Solution: The dot product \(\mathbfu \cdot (\mathbfv + \mathbfw) = \mathbfu \cdot \mathbfv + \mathbfu \cdot \mathbfw\). Since \(\mathbfu\), \(\mathbfv\), and \(\mathbfw\) are unit vectors, each dot product is at most 1. The maximum occurs when \(\mathbfu\) aligns with both \(\mathbfv\) and \(\mathbfw\), i.e., \(\mathbfv = \mathbfw = \mathbfu\). Then \(\mathbfu \cdot (\mathbfv + \mathbfw) = 1 + 1 = 2\).

Solution: The dot product \(\mathbfu \cdot (\mathbfv + \mathbfw) = \mathbfu \cdot \mathbfv + \mathbfu \cdot \mathbfw\). Since \(\mathbfu\), \(\mathbfv\), and \(\mathbfw\) are unit vectors, each dot product is at most 1. The maximum occurs when \(\mathbfu\) aligns with both \(\mathbfv\) and \(\mathbfw\), i.e., \(\mathbfv = \mathbfw = \mathbfu\). Then \(\mathbfu \cdot (\mathbfv + \mathbfw) = 1 + 1 = 2\). - Get link 4share

📅 March 9, 2026 👤 scraface

Mar 09, 2026

Content is being prepared. Please check back later.

📚 You May Also Like These Articles