Generating Functions and Recurrence Relations

2

3

1

0

a sub n = 3 times a sub n minus 1 + 4 times a sub n minus 2

a sub n = 5 times a sub n minus 1 + 2 times a sub n minus 2

a sub n = 2 times a sub n minus 1 - 5 times a sub n minus 2

a sub n = 4 times a sub n minus 1 - 3 times a sub n minus 2

6

5

4

3

By using the recurrence relation

By multiplying the initial conditions

By adding the initial conditions

By guessing the terms

To shift terms left and multiply by four

To remove terms from the series

To shift terms right and multiply by negative four

To add terms to the series

It subtracts two from each term

It adds two to each term

It shifts terms right two positions

It shifts terms left two positions

A sequence of threes

A sequence of zeros

A sequence of twos

A sequence of ones

(2 + 5x) / (1 + 4x - 3x^2)

(2 - 5x) / (1 - 4x + 3x^2)

(2 - 5x) / (1 + 4x - 3x^2)

(2 + 5x) / (1 - 4x + 3x^2)

Divide by one minus four x plus three x squared

Add the initial conditions

Factor a from the left side

Multiply by negative four x

It confirms the correctness of the generating function

It suggests a different recurrence relation

It shows the sequence is infinite

It indicates a mistake in calculation