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Recovery from "failed to parse" errors in math formulas |
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:<math>A(t) = k \cdot a(t)</math>.
Accumulation functions can be expressed for complex functions (not merely linear) using integration, in the following set up:
<math>\int_0^x f(t)\,dt</math>
where "x" is the finishing point and the function is in terms of "t" or time. Visually, the total amount of accumulation is the area between the function and the x-axis between the bounds given.
The accumulation function has the following two properties:
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