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MA 1111: Linear Algebra I Tutorial problems, October 7, 2015 1. Let u, v, w be some vectors in 3d space. Which of the following products are defined (and why): u × (v × w), v × (u · w), u × v × w, (u · w) · v, u · (w · v), (u × v) · w, u · v · w. 2. Show that for all 3d vectors u, v, w we have u × (v × w) + v × (w × u) + w × (u × v) = 0 (Hint: in class, we proved that u × (v × w) = (u · w) · v − (u · v) · w.) 3. How many solutions, depending on the parameter a, does the following system of equations have? x + ay = 1, ax + y = 0. 4. Draw the image of the letter R from the picture under the transformation (a) (x, y) 7→ (x + 2, y + 3) (all first coordinates of points are increased by 2, all second coordinates — by 3); (b) . . . (x, y) 7→ (−x, y); (c) . . . (x, y) 7→ (x, 2 − y); (d) . . . (x, y) 7→ (y, x); (e) . . . (x, y) 7→ (2x, 2y); (f) . . . (x, y) 7→ (x, 2y); (g) . . . (x, y) 7→ (x, y + x). (h) What transforsmation one should apply to get the (Russian) letter (on the same place)? y 2 1 1 x