Understanding the Formula: How to Solve for n Using L = a + (n – 1)d
With Step-by-Step Example: 996 = 108 + (n – 1) × 12

When it comes to arithmetic progressions, one of the most useful formulas is:

Understanding the Context

L = a + (n – 1)d

Where:

  • L = the last term in the sequence
  • a = the first term
  • n = the number of terms
  • d = the common difference between successive terms

This formula is essential for solving word problems involving sequences, financial calculations, or mathematical progressions. In this article, we’ll break down how to use this formula, walk through a practical example—such as solving 996 = 108 + (n – 1) × 12—and explain how you can apply it to similar problems.

Solved Let an=1⋅312+3⋅522+⋯+(2n−1)⋅(2n+1)n2 Mark only | Chegg.com

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Solved Let an=1⋅312+3⋅522+⋯+(2n−1)⋅(2n+1)n2 Mark only | Chegg.com
Solved 1⋅21+2⋅31+…+n(n+1)1=n+1n | Chegg.com
Solved ∑n=1∞(−1)n⋅(2−ncos(n))n/2∣an∣==limn→∞n∣an∣= 1, | Chegg.com
Solved Question | Chegg.com
Solved | Chegg.com

Key Insights

What Does the Formula Mean?

The formula L = a + (n – 1)d describes how each term in an arithmetic sequence progresses. Starting from the first term a, each subsequent term increases (or decreases) by a constant d. The expression (n – 1)d calculates the total increment over n – 1 steps.

Applying the Formula: Step-By-Step Example

Let’s solve the equation step-by-step:

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But working modulo $7$, we can compute the sum directly using cyclicity. First, find the pattern of $3^k \mod 7$:
3^1 &\equiv 3 \mod 7 \\
3^2 &\equiv 9 \equiv 2 \mod 7 \\

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Final Thoughts

Given:
996 = 108 + (n – 1) × 12

This represents an arithmetic sequence where:

  • L = 996 (the final term)
  • a = 108 (the first term)
  • d = 12 (the common difference)
  • n = the unknown (number of terms)

Step 1: Isolate the term containing n

Subtract the first term from both sides:

996 – 108 = (n – 1) × 12
888 = (n – 1) × 12

Step 2: Divide both sides by 12

888 ÷ 12 = n – 1
74 = n – 1