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Vector-Valued Functions. Step by Step: Finding Domain of a Vector-Valued Function 1.Find the domain of each component function 2.The domain of the vector-valued.

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Presentation on theme: "Vector-Valued Functions. Step by Step: Finding Domain of a Vector-Valued Function 1.Find the domain of each component function 2.The domain of the vector-valued."— Presentation transcript:

1 Vector-Valued Functions

2 Step by Step: Finding Domain of a Vector-Valued Function 1.Find the domain of each component function 2.The domain of the vector-valued function is the intersection of all the domains from step 1

3 Review: Finding the domain

4 1. Find the domain of the vector- valued function (Similar to p.839 #1-8)

5 2. Find the domain of the vector- valued function (Similar to p.839 #1-8)

6 3. Evaluate (if possible) the vector- valued function at each given value of t (Similar to p.839 #9-12)

7 4. Evaluate (if possible) the vector- valued function at each given value of t (Similar to p.839 #9-12)

8

9 Review Given: initial point P(x 1, y 1,z 1 ) and terminal point Q (x 2, y 2,z 2 ) Direction Vector v = = Vector-Valued Function r(t) = (x 1 + at)i + (y 1 + bt)j + (z 1 + ct)k Parametric Equation x = x 1 + at y = y 1 + bt z = z 1 + ct

10 6. Represent the line segment from P to Q by a vector-valued function and by a set of parametric equations (Similar to p.839 #15-18) P(2, 1, -3) Q(4, 7, -5)

11 7. Find r(t). u(t) (Similar to p.839 #19-20)

12 8. Match the equation with its graph. (Similar to p.839 #21-24)

13 9. Sketch the curve represented by the vector-valued function and give the orientation of the curve (Similar to p.840 #27-42)

14 10. Sketch the curve represented by the vector-valued function and give the orientation of the curve (Similar to p.840 #27-42)

15 11. Sketch the curve represented by the vector-valued function and give the orientation of the curve (Similar to p.840 #27-42)

16 12. Sketch the curve represented by the vector-valued function and give the orientation of the curve (Similar to p.840 #27-42)

17 13. Sketch the space curve represented by the intersection of the surfaces. Then represent the curve by a vector valued function using the given parameter (Similar to p.840 #59-66) SurfacesParameter x = 2 + sin(t)

18 14. Find the limit (if it exists) (Similar to p.840 #69-74)

19 15. Find the limit (if it exists) (Similar to p.840 #69-74)

20 16. Determine the interval(s) on which the vector-valued function is continuous (Similar to p.841 #75-80)

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