8r dr; (i) J2 + 8x-9

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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Answer all questions including A(i) (ii) and b (i) (ii) The answer to A(i) is in the blue image but working out is needed! All questions must be written on a paper. thanks!
4
(log(1 – x) + 9 log(x + 9)) +
5
constant
Transcribed Image Text:4 (log(1 – x) + 9 log(x + 9)) + 5 constant
1. (a) Without using a calculator, determine the following integrals:
8.T
dr.
(ii) 2+8r+41
8r
(1)/
r2 + 8x-9
(b) Let P(r, y) be a general point on the circle r + y? = 4 and let S be the point
(2,0) as shown in the sketch below.
P(r,y)
Q(r, 0)
S(2,0)
(i) Write down expressions for r and y in terms of 0. Hence, show that the area
A of the shaded region R is
A = 20 – sin 20.
(ii) Use Newton's method to determine the value of 6 (in radians, to three decimal
places) such that A = 1.
(Newton's method for solving (r) = 0: z,+1 = In
f(In)
for n = 0, 1, 2,...)
Transcribed Image Text:1. (a) Without using a calculator, determine the following integrals: 8.T dr. (ii) 2+8r+41 8r (1)/ r2 + 8x-9 (b) Let P(r, y) be a general point on the circle r + y? = 4 and let S be the point (2,0) as shown in the sketch below. P(r,y) Q(r, 0) S(2,0) (i) Write down expressions for r and y in terms of 0. Hence, show that the area A of the shaded region R is A = 20 – sin 20. (ii) Use Newton's method to determine the value of 6 (in radians, to three decimal places) such that A = 1. (Newton's method for solving (r) = 0: z,+1 = In f(In) for n = 0, 1, 2,...)
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