Abstract
The ordinary and symmetrized partition rank and crank moments of higher order have been extensively studied. If we assign a weight $$\sharp (\lambda )$$ for the rank case and a weight $$\omega (\lambda )$$ for the crank case, where $$\sharp (\lambda )$$ and $$\omega (\lambda )$$ , respectively, denote the number of parts in the partition $$\lambda $$ and the number of ones in $$\lambda $$ , it will be shown that such weighted ordinary and symmetrized rank and crank moments of higher order are closely related to the corresponding rank and crank moments when the order is odd.
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