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Caculus II - 37

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David Mao
David Mao

Stewart Calculus 13.3

TecnologiaDiversão e humor
1 de 16
13.3 The Normal and Binormal Vectors At a given point on a space curve ( ), the unit tangent vector is () ()= | ( )| Since ( )· ( )= we have ( )· ( )= so () () We define the principal unit normal vector as () ()= | ( )|
We define the principal unit normal vector as () ()= | ( )| We define the binormal vector as ()= () () it is also unit. ( ), ( ), ( ) are three unit vectors, perpendicular to each other. They form a TNB frame at point ( ) .
The plane determined by the normal and binormal vectors at point is called the normal plane at . The plane determined by the tangent and normal vectors at point is called the osculating plane at . The circle that lies in the osculating plane towards the direction of , has the same tangent at and has radius / ( ) is called the osculating circle at . This circle describes the behavior of the curve at : it shares the same tangent, normal, curvature and osculating plane.
Ex: Find the unit normal and binormal vectors and the normal and osculating plane of the helix ( ) = , , at the point ( , , ).
Ex: Find the unit normal and binormal vectors and the normal and osculating plane of the helix ( ) = , , at the point ( , , ). ()= , ,
Ex: Find the unit normal and binormal vectors and the normal and osculating plane of the helix ( ) = , , at the point ( , , ). ()= , , () ()= = , , | ( )|
Ex: Find the unit normal and binormal vectors and the normal and osculating plane of the helix ( ) = , , at the point ( , , ). ()= , , () ()= = , , | ( )| ()= , ,
Ex: Find the unit normal and binormal vectors and the normal and osculating plane of the helix ( ) = , , at the point ( , , ). ()= , , () ()= = , , | ( )| ()= , , () ()= = , , | ( )|
Ex: Find the unit normal and binormal vectors and the normal and osculating plane of the helix ( ) = , , at the point ( , , ). ()= , , () ()= = , , | ( )| ()= , , () ()= = , , | ( )| ()= () ()= , ,
() ()= = , , | ( )| () ()= = , , | ( )| ()= () ()= , ,
() ()= = , , | ( )| () ()= = , , | ( )| ()= () ()= , , At the point ( , , ), = . ( )= , , ( )= , , ( )= , ,
( )= , , ( )= , , ( )= , ,
( )= , , ( )= , , ( )= , , The normal vector of the normal plane is ( ).
( )= , , ( )= , , ( )= , , The normal vector of the normal plane is ( ). The normal plane is ( )+ ( )+ ( )= or + =
( )= , , ( )= , , ( )= , , The normal vector of the normal plane is ( ). The normal plane is ( )+ ( )+ ( )= or + = The normal vector of the osculating plane is ( ).
( )= , , ( )= , , ( )= , , The normal vector of the normal plane is ( ). The normal plane is ( )+ ( )+ ( )= or + = The normal vector of the osculating plane is ( ). The osculating plane is ( ) ( )+ ( )= or =

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Caculus II - 37

  • 1. 13.3 The Normal and Binormal Vectors At a given point on a space curve ( ), the unit tangent vector is () ()= | ( )| Since ( )· ( )= we have ( )· ( )= so () () We define the principal unit normal vector as () ()= | ( )|
  • 2. We define the principal unit normal vector as () ()= | ( )| We define the binormal vector as ()= () () it is also unit. ( ), ( ), ( ) are three unit vectors, perpendicular to each other. They form a TNB frame at point ( ) .
  • 3. The plane determined by the normal and binormal vectors at point is called the normal plane at . The plane determined by the tangent and normal vectors at point is called the osculating plane at . The circle that lies in the osculating plane towards the direction of , has the same tangent at and has radius / ( ) is called the osculating circle at . This circle describes the behavior of the curve at : it shares the same tangent, normal, curvature and osculating plane.
  • 4. Ex: Find the unit normal and binormal vectors and the normal and osculating plane of the helix ( ) = , , at the point ( , , ).
  • 5. Ex: Find the unit normal and binormal vectors and the normal and osculating plane of the helix ( ) = , , at the point ( , , ). ()= , ,
  • 6. Ex: Find the unit normal and binormal vectors and the normal and osculating plane of the helix ( ) = , , at the point ( , , ). ()= , , () ()= = , , | ( )|
  • 7. Ex: Find the unit normal and binormal vectors and the normal and osculating plane of the helix ( ) = , , at the point ( , , ). ()= , , () ()= = , , | ( )| ()= , ,
  • 8. Ex: Find the unit normal and binormal vectors and the normal and osculating plane of the helix ( ) = , , at the point ( , , ). ()= , , () ()= = , , | ( )| ()= , , () ()= = , , | ( )|
  • 9. Ex: Find the unit normal and binormal vectors and the normal and osculating plane of the helix ( ) = , , at the point ( , , ). ()= , , () ()= = , , | ( )| ()= , , () ()= = , , | ( )| ()= () ()= , ,
  • 10. () ()= = , , | ( )| () ()= = , , | ( )| ()= () ()= , ,
  • 11. () ()= = , , | ( )| () ()= = , , | ( )| ()= () ()= , , At the point ( , , ), = . ( )= , , ( )= , , ( )= , ,
  • 12. ( )= , , ( )= , , ( )= , ,
  • 13. ( )= , , ( )= , , ( )= , , The normal vector of the normal plane is ( ).
  • 14. ( )= , , ( )= , , ( )= , , The normal vector of the normal plane is ( ). The normal plane is ( )+ ( )+ ( )= or + =
  • 15. ( )= , , ( )= , , ( )= , , The normal vector of the normal plane is ( ). The normal plane is ( )+ ( )+ ( )= or + = The normal vector of the osculating plane is ( ).
  • 16. ( )= , , ( )= , , ( )= , , The normal vector of the normal plane is ( ). The normal plane is ( )+ ( )+ ( )= or + = The normal vector of the osculating plane is ( ). The osculating plane is ( ) ( )+ ( )= or =

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