Orientable vs NonOrientable Surfaces and the Mobius Strip

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One property that a surface may or may not have is orientability. Loosely, this means it has two distinct sides. For example the surface of a sphere has an inside and an outside, but a Mobius Band only has one side. More specifically, a surface is orientable if we can continuously assign a field of normal vectors, which is like choosing one of the two sides. This is going to be useful for us in Vector Calculus as we will be talking about the flux across a surface from one side to the other, and so we will want to restrict to be talking about orientable surfaces. • MY VECTOR CALCULUS PLAYLIST: • ►VECTOR CALCULUS (Calc IV)    • Calculus IV: Vector Calculus (Line In...   • OTHER COURSE PLAYLISTS: • ►DISCRETE MATH:    • Discrete Math (Full Course: Sets, Log...   • ►LINEAR ALGEBRA:    • Linear Algebra (Full Course)   • ►CALCULUS I:    • Calculus I (Limits, Derivative, Integ...   • ► CALCULUS II:    • Calculus II (Integration Methods, Ser...   • ►MULTIVARIABLE CALCULUS (Calc III):    • Calculus III: Multivariable Calculus ...   • ►DIFFERENTIAL EQUATIONS:    • How to solve ODEs with infinite serie...   • OTHER PLAYLISTS: • ► Learning Math Series •    • 5 Tips To Make Math Practice Problems...   • ►Cool Math Series: •    • Cool Math Series   • BECOME A MEMBER: • ►Join:    / @drtrefor   • MATH BOOKS MERCH I LOVE: • ► My Amazon Affiliate Shop: https://www.amazon.com/shop/treforbazett • SOCIALS: • ►Twitter (math based):   / treforbazett   • ►Instagram (photography based):   / treforphotography  

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