The general solution of the equation y ″ = 0 with the help of observations as D n x n − 1 = 0 and D n x n = n ! and n = 1 , 2 , 3 , .... n

Question

4. Consider Chebychev's equation (1 - x²)y" - xy + λy = 0 with boundary conditions y(-1) = 0 and y(1) = 0, where X is a constant. (a) Show that Chebychev's equation can be expressed in Sturm-Liouville form d · (py') + qy + Ary = 0, dx y(1) = 0, y(-1) = 0, where p(x) = (1 = x²) 1/2, q(x) = 0 and r(x) = (1 − x²)-1/2 (b) Show that the eigenfunctions of the Sturm-Liouville equation are extremals of the functional A[y], where A[y] = I[y] J[y]' and I[y] and [y] are defined by - I [y] = √, (my² — qy²) dx and J[y] = [[", ry² dx. Explain briefly how to use this to obtain estimates of the smallest eigenvalue >1. 1 (c) Let k > be a parameter. Explain why the functions y(x) = (1-x²) are suitable 4 trial functions for estimating the smallest eigenvalue. Show that the value of A[y] for these trial functions is 4k2 A[y] = = 4k - 1' and use this to estimate the smallest eigenvalue \1. Hint: L₁ x²(1 − ²)³¹ dr = 1 (1 - x²)³ dx (ẞ > 0). 2ẞ

Answer 1

Question

Chapter 3.1, Problem 37E

(A)

To determine

To find: The general solution of the equation y″=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n

(B)

To determine

The general solution of the equation y‴=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n

(C)

To determine

To find: The general solution of the equation y4=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

(d)

To determine

The general solution of the equation y″=2 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

(e)

To determine

The general solution of the equation y‴=3 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

(f)

To determine

The general solution of the equation y4=24 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

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4. Consider Chebychev's equation (1 - x²)y" - xy + λy = 0 with boundary conditions y(-1) = 0 and y(1) = 0, where X is a constant. (a) Show that Chebychev's equation can be expressed in Sturm-Liouville form d · (py') + qy + Ary = 0, dx y(1) = 0, y(-1) = 0, where p(x) = (1 = x²) 1/2, q(x) = 0 and r(x) = (1 − x²)-1/2 (b) Show that the eigenfunctions of the Sturm-Liouville equation are extremals of the functional A[y], where A[y] = I[y] J[y]' and I[y] and [y] are defined by - I [y] = √, (my² — qy²) dx and J[y] = [[", ry² dx. Explain briefly how to use this to obtain estimates of the smallest eigenvalue >1. 1 (c) Let k > be a parameter. Explain why the functions y(x) = (1-x²) are suitable 4 trial functions for estimating the smallest eigenvalue. Show that the value of A[y] for these trial functions is 4k2 A[y] = = 4k - 1' and use this to estimate the smallest eigenvalue \1. Hint: L₁ x²(1 − ²)³¹ dr = 1 (1 - x²)³ dx (ẞ > 0). 2ẞ

You recieve a case of fresh Michigan cherries that weighs 8.2 kg. You will be making cherry pies. Each pie will require 1 3/4 pounds of pitted cherries. How many pies can be made from the case if the yield percent for cherries is 87

Q/ show that the system: x = Y + x(x² + y²) y° = =x+y (x² + y²) 9 X=-x(x²+ y²) 9 X Y° = x - y (x² + y²) have the same lin car part at (0,0) but they are topologically different. Give the reason.

Answer 2

Question

Chapter 3.1, Problem 37E

(A)

To determine

To find: The general solution of the equation y″=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n

(B)

To determine

The general solution of the equation y‴=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n

(C)

To determine

To find: The general solution of the equation y4=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

(d)

To determine

The general solution of the equation y″=2 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

(e)

To determine

The general solution of the equation y‴=3 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

(f)

To determine

The general solution of the equation y4=24 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

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Answer 3

Question

Chapter 3.1, Problem 37E

(A)

To determine

To find: The general solution of the equation y″=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n

(B)

To determine

The general solution of the equation y‴=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n

(C)

To determine

To find: The general solution of the equation y4=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

(d)

To determine

The general solution of the equation y″=2 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

(e)

To determine

The general solution of the equation y‴=3 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

(f)

To determine

The general solution of the equation y4=24 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

Expert Solution & Answer

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Answer 4

Question

Chapter 3.1, Problem 37E

(A)

To determine

To find: The general solution of the equation y″=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n

(B)

To determine

The general solution of the equation y‴=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n

(C)

To determine

To find: The general solution of the equation y4=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

(d)

To determine

The general solution of the equation y″=2 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

(e)

To determine

The general solution of the equation y‴=3 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

(f)

To determine

The general solution of the equation y4=24 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

Expert Solution & Answer

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Answer 5

Chapter 3.1, Problem 37E

(A)

To determine

To find: The general solution of the equation y″=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n

(B)

To determine

The general solution of the equation y‴=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n

(C)

To determine

To find: The general solution of the equation y4=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

(d)

To determine

The general solution of the equation y″=2 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

(e)

To determine

The general solution of the equation y‴=3 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

(f)

To determine

The general solution of the equation y4=24 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

Answer 6

Chapter 3.1, Problem 37E

(A)

To determine

To find: The general solution of the equation y″=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n

Answer 7

Chapter 3.1, Problem 37E

(A)

To determine

To find: The general solution of the equation y″=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n

Answer 8

(B)

To determine

The general solution of the equation y‴=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n

Answer 9

(B)

To determine

The general solution of the equation y‴=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n

Answer 10

(C)

To determine

To find: The general solution of the equation y4=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

Answer 11

(C)

To determine

To find: The general solution of the equation y4=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

Answer 12

(d)

To determine

The general solution of the equation y″=2 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

Answer 13

(d)

To determine

The general solution of the equation y″=2 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

Answer 14

(e)

To determine

The general solution of the equation y‴=3 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

Answer 15

(e)

To determine

The general solution of the equation y‴=3 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

Answer 16

(f)

To determine

The general solution of the equation y4=24 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

Answer 17

(f)

To determine

The general solution of the equation y4=24 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

Answer 18

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Ch. 3.1 - Prob. 1E Ch. 3.1 - Prob. 2E Ch. 3.1 - Prob. 3E Ch. 3.1 - Prob. 4E Ch. 3.1 - Prob. 5E Ch. 3.1 - Prob. 6E Ch. 3.1 - Prob. 7E Ch. 3.1 - Prob. 8E Ch. 3.1 - Prob. 9E Ch. 3.1 - Prob. 10E

The general solution of the equation y ″ = 0 with the help of observations as D n x n − 1 = 0 and D n x n = n ! and n = 1 , 2 , 3 , .... n

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To find: The general solution of the equation y″=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n

The general solution of the equation y‴=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n

To find: The general solution of the equation y4=0 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

The general solution of the equation y″=2 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

The general solution of the equation y‴=3 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

The general solution of the equation y4=24 with the help of observations as Dnxn−1=0 and Dnxn=n! and n=1,2,3,....n.

Chapter 3 Solutions