MIRR Calculator: Modified Internal Rate of Return with Reinvestment
MIRR Input Parameters
Enter the total upfront cost of the project (positive value). Units: Currency
The rate at which positive cash flows are reinvested. Units: Percentage (%)
The rate at which negative cash flows are financed. Units: Percentage (%)
Project Cash Flows
Enter the cash flows for each period. The first period is usually the initial investment (negative), followed by subsequent positive or negative flows.
Cash flow at the beginning of the project. Usually the initial investment. Units: Currency
Cash flow at the end of Period 1. Units: Currency
Calculation Results
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MIRR = [ ( FV of positive cash flows / PV of negative cash flows ) ^ (1 / Number of periods) ] – 1
Where FV and PV are calculated using the Reinvestment Rate and Financing Rate respectively.
Cash Flow Projection with Reinvestment Growth
Cash Flow Summary
| Period | Cash Flow | Reinvested Value (End of Project) | Financed Value (Start of Project) |
|---|
Understanding MIRR: The Reinvestment Approach
What is the Modified Internal Rate of Return (MIRR)?
The Modified Internal Rate of Return (MIRR) is a financial metric used to evaluate the profitability of an investment or project. Unlike the traditional Internal Rate of Return (IRR), MIRR addresses a critical flaw by explicitly considering the reinvestment rate of positive cash flows and the financing rate of negative cash flows. This makes it a more realistic and often preferred measure for investment appraisal, especially when dealing with projects that have uneven cash flow patterns or when the assumptions about reinvesting intermediate profits are crucial.
MIRR is particularly valuable for project managers, financial analysts, and investors who need to compare mutually exclusive projects or make decisions about capital allocation. It provides a single, easily interpretable rate that represents the project’s overall return, taking into account the cost of capital and the assumed rate at which profits can be put back to work.
MIRR Formula and Explanation
The calculation of MIRR involves several steps. First, all positive cash flows are compounded forward to the end of the project’s life using the assumed Reinvestment Rate. Second, all negative cash flows (including the initial investment) are discounted back to the beginning of the project’s life using the assumed Financing Rate. Finally, MIRR is calculated as the rate that equates the present value of the negative cash flows to the future value of the positive cash flows.
The core formula is derived from equating the future value of inflows to the future value of outflows:
Future Value of Positive Cash Flows = Present Value of Negative Cash Flows * (1 + MIRR) ^ Number of Periods
Rearranging to solve for MIRR:
MIRR = [ ( FV of positive cash flows / PV of negative cash flows ) ^ (1 / Number of periods) ] - 1
Variables Explained:
| Variable | Meaning | Unit | Typical Assumption |
|---|---|---|---|
| Initial Investment Cost | The total upfront capital outlay required to start the project. | Currency | A single, usually negative, value at Period 0. |
| Project Cash Flows | Net cash generated or consumed in each period of the project’s life. | Currency | Can be positive (inflows) or negative (outflows). |
| Reinvestment Rate | The rate at which positive net cash flows generated by the project are assumed to be reinvested. Often assumed to be the company’s cost of capital or a target rate. | Percentage (%) | e.g., 8%, 10%, 12%. |
| Financing Rate | The rate at which negative net cash flows (including the initial investment) are financed. Often assumed to be the company’s cost of borrowing or cost of capital. | Percentage (%) | e.g., 6%, 8%, 10%. |
| Number of Periods (n) | The total duration of the project, typically in years. | Years | Count of cash flow periods. |
| Future Value (FV) of Positive Cash Flows | The total value of all positive cash flows compounded to the end of the project at the reinvestment rate. | Currency | Calculated using compound interest formula. |
| Present Value (PV) of Negative Cash Flows | The total value of all negative cash flows discounted back to the beginning of the project at the financing rate. | Currency | Calculated using present value formula. |
| MIRR | The effective rate of return that equates the compounded positive cash flows to the discounted negative cash flows. | Percentage (%) | The primary output metric. |
How to Use This MIRR Calculator
Using this MIRR calculator is straightforward:
- Initial Investment Cost: Enter the total amount spent at the very beginning of the project (Period 0). This should be a positive number representing the cost.
- Reinvestment Rate: Input the percentage rate at which you assume positive cash flows generated by the project can be reinvested.
- Financing Rate: Enter the percentage rate at which you assume negative cash flows (including the initial investment) need to be financed.
- Project Cash Flows:
- Start by entering the cash flow for Period 0. This is typically the negative of your initial investment cost.
- Click “Add Period” to add subsequent periods.
- For each new period, enter the expected net cash flow (positive for inflows, negative for outflows).
