Three-Dimensional Space; Vectors Exercise Set 11.1 1. (a) (0, 0, 0),(3, 0, 0),(3, 5, 0),(0, 5, 0),(0, 0, 4),(3, 0, 4),(3, 5, 4),(0, 5, 4). (b) (0, 1, 0),(4, 1, 0),(4, 6, 0),(0, 6, 0),(0, 1, −2),(4, 1, −2),(4, 6, −2),(0, 6, −2). 2. Corners: (2, 2, ±2), (2, −2, ±2), (−2, 2, ±2), (−2, −2, ±2). y x z (–2, –2, 2) (–2, 2, 2) (–2, –2, –2) (–2, 2, –2) (2, –2, –2) (2, 2, –2) (2, –2, 2) (2, 2, 2) 3. Corners: (4, 2, −2), (4,2,1), (4,1,1), (4, 1, −2), (−6, 1, 1), (−6, 2, 1), (−6, 2, −2), (−6, 1, −2). (–6, 2, 1) (–6, 2, –2) y x z (–6, 1, –2) (4, 1, 1) (4, 1, –2) (4, 2, 1) 4. (a) (x2, y1, z1),(x2, y2, z1),(x1, y2, z1)(x1, y1, z2),(x2, y1, z2),(x1, y2, z2). (b) The midpoint of the diagonal has coordinates which are the coordinates of the midpoints of the edges. The midpoint of the edge (x1, y1, z1) and (x2, y1, z1) is 1 2 (x1 + x2), y1, z1 ; the midpoint of the edge (x2, y1, z1) and (x2, y2, z1) is x2, 1 2 (y1 + y2), z1 ; the midpoint of the edge (x2, y2, z1) and (x2, y2, z2) is x2, y2, 1 2 (z1 + z2) . Thus the coordinates of the midpoint of the diagonal are 1 2 (x1 + x2), 1 2 (y1 + y2), 1 2 (z1 + z2) . 5. (a) A single point on that line. (b) A line in that plane. (c) A plane in 3−space. 6. (a) R(1, 4, 0) and Q lie on the same vertical line, and so does the side of the triangle which connects them.

No comments found.
Login to post a comment
This item has not received any review yet.
Login to review this item
No Questions / Answers added yet.
Price $57.00
Add To Cart

Buy Now
Category Testbanks
Comments 0
Rating
Sales 0

Buy Our Plan

We have

The latest updated Study Material Bundle with 100% Satisfaction guarantee

Visit Now
{{ userMessage }}
Processing