HÌNH HỌC VI PHÂN ( Differential geometry )
➤ Gửi thông báo lỗi ⚠️ Báo cáo tài liệu vi phạmNội dung chi tiết: HÌNH HỌC VI PHÂN ( Differential geometry )
HÌNH HỌC VI PHÂN ( Differential geometry )
V OF EDUCATION AND TRAINING hi Minh City University of Pedagogy fa ulty of mathematics and natural sciences□□□Differential GeometryAcademic supervisor HÌNH HỌC VI PHÂN ( Differential geometry ) r: DR. Nguyen Hà ThanhACADEMIC SUPERVISOR: DR. Nguyền Hà ThanhEssay Differential geometryHo Chi Minh City University Of Pedagogy Faculty of mathematics and natural sciences □□□OẠỊHỌC n.®SP -ITP. HÕ CHI WWH IDifferential GeometryAcademic supervisor: DR. Nguyễn Hà ThanhTeam memberACADEMIC SUPERVISOR: HÌNH HỌC VI PHÂN ( Differential geometry ) DR. Nguyên Hả ThanhEssay Differential geometryIntroductionIn this essay, we give some fundamental issues about curvess and surfaces theory with each iHÌNH HỌC VI PHÂN ( Differential geometry )
ndividual pan:Pari 1: CurvesChapter Ì. Vector functionChapter 2: Parametric curveChapter 3. Tangent, Normal.Chapter 4.Arc length of a curveChapter 5. V OF EDUCATION AND TRAINING hi Minh City University of Pedagogy fa ulty of mathematics and natural sciences□□□Differential GeometryAcademic supervisor HÌNH HỌC VI PHÂN ( Differential geometry ) .The osculating plane and normal, binormalChapter 3. First fundamental formChapter 4. First fundamental formand Arc Length of a CurveChapter 5. First fundamental formand angleChapter 6. First fundamental formand areaChapter 7. Second fundamental formChapter 8. Normal curvatureChapter 9. Principle cu HÌNH HỌC VI PHÂN ( Differential geometry ) rvatureChapter 10. Gaussian curvature. Mean curvatureV OF EDUCATION AND TRAINING hi Minh City University of Pedagogy fa ulty of mathematics and natural sciences□□□Differential GeometryAcademic supervisorV OF EDUCATION AND TRAINING hi Minh City University of Pedagogy fa ulty of mathematics and natural sciences□□□Differential GeometryAcademic supervisorGọi ngay
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