Forces of magnitudes 3 and 4 unit acting alon 6i + 2j + 3k and 3i

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 Multiple Choice QuestionsMultiple Choice Questions

61.

If a, b, c be three unit vectors such that a × b × c = 12bb and c being non-parallel. If θ1 is the angle between a and b and θ2 is the angle between a and c, then

  • θ1 = π6, θ2 = π3

  • θ1 = π3, θ2 = π6

  • θ1 = π2, θ2 = π3

  • θ1 = π3, θ2 = π2


62.

The r2 - r . c + h = 0c > h, represents

  • circle

  • ellipse

  • cone

  • sphere


63.

a = i^ - j^ + k^ and b = 2i^ + 4j^ + 3k^ are one of the sides and medians respectively, of a triangle through the same vertex, then area of the triangle is

  • 1283

  • 83

  • 1285

  • 86


64.

If b is a unit vector, then a . bb + ba × b is :

  • a2 b

  • a . ba

  • a

  • b


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65.

The position vectors of the points A and B with respect to O are 2i + 2j + k and 2i + 4j+ 4k. The length of the internal bisector of BOA of AOB is

  • 1369

  • 1363

  • 203

  • 2179


66.

Given (a x b) x (c x d) = 5c x 6d, then the value of (a . b) x (a + c + 2d) is

  • 7

  • 16

  • - 1

  • 4


67.

Let a, b and c be non-zero vectors such that a × b × c = - 14bca.  If θ the acute angle between the vectors b and c, then the angle between a and c is equal to

  • 2π3

  • π4

  • π3

  • π2


68.

A vector of magnitude 12 unit perpendicular to the plane containing the vectors 4i + 6j - k and 3i + 8j + k is

  • - 8i + 4j + 8k

  • 8i + 4j + 8k

  • 8i - 4j + 8k

  • 8i - 4j - 8k


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69.

Forces of magnitudes 3 and 4 unit acting alon 6i + 2j + 3k and 3i - 2j + 6k, respectively act on a particle and displace it from (2, 2,- 1) to (4, 3, 1). The work done is

  • 1247

  • 1207

  • 1257

  • 1217


A.

1247

Let  F1 = 6i + 2j + 3k

and F2 = 3i - 2j + 6k

    F1 = 36i + 2j + 3k7            = 18i + 6j + 9k7and F2 = 43i - 2j + 6k7            = 12i - 8j + 24k7 F = F1 + F2 = 1718i + 6j + 9k + 12i - 8j + 24k    = 1730i - 2j + 33k

Let  OA = 2i + 2j-kand OB = 4j+ 3j + k      d = OB - OA = 2i + j+ 2k Workdone= F . d = 1730i - 2j + 33k . 2i + j + 2k= 60 - 2 + 667= 1247


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70.

If ABCD be a parallelogram and M be the point of intersection of the diagonals. If O is any point, then OA + OB + OC + OD is

  • 3OM

  • 4OM

  • OM

  • 2OM


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