Statement I : τ→ $$=$$ $$r^$$×$$F^$$ and τ→ ≠F→ ×r→Statement II : Cross product of vectors is commutative.

Correct option is 3If statement I is true but statement II is false.

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Statement I : $\vec{τ} = \hat{r} \times \hat{F} and \vec{τ} \neq \vec{F} \times \vec{r}$
Statement II : Cross product of vectors is commutative.

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If both statement I and statement II are true and statement II is the correct explanation of statement I.

If both statement I and statement II are true but statement II is not the correct explanation of statement I.

If statement I is true but statement II is false.

If both statement I and statement II are false.

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detailed solution

Correct option is C

Cross-product of two vectors is anti-commutative.i.e., A → ×B→ = −B→×A→

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Statement I : τ→ = r^×F^ and τ→ ≠F→ ×r→Statement II : Cross product of vectors is commutative.

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Statement I : $\vec{τ} = \hat{r} \times \hat{F} and \vec{τ} \neq \vec{F} \times \vec{r}$
Statement II : Cross product of vectors is commutative.