Without loss of generality Without loss of generality is a frequently used expression in mathematics . The term is used to indicate the assumption that follows is chosen arbitrarily, narrowing the premise to a particular case, but does not affect the validity of the proof in general. The other cases are also proven by some symmetry — or another equivalence or similarity . As a result, once a proof is given for the particular case, it is trivial to adapt it to prove the conclusion in all other cases.presence of symmetry. For example, if some property P of real numbers is known to be symmetric in x and y , namely that P is equivalent to P , then in proving that P holds for every x and y , one may assume , "without loss of generality", that x ≤ y . There is no loss of generality in this assumption, since once the case x ≤ y ⇒ P has been proved, the other case follows by y ≤ x ⇒ P ⇒ P , thereby showing that P holds for all cases.On the other hand , if such a symmetry cannot be established, then the use of "without loss of generality" is incorrect and can amount to an instance of proof by example — a logical fallacy of proving a claim by proving a non-representative example.Example Consider the following theorem :reasoning could be applied if the alternative assumption, namely, that the first object is blue, were made. As a result, the use of "without loss of generality" is valid in this case.
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