How To Find Mirr On Financial Calculator

A professional, easy-to-use MIRR calculator to find the Modified Internal Rate of Return. This financial tool provides a more realistic measure of an investment’s profitability than the standard IRR by explicitly assuming rates for reinvestment of cash flows and financing of costs.

Enter Investment Details

Modified Internal Rate of Return (MIRR)

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Future Value of Inflows

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Present Value of Outflows

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Number of Periods

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Formula: MIRR = (Future Value of Positive Cash Flows / Present Value of Negative Cash Flows)^(1/n) – 1

Cash Flow Analysis

Chart of initial investment vs. periodic cash flows.

Cash Flow Value Breakdown

Period	Cash Flow	PV Component (at Finance Rate)	FV Component (at Reinvestment Rate)
Total

What is the Modified Internal Rate of Return (MIRR)?

The Modified Internal Rate of Return (MIRR) is a financial metric used in capital budgeting to measure the profitability of an investment. It is a modification of the standard Internal Rate of Return (IRR) and is designed to resolve some of the problems with IRR. Unlike the IRR, which assumes that interim positive cash flows are reinvested at the project’s own IRR, the MIRR assumes that they are reinvested at a more realistic rate, typically the firm’s cost of capital. This makes any MIRR calculator an essential tool for financial analysts.

This metric is particularly useful for comparing projects of different sizes or durations. By providing a single, unambiguous rate of return, the MIRR helps decision-makers select the project that offers the most value. Anyone involved in project valuation, from financial analysts to business owners, should use a MIRR calculator to get a more accurate picture of potential returns. A common misconception is that MIRR is always lower than IRR; while often true, it depends entirely on whether the reinvestment rate is lower than the calculated IRR.

MIRR Formula and Mathematical Explanation

The calculation performed by a MIRR calculator involves three main steps. First, it determines the present value of all negative cash flows (outflows) discounted at the finance rate. Second, it calculates the future value of all positive cash flows (inflows) compounded at the reinvestment rate. Finally, it uses these values to find the rate of return that equates the two.

The formula is as follows:

MIRR = (FV_{(Positive Cash Flows, Reinvestment Rate)} / PV_{(Negative Cash Flows, Finance Rate)})^(1/n) – 1

This approach provides a more robust analysis than standard IRR, especially when evaluating projects with non-conventional cash flows. Using a reliable MIRR calculator ensures you are making decisions based on sound project valuation methods.

MIRR Formula Variables

Variable	Meaning	Unit	Typical Range
FV	Future Value of all positive cash flows	Currency ($)	Varies
PV	Present Value of all negative cash flows	Currency ($)	Varies
n	Number of periods	Integer	1 – 50+
Reinvestment Rate	Rate for compounding positive cash flows	Percentage (%)	2% – 15%
Finance Rate	Rate for discounting negative cash flows	Percentage (%)	2% – 15%

Practical Examples (Real-World Use Cases)

Example 1: Tech Startup Investment

An angel investor is considering a $250,000 investment in a tech startup. The projected cash inflows over five years are $50,000, $75,000, $100,000, $120,000, and $150,000. The investor’s cost of capital (reinvestment rate) is 12%, and the finance rate is 8%. Using a MIRR calculator, the investor can determine if the project’s return meets their threshold.

• Inputs: Initial Investment = $250,000; Cash Flows = “50000, 75000, 100000, 120000, 150000”; Reinvestment Rate = 12%; Finance Rate = 8%.
• Interpretation: The calculated MIRR of approximately 19.8% is well above the investor’s cost of capital, indicating a highly profitable venture. This result makes a strong case for moving forward with the investment.

Example 2: Real Estate Development

A real estate firm is assessing a project with an initial land and construction cost of $2,000,000. It expects net rental income of $300,000 per year for 4 years, followed by a final year with $300,000 rental income plus the sale of the property for $2,500,000. There’s an additional capital outflow of $100,000 in year 2 for renovations. The firm’s reinvestment rate is 10% and its finance rate is 7%.

• Inputs: Initial Investment = $2,000,000; Cash Flows = “300000, -100000, 300000, 300000, 2800000”; Reinvestment Rate = 10%; Finance Rate = 7%.
• Interpretation: The MIRR calculator shows a return of around 15.3%. By comparing this to other opportunities and their IRR vs MIRR profiles, the firm can make an informed capital allocation decision.

