= 0,For the linear difference equation uz – 3uz –1 – 16; –2 + 48uz –3 = 0 with initial conditions upu1 = 24, uz = 0,(1) Find the following entries in the sequence using the difference equationuz =u4 =(2) Find an explicit (non-recursive) formula for the solution of the linear difference equation with the abovegiven initial conditions.(3) Find u23 using the formula you found in the previous part.U23 =

Answered: Image /qna-images/answer/6cca00fb-cc73-4d27-97a2-33ab3667158f.jpg

Answered: = 0, For the linear difference equation…

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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Solve the following y + xy = xy¹. O1+y³e³²/2 = C₁³²²/2 01- y³e³²/2 = Ce³²/2 01- y³ 01+y³ = Cy³e³z²/2 = Cy³e³²/2
1. Convert the following difference equation into a first-order form: Yt = Yt-1 + 2yt-2(Yt-3 – 1)
Find the value of kk in the equation of the line kx+7y+19=0 if point X=(10,3) lies on this line. Give the answer correct to 1 decimal places. Select one: -4.0 -0.1 0.2 -29.7 not in the list
Where did the student make a mistake in the following two- column conclusion: Vī = Vĩ V(1) (1) = V(-1)(-1) Vīvī = -Iv=1 This is certainly a true statement. Because 1 = (1) (1) and 1 = (-1)(-1). %3D Use the above property on both roots. %3D (1) (1) = (1) (i) i = v-1 1= 1? Just a little simplification. 1= -1 i2 = -1
2. Solve x3 + x² – 1 = 0, correct to three decimal places by using fixed point iteration method.
3/20 sin x - X dx = ? 22m (a) -0". (2n) (2n)! 22n+2 (b) E(-1" n=1 (2n + 2) (2n + 2)! n-1 22n11 (2n +1).(2n+1)! 22n 1 (2n-1) (2n-1) n=1 n=1 2" (e) > n.n! n=1

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