Abstract
This article concerns the unsolved riddle of the continuum of the extension of time and space. It becomes solvable if one takes the two different relationships that can exist between extension and point as a basis: the primary relationship in the synthetic continuum and the secondary relationship in the analytical continuum. Time and space can then be deduced from the primary relationship between extension and point as each special extension. And this deduction corresponds exactly to the synthesis of time and space that Kant seeks to develop.
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