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प्रश्न
Find the angle between the line `bar r = (hat i + 2hat j + hat k) + lambda(hat i + hat j + hat k)` and the plane `bar r *(2hat i + hat j + hat k) = 8`.
उत्तर
Given line is `bar r = (hat i + 2hat j + hat k) + lambda(hat i + hat j + hat k)`
Given plane is `bar r *(2hat i + hat j + hat k) = 8`
Let `bar b = hat i + hat j + hat k` and
`bar n = 2 hat i + hat j + hat k`
`|bar b| = sqrt(1 + 1 + 1)`
= `sqrt 3` and
`|bar n| = sqrt (4 + 1 + 1)`
= `sqrt 6`
If θ is the acute angle between the given line and plane, then
`sin theta = |(bar b * bar n)/(|bar b| * |bar n|)|` ...(i)
We have
`bar b * bar n = (hat i + hat j + hat k) * (2 hat i + hat j + hat k)`
= (1) (2) + (1) (1) + (1) (1)
= 2 + 1 + 1
= 4
Also, `|bar b| = sqrt3`
`|bar n| = sqrt 6`
Put in equation (i), we get
`therefore sin theta = |4/(sqrt 3 * sqrt 6)|`
= `|4/(3 sqrt 2)|`
= `(2 sqrt 2)/3`
∴ `theta = sin^-1 ((2 sqrt2)/3)`
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