A startup’s revenue grows according to the function R(t) = 5000(1.12)^t, where t is time in months. How many months will it take for revenue to exceed $20,000?

A startup’s revenue grows according to the function R(t) = 5000(1.12)^t, where t is time in months. How many months will it take for revenue to exceed $20,000? - Sterling Industries

Startup Revenue Growth: How Long Until $20,000 is Achieved?

📅 April 20, 2026 👤 scraface

Apr 20, 2026

Startup Revenue Growth: How Long Until $20,000 is Achieved?

Understanding how quickly a startup’s revenue will grow is critical for decision-making, forecasting, and securing investment. Many startups experience exponential revenue growth modeled by the function:

R(t) = 5000(1.12)^t

Understanding the Context

where:

R(t) = revenue in dollars
t = time in months
1.12 = representing a 12% monthly growth rate

In this article, we’ll solve the key question: How many months will it take for revenue to exceed $20,000?

The Exponential Revenue Model

A startup’s revenue grows according to the function R(t) = 5000(1.12)^t, where t is time in months. How many months will it take for revenue to exceed $20,000?

Key Insights

The revenue function R(t) = 5000(1.12)^t shows that monthly revenue grows by 12%. Starting from $5,000, compounding monthly, this model reflects rapid growth typical of scaling tech startups and SaaS businesses.

To determine when revenue exceeds $20,000, set R(t) > 20,000:

5000(1.12)^t > 20,000

Step-by-Step Solution

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Final Thoughts

Divide both sides by 5000:
(1.12)^t > 4
Apply logarithms to both sides (use natural log or base-10 log – either works):
Use natural logarithm:
ln((1.12)^t) > ln(4)
Apply logarithmic identity: ln(a^b) = b·ln(a)
t · ln(1.12) > ln(4)
Solve for t:
t > ln(4) / ln(1.12)

Now compute the values:

ln(4) ≈ 1.3863
ln(1.12) ≈ 0.1133

So:
t > 1.3863 / 0.1133 ≈ 12.23 months

Conclusion: Time to Exceed $20,000

Since t represents full months and revenue exceeds $20,000 after approximately 12.23 months, the smallest whole number of months required is: