Let a = i^ - 2j^ + 3k^. If b is a vector such

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 Multiple Choice QuestionsMultiple Choice Questions

111.

If the vectors PQ = - 3i + 4j + 4k and PR = 5i - 2j + 4k are the sides of a PQR, then the length of the median through P is

  • 14

  • 15

  • 17

  • 18


112.

If a = i^ +2j^ + 2k^, b = 5 and the angle between a and b is π6, then the area of the triangle formed by these two vectors as two sides is

  • 154

  • 152

  • 15

  • 1532


113.

If a - b = 0 and a + b makes an angle of 60° with a, then

  • a = 2b

  • 2a = b

  • a = 3b

  • 3a = b


114.

If i^ + j^, j^ + k^, i^ + k^ are the position vectors of the vertices of a ABC taken in order, then A is equal to

  • π2

  • π5

  • π6

  • π3


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115.

Let a = i^ - 2j^ + 3k^. If b is a vector such that a · b = b2 and  a - b = 7, then b is equal to

  • 7

  • 3

  • 7

  • 3


A.

7

Given, a = i^ - 2j^ + 3k^

    a . b = b2

and a - b = 7, a - b2 = 7              a2 + b2 - 2a . b = 7 1 + 4 + 92 + b2 - 2b2 = 7 14 - b2 - 2b2 = 7              14 - b2 = 7 b2 = 7  b = 7


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116.

If a, b and c are three non-zero vectors such that each one of them being perpendicular to the sum of the other two vectors, then the value of a + b + c2 is

  • a2 + b2 + c2

  • a + b + c

  • 2a2 + b2 + c2

  • 12a2 + b2 + c2


117.

Let u, v and w be vectors such that u + v + w = 0. If u = 3, v = 4 and w = 5, then u - v + v · w + w · u is equal to

  • 0

  • - 25

  • 25

  • 50


118.

If λ3i^ + 2j^ - 6k^ is a unit vector, then the value of λ are

  • ± 17

  • ± 7

  • ± 43

  • ± 143


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119.

If the direction cosines of a vector of magnitude 3 are 23, - a3, 23, a >0, then the vector is

  • 2i^ + j^ + 2k^

  • 2i^ - j^ + 2k^

     

  • i^ - 2j^ + 2k^

  • i^ + 2j^ + 2k^


120.

Equation of the plane through the mid-point of the line segment joining the points P(4, 5, - 10), Q(- 1, 2, 1) and perpendicular to PQ is

  • r . 32i^ + 72j^ - 92k^ = 45

  • r . - i^ + 2j^ + k^ = 1352

  • r . 5i^ +3j^ - 11k^ + 1352 = 0

  • r . 5i^ + 3j^ - 11k^ = 1352


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