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Question Number 141122 by mathsuji last updated on 15/May/21

$M =< a; a + 1; a + 2; . . .; a + n >$ $N =< a; a^{2}; a^{3}; . . .; a^{n} >$ $b e a n i d e a l s i n Q [a]; w h e r e n \in 2 Z$ $M / N = ?$
Commented bymathsuji last updated on 16/May/21

$S i r, m r . W p l e a s e . . .$
Commented bymr W last updated on 16/May/21

$i {d o n}^{'} t u n d e r s t a n d t h e q u e s t i o n .$ $c a n y o u p l e a s e e x p l a i n m e ?$
Commented bymathsuji last updated on 16/May/21

$d e a r S i r, I M a n d N i s a n i d e a l s$ $o f r i n g Q [a], c l e a r M s u b s e t o f N,$ $I w i l l a s k w h a t i s t h e f a c t o r r i n g a s$ $a n i s o m o r p h i c . . .$
Commented bymr W last updated on 16/May/21

$i {d o n}^{'} t k n o w t h i s k i n d o f t h i n g .$
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