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22 September, 15:58

a and b are vectors such that |a| = √3, |b| = 1, and the angle between them is 5π/6. Using scalar product, find the exact value of |2a + b|.

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  1. 22 September, 19:12
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    |2a + b| = 2√ (3) + 1

    Step-by-step explanation:

    |a| = √ (3)

    |b| = 1

    θ = 5π/6

    For scalar vectors, A. B = |a|.|b|. cosθ

    a

    |2a| = 2*√ (3) = 2√ (3)

    |2a + b| = 2√ (3) + 1

    Since we don't have to find the scalar or dot product, there's no need to use the formula requiring the angle between them

    |2a + b| = 2√ (3) + 1
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