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    Mathematical propositions are necessary and strictly univ... — Carmelics
    Home/Modality & Possibility
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    Supports→There exist judgments in human cognition that are necessary, strictly universal, and purely a priori.

    Mathematical propositions are necessary and strictly universal.

    Modality & PossibilityTruth & Knowledge
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    Modality & PossibilityTruth & Knowledge

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    Related propositions within the same area of thought.
    If examples of necessary and strictly universal judgments can be found in scienc...The proposition that every alteration must have a cause is necessary and strictl...There exist judgments in human cognition that are necessary, strictly universal,...

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    Now it is easy to show that there actually are such judgments in human cognition which are necessary and in the strictest sense universal, and therefore purely a priori. If one wants an example from the sciences, then one need only take a look at any of the propositions of mathematics. If one wants such an example from the most common use of the understanding, then the proposition that every alteration must have a cause can serve.

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