Answered

Explore IDNLearn.com's extensive Q&A database and find the answers you're looking for. Discover comprehensive answers to your questions from our community of experienced professionals.

Given:
[tex]\[ A(n+1) = A(n) - 19 \][/tex]
for \( n \geq 1 \) and \( A(1) = -6 \).

Find [tex]\( A(n) \)[/tex].

Sagot :

GinnyAnsweridn
Let's solve the recurrence relation \( A(n+1) = A(n) - 19 \) for \( n \geq 1 \) with the initial condition \( A(1) = -6 \).

1. Initial Condition:
Start with the initial condition \( A(1) = -6 \). This gives us the first term:
[tex]\[ A(1) = -6 \][/tex]

2. Applying the Recurrence Relation:
To find \( A(2) \), use the recurrence relation \( A(n+1) = A(n) - 19 \) with \( n = 1 \):
[tex]\[ A(2) = A(1) - 19 = -6 - 19 = -25 \][/tex]

Next, to find \( A(3) \), use the recurrence relation with \( n = 2 \):
[tex]\[ A(3) = A(2) - 19 = -25 - 19 = -44 \][/tex]

Then, to find \( A(4) \), use the recurrence relation with \( n = 3 \):
[tex]\[ A(4) = A(3) - 19 = -44 - 19 = -63 \][/tex]

Finally, to find \( A(5) \), use the recurrence relation with \( n = 4 \):
[tex]\[ A(5) = A(4) - 19 = -63 - 19 = -82 \][/tex]

3. Summary of Results:
We have calculated the following terms:
[tex]\[ A(1) = -6, \quad A(2) = -25, \quad A(3) = -44, \quad A(4) = -63, \quad A(5) = -82 \][/tex]

Therefore, the sequence \( \{A(n)\} \) for \( n = 1, 2, 3, 4, 5 \) is:
[tex]\[ [-6, -25, -44, -63, -82] \][/tex]

This sequence was generated by repeatedly applying the recurrence relation starting from the initial condition.
Thank you for being part of this discussion. Keep exploring, asking questions, and sharing your insights with the community. Together, we can find the best solutions. Discover the answers you need at IDNLearn.com. Thanks for visiting, and come back soon for more valuable insights.