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A_1

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Intermediate Algebra

Definition

In the context of arithmetic sequences, $a_1$ represents the first term or the starting value of the sequence. It is the initial value from which the sequence is generated by adding a constant difference, known as the common difference, to each subsequent term.

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5 Must Know Facts For Your Next Test

  1. $a_1$ is the starting point of an arithmetic sequence and is essential for determining the sequence's behavior.
  2. The explicit formula for an arithmetic sequence is $a_n = a_1 + (n-1)d$, where $a_n$ is the $n$th term, $a_1$ is the first term, and $d$ is the common difference.
  3. Knowing the value of $a_1$ allows you to calculate any term in the sequence using the explicit formula.
  4. The value of $a_1$ affects the range and direction of the sequence, as it determines the starting point.
  5. Understanding the relationship between $a_1$, the common difference, and the explicit formula is crucial for solving problems involving arithmetic sequences.

Review Questions

  • Explain the role of $a_1$ in an arithmetic sequence and how it relates to the explicit formula.
    • The first term, $a_1$, is the starting value of an arithmetic sequence. It represents the initial term from which the sequence is generated. The explicit formula for an arithmetic sequence is $a_n = a_1 + (n-1)d$, where $a_n$ is the $n$th term, $a_1$ is the first term, and $d$ is the common difference. Knowing the value of $a_1$ is essential for using the explicit formula to find any term in the sequence, as it determines the starting point of the sequence.
  • Describe how the value of $a_1$ affects the behavior and characteristics of an arithmetic sequence.
    • The value of $a_1$ has a significant impact on the behavior and characteristics of an arithmetic sequence. The starting value $a_1$ determines the range and direction of the sequence. If $a_1$ is a positive value, the sequence will be increasing; if $a_1$ is negative, the sequence will be decreasing. Additionally, the magnitude of $a_1$ affects the overall scale of the sequence. A larger $a_1$ value will result in a sequence with higher terms, while a smaller $a_1$ value will produce a sequence with lower terms. Understanding the influence of $a_1$ is crucial for analyzing and interpreting the properties of an arithmetic sequence.
  • Analyze the relationship between $a_1$, the common difference, and the explicit formula in the context of solving problems involving arithmetic sequences.
    • The relationship between $a_1$, the common difference, and the explicit formula is fundamental for solving problems involving arithmetic sequences. The explicit formula, $a_n = a_1 + (n-1)d$, shows that the value of $a_1$ and the common difference $d$ are both necessary to determine any term $a_n$ in the sequence. If you know the value of $a_1$ and the common difference, you can use the explicit formula to find any term in the sequence. Conversely, if you know the values of two terms in the sequence, you can use the explicit formula to solve for $a_1$ and the common difference. Understanding this interconnected relationship is crucial for effectively applying the concepts of arithmetic sequences to solve a variety of problems.
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