Vector Algebra Vector Algebra Maths Class 12th Ncert Solutions Maths class 12th

34. Show that $| \vec{a} | \vec{b} + | \vec{b} |$ is perpendicular to $| \vec{a} | \vec{b} - | \vec{b} | \vec{a}$ for any two non-zero vectors $\vec{a}$ and $\vec{b}$

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Vishal Baghel | Contributor-Level 10

8 months ago

$(| \vec{a} | \vec{b} + | \vec{b} | \vec{a}) . (| \vec{a} | \vec{b} - | \vec{b} | \vec{a})$

$\begin{array}{l} = | \vec{a} | \vec{b} . | \vec{a} | \vec{b} - | \vec{a} | \vec{b} . | \vec{b} | \vec{a} + | \vec{b} | \vec{a} . | \vec{a} | \vec{b} - | \vec{b} | \vec{a} . | \vec{b} | \vec{a} \\ = {| \vec{a} |}^{2} \vec{b} . \vec{b} - {| \vec{b} |}^{2} \vec{a} . \vec{a} \\ = {| \vec{a} |}^{2} {| \vec{b} |}^{2} - {| \vec{b} |}^{2} {| \vec{a} |}^{2} \\ = 0 \end{array}$

$∴$ Therefore, $| \vec{a} | \vec{b} + | \vec{b} | \vec{a}$ and $| \vec{a} | \vec{b} - | \vec{b} | \vec{a}$ are perpendicular.

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