Question:medium
Let \( \vec{a} \) be any vector such that \( |\vec{a}| = a \). The value of
\[
|\vec{a} \times \hat{i}|^2 + |\vec{a} \times \hat{j}|^2 + |\vec{a} \times \hat{k}|^2
\]
is:
Let \( \vec{a} \) be any vector such that \( |\vec{a}| = a \). The value of
\[
|\vec{a} \times \hat{i}|^2 + |\vec{a} \times \hat{j}|^2 + |\vec{a} \times \hat{k}|^2
\]
is:
Show Hint
Cross product magnitudes depend on sine of the angle between vectors.
Updated On: Jan 13, 2026
- \( a^2 \)
- \( 2a^2 \)
- \( 3a^2 \)
- \( 0 \)
Show Solution
The Correct Option is B
Solution and Explanation
Phase 1: Retrieve the cross product magnitude formula.
The magnitude of the cross product is stated as: \[ |\vec{a} \times \hat{i}| = |\vec{a}||\hat{i}|\sin\theta. \]
Phase 2: Calculate each component.
For \( \vec{a} \times \hat{i} \), \( \vec{a} \times \hat{j} \), and \( \vec{a} \times \hat{k} \), the combined contributions along two axes are: \[ |\vec{a} \times \hat{i}|^2 + |\vec{a} \times \hat{j}|^2 + |\vec{a} \times \hat{k}|^2 = 2a^2. \]
Phase 3: Confirm the solution.
The derived value is \( 2a^2 \), corresponding to option (B).
The magnitude of the cross product is stated as: \[ |\vec{a} \times \hat{i}| = |\vec{a}||\hat{i}|\sin\theta. \]
Phase 2: Calculate each component.
For \( \vec{a} \times \hat{i} \), \( \vec{a} \times \hat{j} \), and \( \vec{a} \times \hat{k} \), the combined contributions along two axes are: \[ |\vec{a} \times \hat{i}|^2 + |\vec{a} \times \hat{j}|^2 + |\vec{a} \times \hat{k}|^2 = 2a^2. \]
Phase 3: Confirm the solution.
The derived value is \( 2a^2 \), corresponding to option (B).
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