Thanks! =The triangle inequality assures us that ||ỷ + w|| ≤ ||ỷ|| + ||w||. Let ở(2, -3) and find a nonzero vector, w, such that || + w|| = ||v|| + ||w||.

The given vector is v→=2, -3. We have to find a vector w→, when v→+w→=v→+w→.

Answered: The triangle inequality assures us that…

The triangle inequality assures us that || + w|| ≤ |||| + ||w||. Let v = (2, -3) and find a nonzero vector, w, such that || + w|| = ||v|| + ||w||.

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter3: Functions And Graphs

Section3.3: Lines

Problem 70E

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=
The triangle inequality assures us that ||ỷ + w|| ≤ ||ỷ|| + ||w||. Let ở
(2, -3) and find a nonzero vector, w, such that || + w|| = ||v|| + ||w||.

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