41. If a→ is a nonzero vector of magnitude 'a' and λ a nonzero scalar, then λ a→ is unit vector if (A) λ = 1 (B) λ = –1 (C) a = | λ |(D) a = 1/|λ|

Vector λa→ is a unit vector if |λa→|=1 Now, |λa→|=1|λ||a→|=1|a→|=1|λ| [λ≠0]a=1|λ| [|a→|=a] ∴ Therefore, vectar λa→ is a unit vector if a= 1|λ| . Option (D)is correct.

41. If $\vec{a}$ is a nonzero vector of magnitude 'a' and λ a nonzero scalar, then λ $\vec{a}$ is unit vector if

(A) λ = 1

(B) λ = –1

(C) a = | λ

|(D) a = 1/|λ|

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Vishal Baghel | Contributor-Level 10

8 months ago

Vector $λ \vec{a}$ is a unit vector if $| λ \vec{a} | = 1$

Now,

$\begin{array}{l} | λ \vec{a} | = 1 \\ | λ | | \vec{a} | = 1 \\ | \vec{a} | = \frac{1}{| λ |} [λ \neq 0] \\ a = \frac{1}{| λ |} [| \vec{a} | = a] \end{array}$

$∴$ Therefore, vectar $λ \vec{a}$ is a unit vector if a= $\frac{1}{| λ |}$ .

Option (D)is correct.

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