Linear algebra constitutes today one of the most important basic theories
of modern mathematics. During the period of the curricular reform movement,
also called "modern mathematics", linear algebra even replaced proper
geometry teaching within the school curriculum. While comparing
mathematical cultures, it might be useful to comment on developments at the
“periphery”, where their innovations often go beyond the state of the art attained
in the “metropoles,” even though these innovations may be noticed indirectly at
best.
Hüseyin Tevfik Pasha (1832-1901), educated at the ‘Mühendishane’
(Military School of Engineering) at Istanbul, was active there and in private
endeavours of teaching mathematics and the sciences. His Linear Algeba saw
two editions in Istanbul in 1882 and 1892. Tevfik Pasha's notion of “linear
algebra” originates from an approach aiming at generalizing the notion of
multiplication to lines in the two- and the three-dimensional case, thus
establishing a version of vectorial calculus. His focus on Argand as his source
of motivation was conditioned by the lens of reception as practiced by Tait’s
school of quaternionists.
Linear algebra constitutes today one of the most important basic theories of modern mathematics. During the period of the curricular reform movement, also called "modern mathematics", linear algebra even replaced proper geometry teaching within the school curriculum. While comparing mathematical cultures, it might be useful to comment on developments at the “periphery”, where their innovations often go beyond the state of the art attained in the “metropoles,” even though these innovations may be noticed indirectly at best.
Hüseyin Tevfik Pasha (1832-1901), educated at the ‘Mühendishane’ (Military School of Engineering) at Istanbul, was active there and in private endeavours of teaching mathematics and the sciences. His Linear Algeba saw two editions in Istanbul in 1882 and 1892. Tevfik Pasha's notion of “linear algebra” originates from an approach aiming at generalizing the notion of multiplication to lines in the two- and the three-dimensional case, thus establishing a version of vectorial calculus. His focus on Argand as his source of motivation was conditioned by the lens of reception as practiced by Tait’s school of quaternionists.
Birincil Dil | Türkçe |
---|---|
Bölüm | Araştırma Makaleleri |
Yazarlar | |
Yayımlanma Tarihi | 1 Haziran 2007 |
Yayımlandığı Sayı | Yıl 2007 Cilt: 8 Sayı: 2 |