= 85 × (1 + r)⁴ → (1 + r)⁴ = 92/85 ≈ 1.08235 → 1 + r = 1.08235^(1/4) ≈ 1.02015 → r ≈ 0.02015 = 2.015%

Solving for Interest Rate: How 85 × (1 + r)⁴ = 92/85 Explained

Understanding compound interest can transform your financial decisions—whether you're saving for retirement, investing, or planning loans. Today, we break down a practical example that explains how to calculate an annual interest rate from a future value.

Understanding the Context

Step-by-Step Breakdown of the Equation:

85 × (1 + r)⁴ = 92/85

First, simplify the right-hand side:
92 ÷ 85 ≈ 1.08235

So the equation becomes:
85 × (1 + r)⁴ ≈ 1.08235

= 85 × (1 + r)⁴ → (1 + r)⁴ = 92/85 ≈ 1.08235 → 1 + r = 1.08235^(1/4) ≈ 1.02015 → r ≈ 0.02015 = 2.015%

Key Insights

Isolate the Growth Factor

To solve for (1 + r)⁴, divide both sides by 85:
(1 + r)⁴ ≈ 1.08235 / 85 ≈ 1.08235

Wait — correction: 92/85 ≈ 1.08235 is accurate, but dividing 92 by 85 exactly gives:
92 ÷ 85 = 1.08235294..., which rounds to approximately 1.08235 — consistent with our setup.

So:
(1 + r)⁴ ≈ 1.08235

Take the Fourth Root to Solve for Growth Factor

To find (1 + r), take the fourth root (that is, the 4th root) of both sides:
1 + r = (1.08235)^(1/4)

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Final Thoughts

Using a calculator or logarithmic method:
1.08235^(0.25) ≈ 1.02015

Thus:
1 + r ≈ 1.02015

Solve for r

Subtract 1 to isolate the interest rate:
r ≈ 1.02015 − 1 = 0.02015

Converting to percentage:
r ≈ 2.015%

Final Result

The annual interest rate r ≈ 2.015% — meaning that when you invest at this rate compounded annually, an initial amount of 85 grows to approximately 92/85 (~1.08235) after 4 years.

Why This Matters

This calculation shows how compound growth compounds subtly but significantly over time. Even small interest rates yield meaningful returns over multiple periods — a powerful reminder to start saving and investing early.

If you’re planning long-term financial goals, understanding such formulas helps you forecast outcomes more accurately and make informed decisions with certainty.