RUANG BANACH PADA RUANG BARISAN 1 , p DAN
Abstract
The main object of the vectors are the vectors can be addedtogether and generate a vector, and produces a number is multipliedby another vector. Any set of objects with properties like this arecalled "vector space". Mathematical structure to be defined is aBanach space. Clearly defined Banach space vector space of real /complex normed and complete (with respect to the norm). Banachspace in this study examined the sequence space 1 , p and .Based on the purpose of this study is to assess the Banach spacewithin a sequence space 1 , p and , it is obtained that asequence space 1 , p and form Banach space if it meets therequirements of that sequence space 1 , p and is a vectorspace, normed sequence space, and normed sequence space withcomplete.
Moraref