axioms in A Sentence

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    Yet are these Axioms true?

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    Is this a theorem or an axiom?

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    Axiom has a very good trial coverage.

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    Does the Axiom of Choice hold?

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    There are many such Axioms, generally known as“large cardinal Axioms.”.

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    AXIOM knows this and has been living it for years.

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    Shouldn't there be an axiom that applies to this, too?

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    Axioms(1) Everything which exists, exists either in itself or in something else.

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    This is true, but one should not take it as an axiom.

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    Since that unfortunate axiom came into use, the whole universe has changed.

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    11

    In some cases these have found that the Axioms are not entirely correct;

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    This is an axiom of life, proved by life and confirmed by centuries.

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    Inference it is implicitly understood that those Axioms and rules of inference are such.

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    Following are his five Axioms, somewhat paraphrased to make the English easier to read.

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    15

    According to Trump, these Axioms are supported by the wisdom of the crowd(ad populim);

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    A fact or statement(as a proposition, axiom, postulate, or notion) taken for granted- Merriam-Webster.

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    One must always remember one axiom and not forget to put it into practice.

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    If one upholds this axiom, they will always live in darkness, corruption and torment.

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    19

    Contractual terms must be respected, whatever incredible conditions the parties agree on, this is an axiom.

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    Also, Euclid's Axiom(4) says that things which coincide with one another are equal to one another.

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    This old axiom is not just a cliché but has a lot of truth in it.

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    Very often I hear a rather controversial thesis, which quite a few interlocutors pass as an axiom.

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    In the next few chapters on geometry, you will be using these Axioms to prove some theorems.

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    To mean'A is weakly preferred to B'('A is preferred at least as much as B'), the Axioms are:.

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    Of course, these figures are not an axiom, they can change as the owner will be comfortable.

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    First, the axiom that we can deduce the future according to trends of the past must be questioned.

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    Euclid's first axiom was that things that are equal to the same things are equal to each other.

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    These Axioms form an active branch of research in modern set theory, but no hard conclusions have been reached.

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    It remains possible that new, as yet unknown, Axioms will show the Hypothesis to be true or false.

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    In mathematics, non-Euclidean geometry consists of two geometries based on Axioms closely related to those specifying Euclidean geometry.

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