σ 2V0e−kT2

This is the first-order differential equation,

Put ddt=D in the above equation

(D+σ)e1=σ 2V0e−kT2

To find the solution of the above differential equation, first, find the solution of complementary function.

(D+σ)e1=0(D+σ)=0D=−σ

Therefore the solution of complementary function is

CF = c1em1t

∴CF = c1e- σt

The particular integral of the function is

P.I=σ 2V0e-kT2(D+σ)

Put D=−k2

P.I= - 2σ 2V0e-kT2(k - 2σ)

The solution of the differential equation is

e1=P.I + C.F

∴e1= -2σ 2V0e-kT2(k - 2σ) + c1e- σt

Since in the above equation, both terms contain exponentially decaying terms, e1 decays exponentially fast.

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Answer 4

Question

Chapter 9.6, Problem 1E

Interpretation Introduction

Interpretation:

a) To prove V=12e22+232 decays exponentially fast by using V˙≤−kV.

b) To show from part (a), e2(t),e(t)→0.

c) To show e1(t)→0 exponentially fast.

Concept Introduction:

➢ Lorenz equations

x˙=σ(y−x)y˙=rx−y−xzz˙=xy−bzHere σ, r, b > 0

The solution of Lorenz equations oscillates irregularly for a wide range of parameters, never exactly repeating but always remains in a bounded region of phase space.

➢ The equations governing error dynamics are

e˙1=σ(e2−e1)e˙2=−e2−20u(t)e3e˙3=5u(t)e2−be3

➢ The Liapunov function has the form

12ddt(e22 + 4e32)

Expert Solution & Answer

Answer to Problem 1E

Solution:

a) It is proved that the V=12e22+232 decaying exponentially fast.
b) It is shown that e2(t),e(t)→0(decaying exponentially fast).
c) It is shown that e1(t)→0 exponentially fast.

Explanation of Solution

a)

V˙=−e22−4be32

e2 and e3 are error dynamic terms.

The given condition is

V˙≤−kV

Putting V˙=−e22−4be32 and V =12e22 + 2e32 in the above equation

−e22−4be32≤−k(12e22 + 2e32)−e22−4be32≤−k12e22−k2e32

Comparing the coefficients of L.H.S and R.H.S

−1<−k12

∴k<2

And

4b < 2k

∴k < 2b

Thus the inequality holds until k < min{ 2 , 2b }

Now from the given condition

V˙≤−kV

Replacing V˙ =dVdt in the above equation

dVdt≤−kV

dV≤−kV.dt

dVV≤−k.dt

Integrating the above equation

∫dVV≤−∫k.dt

logV≤−kT+logV0

Rearranging the above equation

log(VV0)≤−kT

(VV0)≤e−kT

∴V≤V0e−kT

From the above expression, it is proved that the function decays exponentially.
b)

From the part (a)

12e22< V <V0e−kT

Rearranging above equation,

e22< 2V < 2V0e−kT

Taking the square root of the above equation

e2< 2V < 2V0e−kT

∴e2< 2V0e−kT2

From the above expression, e2 tends to zero exponentially fast.

Again from the part (a)

2e32< V <V0e−kT

e3 < V02e−kT2

Hence e3 tend to zero exponentially fast.
c)

From the system

e˙1=σ(e2−e1)

Putting e2=2V0e−kT2 in above equation

e˙1+σe1=σ 2V0e−kT2

de1dt+σe1=σ 2V0e−kT2

This is the first-order differential equation,

Put ddt=D in the above equation

(D+σ)e1=σ 2V0e−kT2

To find the solution of the above differential equation, first, find the solution of complementary function.

(D+σ)e1=0(D+σ)=0D=−σ

Therefore the solution of complementary function is

CF = c1em1t

∴CF = c1e- σt

The particular integral of the function is

P.I=σ 2V0e-kT2(D+σ)

Put D=−k2

P.I= - 2σ 2V0e-kT2(k - 2σ)

The solution of the differential equation is

e1=P.I + C.F

∴e1= -2σ 2V0e-kT2(k - 2σ) + c1e- σt

Since in the above equation, both terms contain exponentially decaying terms, e1 decays exponentially fast.

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Answer 5

Chapter 9.6, Problem 1E

Interpretation Introduction

Interpretation:

a) To prove V=12e22+232 decays exponentially fast by using V˙≤−kV.

b) To show from part (a), e2(t),e(t)→0.

c) To show e1(t)→0 exponentially fast.

Concept Introduction:

➢ Lorenz equations

x˙=σ(y−x)y˙=rx−y−xzz˙=xy−bzHere σ, r, b > 0

The solution of Lorenz equations oscillates irregularly for a wide range of parameters, never exactly repeating but always remains in a bounded region of phase space.