How to Use This MIRR Calculator

Our MIRR calculator is designed for ease of use and accuracy. Follow these simple steps to analyze your investment:

1. Enter Initial Investment: Input the total initial cost of the project as a positive number.
2. Provide Cash Flows: In the text area, enter the series of cash flows over the project’s life, separated by commas. Use positive numbers for inflows and negative for outflows.
3. Set the Reinvestment Rate: Enter the annual rate at which you assume positive cash flows will be reinvested. This is often your company’s Weighted Average Cost of Capital (WACC).
4. Set the Finance Rate: Input the annual interest rate for financing any project deficits or negative cash flows.
5. Review the Results: The MIRR calculator automatically updates the MIRR percentage, future value of inflows, present value of outflows, and the number of periods. The accompanying chart and table also update in real-time.
6. Decision-Making: Generally, if the MIRR is greater than your required rate of return or reinvestment rate, the project is considered financially acceptable.

Key Factors That Affect MIRR Results

• Reinvestment Rate: This is one of the most significant advantages of using a MIRR calculator. A higher reinvestment rate will lead to a higher future value of cash inflows, boosting the MIRR. It reflects the opportunity cost of capital.
• Finance Rate: A higher finance rate increases the present value of costs (negative cash flows), which in turn lowers the MIRR. It represents the cost of borrowing.
• Timing of Cash Flows: Cash flows received earlier have more time to be reinvested and compound, leading to a higher FV and a higher MIRR. This is a key principle in discounted cash flow analysis.
• Magnitude of Cash Flows: Larger positive cash flows will naturally increase the MIRR, while larger negative cash flows will decrease it.
• Project Length (Number of Periods): A longer project gives more time for cash flows to compound. However, the effect on MIRR is complex, as the (1/n) exponent in the formula means the annualised return can decrease if later cash flows aren’t sufficiently large.
• Initial Investment Amount: A smaller initial investment relative to the terminal value of inflows will result in a higher MIRR, indicating greater capital efficiency. This is a core part of any return on investment calculation.

Frequently Asked Questions (FAQ)

1. Why is MIRR better than IRR?

MIRR is often considered superior because it allows for a more realistic assumption about the reinvestment rate of cash flows. IRR assumes cash flows are reinvested at the IRR itself, which can be impractically high. A good MIRR calculator separates the reinvestment rate from the financing rate, eliminating the multiple-IRR problem for non-conventional cash flows.

2. What is a good MIRR?

A “good” MIRR is one that exceeds the company’s cost of capital or the minimum acceptable rate of return (hurdle rate). There is no single number, as it depends on the industry, risk of the project, and economic conditions.

3. Can the MIRR be negative?

Yes. A negative MIRR indicates that the project is expected to lose money. This happens when the future value of positive cash flows is less than the present value of all cash outflows.

4. What’s the difference between the finance rate and reinvestment rate?

The reinvestment rate is the return earned on positive cash flows. The finance rate is the interest paid on funds borrowed to cover negative cash flows. Our MIRR calculator uses both to provide a comprehensive analysis.

5. How does this MIRR calculator handle multiple negative cash flows?

It correctly discounts each negative cash flow (both the initial investment and any subsequent ones) back to the present value using the specified finance rate, summing them up to get the total PV of outflows.

6. Why does my IRR differ so much from the MIRR?

Your IRR might be significantly higher if the project’s calculated IRR is much greater than your actual reinvestment rate. The IRR’s assumption of high reinvestment returns inflates its value. The MIRR calculator provides a more conservative and achievable return figure.

7. Should I use MIRR or NPV (Net Present Value)?

Both are valuable. NPV gives you a dollar amount of value added, which is great for deciding between mutually exclusive projects (choose the one with the highest NPV). MIRR gives you a percentage return, which is useful for gauging the efficiency of an investment. It is best to use them together. Our NPV Calculator can help with this.

8. Does this calculator work for any number of periods?

Yes, you can input a cash flow stream of any length. The MIRR calculator will automatically determine the number of periods ‘n’ based on the number of comma-separated values you provide.

Related Tools and Internal Resources

• IRR Calculator: Compare results by calculating the standard Internal Rate of Return.
• Net Present Value (NPV) Calculator: Determine the absolute value a project adds to your firm.
• Payback Period Calculator: Find out how long it takes for an investment to return its initial cost.
• WACC Calculator: A helpful tool to determine a key input for the reinvestment rate.
• DCF Analysis Guide: Learn more about the core concepts behind project valuation.
• ROI Calculator: Calculate a simple return on investment for less complex scenarios.