- Calculate MIRR: Click the “Calculate MIRR” button.
- Interpret Results: The calculator will display the MIRR, the Future Value of positive cash flows, the Present Value of negative cash flows, the Number of Periods, Net Future Value, and Net Present Value (at the financing rate).
- Reset: Click “Reset” to clear all fields and start over.
- Copy Results: Use the “Copy Results” button to quickly save the calculated figures.
Ensure your Reinvestment Rate and Financing Rate reflect realistic assumptions based on your company’s cost of capital, hurdle rates, or borrowing costs.
Practical Examples
Let’s illustrate with two scenarios:
Example 1: A Simple Project with Positive Returns
- Initial Investment Cost: $100,000
- Reinvestment Rate: 10%
- Financing Rate: 8%
- Cash Flows:
- Period 0: -$100,000
- Period 1: $30,000
- Period 2: $40,000
- Period 3: $50,000
Calculation:
- FV of Positive Cash Flows: ($30,000 * (1.10)^2) + ($40,000 * (1.10)^1) + $50,000 = $36,300 + $44,000 + $50,000 = $130,300
- PV of Negative Cash Flows: ($100,000 / (1.08)^0) = $100,000
- Number of Periods (n): 3
- MIRR: [ ($130,300 / $100,000) ^ (1/3) ] – 1 = [1.303 ^ 0.3333] – 1 = 1.0925 – 1 = 0.0925 or 9.25%
Interpretation: This project is expected to yield a return of 9.25%, considering how its profits are reinvested and its costs are financed.
Example 2: A Project with Mixed Cash Flows
- Initial Investment Cost: $200,000
- Reinvestment Rate: 12%
- Financing Rate: 9%
- Cash Flows:
- Period 0: -$200,000
- Period 1: $50,000
- Period 2: -$30,000 (unexpected cost)
- Period 3: $100,000
- Period 4: $120,000
Calculation:
- FV of Positive Cash Flows: ($50,000 * (1.12)^3) + ($100,000 * (1.12)^1) + $120,000 = $70,240 + $112,000 + $120,000 = $302,240
- PV of Negative Cash Flows: ($200,000 / (1.09)^0) + ($30,000 / (1.09)^2) = $200,000 + ($30,000 / 1.1881) = $200,000 + $25,250.32 = $225,250.32
- Number of Periods (n): 4
- MIRR: [ ($302,240 / $225,250.32) ^ (1/4) ] – 1 = [1.3417 ^ 0.25] – 1 = 1.0765 – 1 = 0.0765 or 7.65%
Interpretation: Even though the project has large positive flows, the intermediate negative flow and the chosen rates lead to a MIRR of 7.65%. This might be acceptable or not, depending on the company’s hurdle rate.
Key Factors Affecting MIRR
- Magnitude and Timing of Cash Flows: Larger and earlier positive cash flows, and smaller and later negative cash flows, will generally lead to a higher MIRR.
- Reinvestment Rate Assumption: A higher reinvestment rate significantly boosts the future value of positive cash flows, thus increasing MIRR. This highlights the importance of realistic reinvestment opportunities.
- Financing Rate Assumption: A lower financing rate reduces the present value of negative cash flows, thus increasing MIRR. This reflects the cost of capital or borrowing costs.
- Project Duration (Number of Periods): Longer projects can have different impacts depending on the pattern of cash flows. A higher exponent (1/n) for a MIRR greater than 1 will decrease the MIRR, and vice-versa.
- Initial Investment Size: While a larger initial investment can lead to larger absolute returns, it also increases the denominator in the PV of negative cash flows, potentially lowering the MIRR if other factors don’t compensate.
- Project Scale vs. Rate of Return: MIRR provides a rate, but it doesn’t inherently indicate the scale of the project. A project with a high MIRR but small cash flows might be less desirable than a project with a slightly lower MIRR but substantially larger absolute returns (NPV).
Common Misconceptions and Why MIRR is Preferred Over IRR
The primary advantage of MIRR over IRR lies in its more realistic assumptions. The standard IRR calculation implicitly assumes that all intermediate positive cash flows are reinvested at the IRR itself. This can lead to unrealistic results, especially for projects with high IRRs, as reinvesting at such high rates might not be feasible.
MIRR overcomes this by allowing separate, explicit assumptions for reinvestment rates (for positive cash flows) and financing rates (for negative cash flows). This provides a more accurate picture of a project’s true profitability, especially in diverse economic conditions or when comparing projects with significantly different cash flow timings.
FAQ about MIRR Calculation