Let u = A B → and v = C D → where A ( − 3 , 5 ) , B ( 2 , 2 ) , C ( 3 , 4 ) , D ( − 2 , 7 ) . a) Verify that u and v have the same length. b) Verify that the line segments A B and C D have the same slope. c) Use Theorem 1 to show that u ≠ v . d) Graph u and v and use the graph to explain why u ≠ v .
Let u = A B → and v = C D → where A ( − 3 , 5 ) , B ( 2 , 2 ) , C ( 3 , 4 ) , D ( − 2 , 7 ) . a) Verify that u and v have the same length. b) Verify that the line segments A B and C D have the same slope. c) Use Theorem 1 to show that u ≠ v . d) Graph u and v and use the graph to explain why u ≠ v .
Solution Summary: The author explains that the given vectors are inversely equal, with the same magnitude.
Need a deep-dive on the concept behind this application? Look no further. Learn more about this topic, algebra and related others by exploring similar questions and additional content below.