To prove: The function y = A e − ∫ p ( t ) d t is a solution of the differential equation y ′ + p ( t ) y = g ( t ) if g ( t ) = 0 where A is a constant.

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Answer 1

Question

Chapter 2.1, Problem 28P

(a)

To determine

To prove: The function y=Ae−∫p(t)dt is a solution of the differential equation y′+p(t)y=g(t) if g(t)=0 where A is a constant.

(b)

To determine

To prove: The condition A′(t)=g(t)e∫p(t)dt is satisfied if y=A(t)e−∫p(t)dt is a solution of the differential equation y′+p(t)y=g(t).

(c)

To determine

To show: The solution obtained in the above manner satisfies the equation 33 by computing the function A(t).

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== 1. A separable differential equation can be written in the form hy) = g(a) where h(y) is a function of y only, and g(x) is a function of r only. All of the equations below are separable. Rewrite each of these in the form h(y) = g(x), then find a general solution by integrating both sides. Determine whether the solutions you found are explicit (functions) or implicit (curves but not functions) (a) 1' = — 1/3 (b) y' = = --- Y (c) y = x(1+ y²)

Answer 2

Question

Chapter 2.1, Problem 28P

(a)

To determine

To prove: The function y=Ae−∫p(t)dt is a solution of the differential equation y′+p(t)y=g(t) if g(t)=0 where A is a constant.

(b)

To determine

To prove: The condition A′(t)=g(t)e∫p(t)dt is satisfied if y=A(t)e−∫p(t)dt is a solution of the differential equation y′+p(t)y=g(t).

(c)

To determine

To show: The solution obtained in the above manner satisfies the equation 33 by computing the function A(t).

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Answer 3

Question

Chapter 2.1, Problem 28P

(a)

To determine

To prove: The function y=Ae−∫p(t)dt is a solution of the differential equation y′+p(t)y=g(t) if g(t)=0 where A is a constant.

(b)

To determine

To prove: The condition A′(t)=g(t)e∫p(t)dt is satisfied if y=A(t)e−∫p(t)dt is a solution of the differential equation y′+p(t)y=g(t).

(c)

To determine

To show: The solution obtained in the above manner satisfies the equation 33 by computing the function A(t).

Expert Solution & Answer

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Answer 4

Question

Chapter 2.1, Problem 28P

(a)

To determine

To prove: The function y=Ae−∫p(t)dt is a solution of the differential equation y′+p(t)y=g(t) if g(t)=0 where A is a constant.

(b)

To determine

To prove: The condition A′(t)=g(t)e∫p(t)dt is satisfied if y=A(t)e−∫p(t)dt is a solution of the differential equation y′+p(t)y=g(t).

(c)

To determine

To show: The solution obtained in the above manner satisfies the equation 33 by computing the function A(t).

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Answer 5

Chapter 2.1, Problem 28P

(a)

To determine

To prove: The function y=Ae−∫p(t)dt is a solution of the differential equation y′+p(t)y=g(t) if g(t)=0 where A is a constant.

(b)

To determine

To prove: The condition A′(t)=g(t)e∫p(t)dt is satisfied if y=A(t)e−∫p(t)dt is a solution of the differential equation y′+p(t)y=g(t).

(c)

To determine

To show: The solution obtained in the above manner satisfies the equation 33 by computing the function A(t).

Answer 6

Chapter 2.1, Problem 28P

(a)

To determine

To prove: The function y=Ae−∫p(t)dt is a solution of the differential equation y′+p(t)y=g(t) if g(t)=0 where A is a constant.

Answer 7

Chapter 2.1, Problem 28P

(a)

To determine

To prove: The function y=Ae−∫p(t)dt is a solution of the differential equation y′+p(t)y=g(t) if g(t)=0 where A is a constant.

Answer 8

(b)

To determine

To prove: The condition A′(t)=g(t)e∫p(t)dt is satisfied if y=A(t)e−∫p(t)dt is a solution of the differential equation y′+p(t)y=g(t).

Answer 9

(b)

To determine

To prove: The condition A′(t)=g(t)e∫p(t)dt is satisfied if y=A(t)e−∫p(t)dt is a solution of the differential equation y′+p(t)y=g(t).

Answer 10

(c)

To determine

To show: The solution obtained in the above manner satisfies the equation 33 by computing the function A(t).

Answer 11

(c)

To determine

To show: The solution obtained in the above manner satisfies the equation 33 by computing the function A(t).

Answer 12

Expert Solution & Answer

Answer 13

Expert Solution & Answer

Answer 14

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Answer 15

Ch. 2.1 - Prob. 1P Ch. 2.1 - Prob. 2P Ch. 2.1 - Prob. 3P Ch. 2.1 - Prob. 4P Ch. 2.1 - Prob. 5P Ch. 2.1 - Prob. 6P Ch. 2.1 - Prob. 7P Ch. 2.1 - Prob. 8P Ch. 2.1 - Prob. 9P Ch. 2.1 - Prob. 10P

To prove: The function y = A e − ∫ p ( t ) d t is a solution of the differential equation y ′ + p ( t ) y = g ( t ) if g ( t ) = 0 where A is a constant.

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To prove: The function y=Ae−∫p(t)dt is a solution of the differential equation y′+p(t)y=g(t) if g(t)=0 where A is a constant.

To prove: The condition A′(t)=g(t)e∫p(t)dt is satisfied if y=A(t)e−∫p(t)dt is a solution of the differential equation y′+p(t)y=g(t).

To show: The solution obtained in the above manner satisfies the equation 33 by computing the function A(t).

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Chapter 2 Solutions