➢ The equations governing error dynamics are

e˙1=σ(e2−e1)e˙2=−e2−20u(t)e3e˙3=5u(t)e2−be3

➢ The Liapunov function has the form

12ddt(e22 + 4e32)

Expert Solution & Answer

Answer to Problem 1E

Solution:

a) It is proved that the V=12e22+232 decaying exponentially fast.
b) It is shown that e2(t),e(t)→0(decaying exponentially fast).
c) It is shown that e1(t)→0 exponentially fast.

Explanation of Solution

a)

V˙=−e22−4be32

e2 and e3 are error dynamic terms.

The given condition is

V˙≤−kV

Putting V˙=−e22−4be32 and V =12e22 + 2e32 in the above equation

−e22−4be32≤−k(12e22 + 2e32)−e22−4be32≤−k12e22−k2e32

Comparing the coefficients of L.H.S and R.H.S

−1<−k12

∴k<2

And

4b < 2k

∴k < 2b

Thus the inequality holds until k < min{ 2 , 2b }

Now from the given condition

V˙≤−kV

Replacing V˙ =dVdt in the above equation

dVdt≤−kV

dV≤−kV.dt

dVV≤−k.dt

Integrating the above equation

∫dVV≤−∫k.dt

logV≤−kT+logV0

Rearranging the above equation

log(VV0)≤−kT

(VV0)≤e−kT

∴V≤V0e−kT

From the above expression, it is proved that the function decays exponentially.
b)

From the part (a)

12e22< V <V0e−kT

Rearranging above equation,

e22< 2V < 2V0e−kT

Taking the square root of the above equation

e2< 2V < 2V0e−kT

∴e2< 2V0e−kT2

From the above expression, e2 tends to zero exponentially fast.

Again from the part (a)

2e32< V <V0e−kT

e3 < V02e−kT2

Hence e3 tend to zero exponentially fast.
c)

From the system

e˙1=σ(e2−e1)

Putting e2=2V0e−kT2 in above equation

e˙1+σe1=σ 2V0e−kT2

de1dt+σe1=σ 2V0e−kT2

This is the first-order differential equation,

Put ddt=D in the above equation

(D+σ)e1=σ 2V0e−kT2

To find the solution of the above differential equation, first, find the solution of complementary function.

(D+σ)e1=0(D+σ)=0D=−σ

Therefore the solution of complementary function is

CF = c1em1t

∴CF = c1e- σt

The particular integral of the function is

P.I=σ 2V0e-kT2(D+σ)

Put D=−k2

P.I= - 2σ 2V0e-kT2(k - 2σ)

The solution of the differential equation is

e1=P.I + C.F

∴e1= -2σ 2V0e-kT2(k - 2σ) + c1e- σt

Since in the above equation, both terms contain exponentially decaying terms, e1 decays exponentially fast.

Answer 6

Chapter 9.6, Problem 1E

Interpretation Introduction

Interpretation:

a) To prove V=12e22+232 decays exponentially fast by using V˙≤−kV.

b) To show from part (a), e2(t),e(t)→0.

c) To show e1(t)→0 exponentially fast.

Concept Introduction:

➢ Lorenz equations

x˙=σ(y−x)y˙=rx−y−xzz˙=xy−bzHere σ, r, b > 0

The solution of Lorenz equations oscillates irregularly for a wide range of parameters, never exactly repeating but always remains in a bounded region of phase space.

➢ The equations governing error dynamics are

e˙1=σ(e2−e1)e˙2=−e2−20u(t)e3e˙3=5u(t)e2−be3

➢ The Liapunov function has the form

12ddt(e22 + 4e32)

Expert Solution & Answer

Answer to Problem 1E

Solution:

a) It is proved that the V=12e22+232 decaying exponentially fast.
b) It is shown that e2(t),e(t)→0(decaying exponentially fast).
c) It is shown that e1(t)→0 exponentially fast.

Explanation of Solution

a)

V˙=−e22−4be32

e2 and e3 are error dynamic terms.

The given condition is

V˙≤−kV

Putting V˙=−e22−4be32 and V =12e22 + 2e32 in the above equation

−e22−4be32≤−k(12e22 + 2e32)−e22−4be32≤−k12e22−k2e32

Comparing the coefficients of L.H.S and R.H.S

−1<−k12

∴k<2

And

4b < 2k

∴k < 2b

Thus the inequality holds until k < min{ 2 , 2b }

Now from the given condition

V˙≤−kV

Replacing V˙ =dVdt in the above equation

dVdt≤−kV

dV≤−kV.dt

dVV≤−k.dt

Integrating the above equation

∫dVV≤−∫k.dt

logV≤−kT+logV0

Rearranging the above equation

log(VV0)≤−kT

(VV0)≤e−kT

∴V≤V0e−kT

From the above expression, it is proved that the function decays exponentially.
b)

From the part (a)

12e22< V <V0e−kT

Rearranging above equation,

e22< 2V < 2V0e−kT

Taking the square root of the above equation

e2< 2V < 2V0e−kT

∴e2< 2V0e−kT2

From the above expression, e2 tends to zero exponentially fast.

