हिंदी

If |a→×b→|=3 and a→.b→ = – 3, then angle between a→ and b→ is ______.

प्रश्न

If `|veca xx vecb| = sqrt(3)` and `veca.vecb` = – 3, then angle between `veca` and `vecb` is ______.

विकल्प

`(2π)/3`
`π/6`
`π/3`
`(5π)/6`

MCQ

रिक्त स्थान भरें

उत्तर

If `|veca xx vecb| = sqrt(3)` and `veca.vecb` = – 3, then angle between `veca` and `vecb` is `underlinebb((5π)/6)`.

Explanation:

Given,

`|veca xx vecb| = sqrt(3)` and `veca.vecb` = – 3

Then `|veca||vecb| sin θ = sqrt(3)` ...(i)

and `|veca||vecb| cos θ` = – 3 ...(ii)

On dividing (i) by (ii), we get

`sinθ/cosθ = sqrt(3)/-3 = (-1)/sqrt(3)`

`\implies` tan θ = `- tan (π/6)`

`\implies` θ = `π - π/6`

= `(5π)/6`

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If |a→×b→|=3 and a→.b→ = – 3, then angle between a→ and b→ is ______.

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If |a→×b→|=3 and a→.b→ = – 3, then angle between a→ and b→ is ______.

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