If x_{1}=2,\ x_{n}=4X_{(n-1)}-4n\forall n\geq2. Find the general term xn

rocedwrp

rocedwrp

Answered question

2021-08-13

If x1=2, xn=4X(n1)4nn2.
Find the general term xn

Answer & Explanation

liingliing8

liingliing8

Skilled2021-08-14Added 95 answers

Step 1
Given recurrence relation is
xn=4xn14n, x1=2
Rewriting given recurrence relation, we have
xn4xn1=4n
Associated homogeneous recurrence relation is
xn4xn1=0
Auxiliary equation is
m4=0
m=4
Complementary solution is
xnc=C(4)n C is arbitrary constant.
Step 2
To find particular solution:
the non-homogeneous function is Q(n)=4n=0(1)n4n(1)n
particular solution will have form
xnp=A+Bn
xn1p=A+B(n1)=A+BnB
Substituting in given recurrence relation
A+Bn=4(A+BnB)4n
A+Bn4A4Bn+4B=4n
A+Bn4A4Bn+4B=4n
(3A+4B)+(3B)n=4n
3A+4B=0, 3B=4 by comparing coefficients of 1&n.
B=43 and 3A=4B=4×43
A=169 and B=43
Hence particular solution is
xnp=A+Bn=169+43n
xnp=169+43n
Step 3
General solution is
xn=xnc+xnp
xn=C(4)n+169+43n
Given that, x1=2

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