Again from the part (a)

2e32< V <V0e−kT

e3 < V02e−kT2

Hence e3 tend to zero exponentially fast.
c)

From the system

e˙1=σ(e2−e1)

Putting e2=2V0e−kT2 in above equation

e˙1+σe1=σ 2V0e−kT2

de1dt+σe1=σ 2V0e−kT2

This is the first-order differential equation,

Put ddt=D in the above equation

(D+σ)e1=σ 2V0e−kT2

To find the solution of the above differential equation, first, find the solution of complementary function.

(D+σ)e1=0(D+σ)=0D=−σ

Therefore the solution of complementary function is

CF = c1em1t

∴CF = c1e- σt

The particular integral of the function is

P.I=σ 2V0e-kT2(D+σ)

Put D=−k2

P.I= - 2σ 2V0e-kT2(k - 2σ)

The solution of the differential equation is

e1=P.I + C.F

∴e1= -2σ 2V0e-kT2(k - 2σ) + c1e- σt

Since in the above equation, both terms contain exponentially decaying terms, e1 decays exponentially fast.

Answer 7

Chapter 9.6, Problem 1E

Interpretation Introduction

Interpretation:

a) To prove V=12e22+232 decays exponentially fast by using V˙≤−kV.

b) To show from part (a), e2(t),e(t)→0.

c) To show e1(t)→0 exponentially fast.

Concept Introduction:

➢ Lorenz equations

x˙=σ(y−x)y˙=rx−y−xzz˙=xy−bzHere σ, r, b > 0

The solution of Lorenz equations oscillates irregularly for a wide range of parameters, never exactly repeating but always remains in a bounded region of phase space.

➢ The equations governing error dynamics are

e˙1=σ(e2−e1)e˙2=−e2−20u(t)e3e˙3=5u(t)e2−be3

➢ The Liapunov function has the form

12ddt(e22 + 4e32)

Answer 8

Expert Solution & Answer

Answer to Problem 1E

Solution:

a) It is proved that the V=12e22+232 decaying exponentially fast.
b) It is shown that e2(t),e(t)→0(decaying exponentially fast).
c) It is shown that e1(t)→0 exponentially fast.

Answer 9

Expert Solution & Answer

Answer 10

Expert Solution & Answer

Answer 11

Explanation of Solution

a)

V˙=−e22−4be32

e2 and e3 are error dynamic terms.

The given condition is

V˙≤−kV

Putting V˙=−e22−4be32 and V =12e22 + 2e32 in the above equation

−e22−4be32≤−k(12e22 + 2e32)−e22−4be32≤−k12e22−k2e32

Comparing the coefficients of L.H.S and R.H.S

−1<−k12

∴k<2

And

4b < 2k

∴k < 2b

Thus the inequality holds until k < min{ 2 , 2b }

Now from the given condition

V˙≤−kV

Replacing V˙ =dVdt in the above equation

dVdt≤−kV

dV≤−kV.dt

dVV≤−k.dt

Integrating the above equation

∫dVV≤−∫k.dt

logV≤−kT+logV0

Rearranging the above equation

log(VV0)≤−kT

(VV0)≤e−kT

∴V≤V0e−kT

From the above expression, it is proved that the function decays exponentially.
b)

From the part (a)

12e22< V <V0e−kT

Rearranging above equation,

e22< 2V < 2V0e−kT

Taking the square root of the above equation

e2< 2V < 2V0e−kT

∴e2< 2V0e−kT2

From the above expression, e2 tends to zero exponentially fast.

Again from the part (a)

2e32< V <V0e−kT

e3 < V02e−kT2

Hence e3 tend to zero exponentially fast.
c)

From the system

e˙1=σ(e2−e1)

Putting e2=2V0e−kT2 in above equation

e˙1+σe1=σ 2V0e−kT2

de1dt+σe1=σ 2V0e−kT2

This is the first-order differential equation,

Put ddt=D in the above equation

(D+σ)e1=σ 2V0e−kT2

To find the solution of the above differential equation, first, find the solution of complementary function.

(D+σ)e1=0(D+σ)=0D=−σ

Therefore the solution of complementary function is

CF = c1em1t

∴CF = c1e- σt

The particular integral of the function is

P.I=σ 2V0e-kT2(D+σ)

Put D=−k2

P.I= - 2σ 2V0e-kT2(k - 2σ)

The solution of the differential equation is

e1=P.I + C.F

∴e1= -2σ 2V0e-kT2(k - 2σ) + c1e- σt

Since in the above equation, both terms contain exponentially decaying terms, e1 decays exponentially fast.

Answer 12

Ch. 9.1 - Prob. 1E Ch. 9.1 - Prob. 2E Ch. 9.1 - Prob. 3E Ch. 9.1 - Prob. 4E Ch. 9.1 - Prob. 5E Ch. 9.2 - Prob. 1E Ch. 9.2 - Prob. 2E Ch. 9.2 - Prob. 3E Ch. 9.2 - Prob. 4E Ch. 9.2 - Prob. 5E

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Answer to Problem 1E

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