Solve the question in the same way as a book 2.1. Solve the following difference equations:Yk+1 + Yk2+ k,a(b) Yk+1 – 2yk = k°,(с) Ук+1- 3k yk = 0,Yk = 1/k(k +1),(e) Yk+1+ Yk = 1/k(k + 1),(f) (k +2)yk+1 – (k +1)yk = 5 + 2k – k²,(g) Yk+1 + Yk = k + 2 · 3k,ke*,(d) Yk+1(h) Yk+1 – Yk(1) Yk+1 – aa2kyk(G) Yk+1Bakaykcos(bk), 2.2.7 Example GThe inhomogeneous equationYk+1 – Yk == ek(2.43)has1,Ik = ek.(2.44)Pk =Therefore,k-1Il Pi(2.45)= 1i=1andk-1ik-1ek- eqi(2.46)е — 1i=1r=1Thus, the general solution of equation (2.43) isekA +е — IYk =(2.47)where A is an arbitrary constant.

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Description: Solve the question in the same way as a book 2.1. Solve the following difference equations:Yk+1 + Yk2+ k,a(b) Yk+1 – 2yk = k°,(с) Ук+1- 3k yk = 0,Yk = 1/k(k +1),(e) Yk+1+ Yk = 1/k(k + 1),(f) (k +2)yk+1 – (k +1)yk = 5 + 2k – k²,(g) Yk+1 + Yk = k + 2 ·

a) The given equation is, yk+1+yk=2+k

Answered: (a) yk+1 + Yk = 2+ k,

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(a) yk+1 + Yk = 2+ k,

Algebra for College Students

10th Edition

ISBN:9781285195780

Author:Jerome E. Kaufmann, Karen L. Schwitters

Publisher:Jerome E. Kaufmann, Karen L. Schwitters

Chapter13: Conic Sections

Section13.1: Circles

Problem 48PS

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Question

Solve the question in the same way as a book

2.1. Solve the following difference equations:
Yk+1 + Yk
2+ k,
a
(b) Yk+1 – 2yk = k°,
(с) Ук+1
- 3k yk = 0,
Yk = 1/k(k +1),
(e) Yk+1+ Yk = 1/k(k + 1),
(f) (k +2)yk+1 – (k +1)yk = 5 + 2k – k²,
(g) Yk+1 + Yk = k + 2 · 3k,
ke*,
(d) Yk+1
(h) Yk+1 – Yk
(1) Yk+1 – aa2kyk
(G) Yk+1
Bak
ayk
cos(bk),

2.2.7 Example G
The inhomogeneous equation
Yk+1 – Yk =
= ek
(2.43)
has
1,
Ik = ek.
(2.44)
Pk =
Therefore,
k-1
Il Pi
(2.45)
= 1
i=1
and
k-1
i
k-1
ek
- e
qi
(2.46)
е — 1
i=1
r=1
Thus, the general solution of equation (2.43) is
ek
A +
е — I
Yk =
(2.47)
where A is an arbitrary constant.

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