The sum of the first n terms of an arithmetic sequence is 180, with first term 4 and common difference 4. What is n? - RoadRUNNER Motorcycle Touring & Travel Magazine

Understanding the Context

This problem is more than a textbook puzzle. In an era where data literacy drives decision-making, learners and professionals alike are seeking clear, reliable answers to foundational math questions. The specific setup—first term 4, common difference 4, total sum 180—mirrors real-world accumulation patterns. Whether tracking progress, analyzing investment growth, or modeling steady increases, recognizing how these elements fit together reveals powerful insights. Meanwhile, educators emphasize clean, logical problem-solving to build confidence—skills that extend well beyond high school classrooms and into professional problem-solving across industries in the U.S.

How The sum of the first n terms of an arithmetic sequence is 180, with first term 4 and common difference 4. What is n?—A Clear Breakdown

To find n, we use the standard formula for the sum of the first n terms of an arithmetic sequence:
Sₙ = (n/2) × [2a + (n – 1)d]
Where Sₙ is the total sum, a is the first term, and d is the common difference.

Plugging in the values:
Sₙ = (n/2) × [2(4) + (n – 1)(4)]
= (n/2) × [8 + 4(n – 1)]
= (n/2) × [8 + 4n – 4]
= (n/2) × (4n + 4)
= (n/2) × 4(n + 1)
= 2n(n + 1)

Key Insights

We’re told Sₙ = 180, so:
2n(n + 1) = 180
Divide both sides by 2:
n(n + 1) = 90

Now solve the quadratic:
n² + n – 90 = 0

Factoring:
(n + 10)(n – 9) = 0

Solutions: n = –10 or n = 9

Since n must be a positive integer, the answer is:
n = 9

Final Thoughts

This elegant solution demonstrates how simple arithmetic sequences reveal structured patterns—offering clarity in a world of complex data.

Common Questions About The sum of the first n terms of an arithmetic sequence is 180, with first term 4 and common difference 4. What is n?

Q: Why do so many people ask this question now?
The problem reflects a growing interest in accessible math skills. As consumers and learners, many seek to understand the math behind personal finance, progress tracking, and data trends—especially in a mobile-first culture where quick, intuitive problem-solving adds value.

Q: Can this apply to real-life situations?
Absolutely. Imagine saving $4 the first week, increasing your weekly savings by $4 each time—this model mirrors steady accumulation patterns in budgeting or long-term planning. Understanding when the total reaches $180 exposes how consistent growth adds up over time.

Q: Isn’t this just a math trick?
Not at all. The formula for arithmetic sums is a foundational tool in statistics, economics, engineering, and computer science—disciplines vital across U.S. industries. Mastery builds confidence in logical reasoning and pattern recognition.

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