The points with position vectors 60i + 3j, 40i - 8 j and ai - 52j

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 Multiple Choice QuestionsMultiple Choice Questions

381.

The scalar A · {(B + C) x (A + B + C)} equals

  • [ABC][BCA]

  • [ABC]

  • 0

  • None of these


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382.

The points with position vectors 60i + 3j, 40i - 8 j and ai - 52j are collinear, if

  • a = - 40

  • a = 40

  • a = - 20

  • a = 20


A.

a = - 40

Given that the points with position vectors 60i + 3j, 40i - 8j and ai - 52j are collinear, then there exist three scalars 1, x and y such that

1 + x + y = 0       ...(i)

and (60i + 3j) . 1 + (40i - 8j) . x + (ai - 52j) . y = 0

 (60 + 40x + ay)i + (3 - 8x - 52y)j = 0

         = 0i + 0j

Comparing both sides, we get

   60 + 40x + ay = 0       ...(i)

and 3 - 8x - 52y = 0       ...(iii)

Solving Eqs. (i) and (iii), we get

x = - 54, y = 14

Then, from Eq. (ii),

60 + 40- 54 + a14 = 0 a4 = - 10  a = - 40


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383.

If θ is the angle between vectors p = ai + bj + ck and q = bi + cj + ak, then θ lies in

  • 0, π2

  • π2, π

  • π2, 2π3

  • 0, 2π3


384.

If a, b and c are non-coplanar vectors and p = b × ca b c, q = q = c × aa b c and r = a × ba b c, then a . p + b . q + c . r is equal to

  • 3

  • - 3

  • 0

  • None of the above


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385.

If a = 2i - 3j + 6k and b = - 2i + 2i - k, then Projection of a on bProjection of b on a is equal to

  • 1

  • 7/3

  • 3/7

  • - 1/6


386.

The value of i + j . j + k × k + i is

  • 0

  • 1

  • - 1

  • 2


387.

If a^ and b^ are unit vectors and 0 is the angle between them, then sinθ2 is equal to

  • a^ + b^2

  • a^ - b^2

  • a^ - b^2

  • a^ - b^


388.

If a, b and c are three non-zero, non-coplanar vectors, then the value of a x a' + b x b'+ c x c' is

  • 1

  • 0

  • - 1

  • None of the above


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389.

Three concurrent edges of a parallelopiped are given by

       a = 2i^ - 3j^ + k^       b = i^ - j^ + 2k^and c = 2i^ + j^ - k^

The volume of the parallelopiped is

  • 14 cu units

  • 20 cu units

  • 25 cu units

  • 60 cu units


390.

The number of vectors of unit length perpendicular to vectors a = i^ + j^ and b = j^ + k^

  • infinite

  • one

  • two

  • three


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