Show that r|(1) and r2(1) define the same line, where rị(t) = (3, –1, 4) + t (8, 12, –6) r2(1) = (11, 11, –2) + 1 (4, 6, –3) Hint: Show that r2(1) passes through (3, – 1, 4) and that the direction vectors for r¡(1) and r2(1) are parallel.

Show that r|(1) and r2(1) define the same line, where rị(t) = (3, –1, 4) + t (8, 12, –6) r2(1) = (11, 11, –2) + 1 (4, 6, –3) Hint: Show that r2(1) passes through (3, – 1, 4) and that the direction vectors for r¡(1) and r2(1) are parallel.

Elementary Linear Algebra (MindTap Course List)

8th Edition

ISBN:9781305658004

Author:Ron Larson

Publisher:Ron Larson

Chapter4: Vector Spaces

Section4.4: Spanning Sets And Linear Independence

Problem 76E: Let f1(x)=3x and f2(x)=|x|. Graph both functions on the interval 2x2. Show that these functions are...

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Question

Show that r|(1) and r2(1) define the same line, where
rị(t) = (3, –1, 4) + t (8, 12, –6)
r2(1) = (11, 11, –2) + 1 (4, 6, –3)
Hint: Show that r2(1) passes through (3, – 1, 4) and that the direction
vectors for r¡(1) and r2(1) are parallel.

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