Project finance model

Project finance is only possible when the project is capable of producing enough cash to cover all operating and debt-servicing expenses over the whole tenor of the debt. A financial model is needed to assess economic feasibility of the project.

Model's output is also used in structuring of a project finance deal. Most importantly, it is used to determine the maximum amount of debt the project company can have and debt repayment profile, so that in any year the debt service coverage ratio (DSCR) should not exceed a predetermined level. DSCR is also used as a measure of riskiness of the project and, therefore, as a determinant of interest rate on debt. Minimal DSCR set for a project depends on riskiness of the project, i.e. on predictability and stability of cash flow generated by it. As a rule of thumb, DSCR should not be less than 1.60. However, in some cases (such as power plant projects with strong off-take agreements) it could be set at as low as 1.15.

General structure

A general structure of any financial model is very simple: input – calculation algorithm – output. While the output for a project finance model is more or less uniform and the calculation algorithm is predetermined by accounting rules, the input is highly project-specific. Generally, it can be subdivided into the following categories:

Input for a thermal power plant model

For a thermal power plant project, a project finance model's input typically looks as follows:

Excel spreadsheets

Project finance models are usually built as Excel spreadsheets and typically consist of the following interlinked sheets:

A model is usually built for a most probable (or base) case. Then, a model sensitivity analysis is conducted to determine effects of changes in input variables on key outputs, such as internal rate of return (IRR), net present value (NPV) and payback period.

Key metrics

Debt sculpting

Debt sculpting is common in the financial modelling of a project. It means that the principal repayment obligations have been calculated to ensure that the principal and interest obligations are appropriately matched to the strength and pattern of the cashflows in each period.

The most common ways to do so are to manually adjust the principal repayment in each period, or to algebraically solve the principal repayment to achieve a desired DSCR.

See also

References

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