1. 6 6.1 © 2016 Pearson Education, Inc. Orthogonality and Least Squares INNER PRODUCT, LENGTH, AND ORTHOGONALITY

2. Slide 6.1- 2 © 2016 Pearson Education, Inc. INNER PRODUCT

3. Slide 6.1- 3 INNER PRODUCT  If and, then the inner product of u and v is. © 2016 Pearson Education, Inc.

4. Slide 6.1- 4 INNER PRODUCT © 2016 Pearson Education, Inc.

5. Slide 6.1- 5 THE LENGTH OF A VECTOR © 2016 Pearson Education, Inc.

6. Slide 6.1- 6 THE LENGTH OF A VECTOR  If we identify v with a geometric point in the plane, as usual, then coincides with the standard notion of the length of the line segment from the origin to v.  This follows from the Pythagorean Theorem applied to a triangle such as the one shown in the following figure.  For any scalar c, the length cv is times the length of v. That is, © 2016 Pearson Education, Inc.

7. Slide 6.1- 7 THE LENGTH OF A VECTOR  A vector whose length is 1 is called a unit vector.  If we divide a nonzero vector v by its length—that is, multiply by —we obtain a unit vector u because the length of u is.  The process of creating u from v is sometimes called normalizing v, and we say that u is in the same direction as v. © 2016 Pearson Education, Inc.

8. Slide 6.1- 8 THE LENGTH OF A VECTOR  Example 2: Let. Find a unit vector u in the same direction as v.  Solution: First, compute the length of v:  Then, multiply v by to obtain © 2016 Pearson Education, Inc.

9. Slide 6.1- 9 © 2016 Pearson Education, Inc.

10. Slide 6.1- 10  Example 4: Compute the distance between the vectors and.  Solution: Calculate  The vectors u, v, and are shown in the figure on the next slide.  When the vector is added to v, the result is u. © 2016 Pearson Education, Inc.

11. Slide 6.1- 11  Notice that the parallelogram in the above figure shows that the distance from u to v is the same as the distance from to 0. © 2016 Pearson Education, Inc.

12. Slide 6.1- 12 ORTHOGONAL VECTORS © 2016 Pearson Education, Inc.

13. Slide 6.1- 13 ORTHOGONAL VECTORS Theorem 1(b) Theorem 1(a), (b) Theorem 1(a) © 2016 Pearson Education, Inc.

14. Slide 6.1- 14 ORTHOGONAL VECTORS © 2016 Pearson Education, Inc.

15. Slide 6.1- 15 THE PYTHOGOREAN THEOREM © 2016 Pearson Education, Inc.

16. Slide 6.1- 16 ORTHOGONAL COMPLEMENTS © 2016 Pearson Education, Inc.

17. Slide 6.1- 17 ORTHOGONAL COMPLEMENTS © 2016 Pearson Education, Inc.

18. Slide 6.1- 18 ORTHOGONAL COMPLEMENTS  Since this statement is true for any matrix, it is true for A T.  That is, the orthogonal complement of the row space of A T is the null space of A T.  This proves the second statement, because. © 2016 Pearson Education, Inc.

19. Slide 6.1- 19 © 2016 Pearson Education, Inc.

20. Slide 6.1- 20  By the law of cosines, which can be rearranged to produce the equations on the next slide. © 2016 Pearson Education, Inc.

21. Slide 6.1- 21 © 2016 Pearson Education, Inc.