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12.4 Tangent Vectors and Normal Vectors
By Dr. Julia Arnold
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I am going to list the important theorems and definitions from this section and then we will look at some problems. Definition of the Unit Tangent Vector Let C be a smooth curve represented by r on an open interval I. The unit tangent vector T(t) at t is defined as Definition of Principal Unit Normal Vector Let C be a smooth curve represented by r on an open interval I. If then the Principal Unit Normal Vector at is defined as
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Theorem 12.4 Acceleration Vector
If r(t) is the position vector for a smooth curve C and N(t) exists , then the acceleration vector a(t) lies in the plane determined by T(t) and N(t). Theorem Tangential and Normal Components of Acceleration If r(t) is the position vector for a smooth curve C for which N(t) exists, then the tangential and normal components of acceleration are as follows:
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Example 1 find the unit tangent vector to the curve at the specified value of the parameter.
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Problem #16 in the HW text.
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Problem 22: Verify that the space curves intersect at the given values of the parameters. Find the angles between the tangent vectors to the curve at the point of intersection. Solution:
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Problem 28: Find the principal unit normal vector to the curve at the specified value of the parameter. Solution: Continued on next slide
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Find v(t), a(t), T(t) and N(t) for r(t)= t2j + k
Problem 34 Find v(t), a(t), T(t) and N(t) for r(t)= t2j + k Is the speed changing or unchanging? Solution: V(t) would be the velocity vector and equal to r’(t) a(t) is the acceleration vector and would be the derivative or the velocity vector or r”(t) The speed is variable
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Problem 58: Find T(t), N(t), aT, aN, at the given time t for the space curve r(t). [Hint: Find a(t), T(t), aT, and aN. Solve for N in the equation a(t)= aTT + aNN.] Solution:
![Problem 58: Find T(t), N(t), aT, aN, at the given time t for the space curve r(t). [Hint: Find a(t), T(t), aT, and aN. Solve for N in the equation a(t)= aTT + aNN.]](http://slideplayer.com/slide/14950316/91/images/10/Problem+58%3A+Find+T%28t%29%2C+N%28t%29%2C+aT%2C+aN%2C+at+the+given+time+t+for+the+space+curve+r%28t%29.+%5BHint%3A+Find+a%28t%29%2C+T%28t%29%2C+aT%2C+and+aN.+Solve+for+N+in+the+equation+a%28t%29%3D+aTT+%2B+aNN.%5D.jpg "Solution:")
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Problem 58 Continued From slide 2 Continued
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a(t)= aTT + aNN.] Problem 58 Continued This is an easier way of finding N rather than differentiating
![a(t)= aTT + aNN.] Problem 58 Continued.](http://slideplayer.com/slide/14950316/91/images/12/a%28t%29%3D+aTT+%2B+aNN.%5D+Problem+58+Continued..jpg "This is an easier way of finding N rather than differentiating.")
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Definition of Unit Binormal vector: Find the vectors T and N
Definition of Unit Binormal vector: Find the vectors T and N. For the vector valued function r( t ) at the given value of t. The Unit Binormal vector is Problem 76 Solution: Continued
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This concludes the sample problems from 12.4
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