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Deck 3: Vectors

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Question
In a rectangular coordinate system, the magnitude of a three-dimensional vector obeys all of the following rules except

A) it is at least as large as that of any single component.
B) it is smaller than the simple arithmetic sum of the magnitudes of the components.
C) it is the square root of the sum of the squares of the individual components.
D) it may be positive or negative, depending on the direction of the components.
Use Space or
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Question
The magnitude of the resultant vector obtained by adding any two vectors

A) is always at least as large as the magnitude of either vector.
B) is never larger than the simple arithmetic sum of the magnitudes of the two vectors.
C) is always the square root of the sum of the squares of the magnitudes of the two vectors.
D) may be positive or negative, depending on the directions of the two vectors.
Question
The dot product (A · B) of two vectors can be correctly thought of in all of the following ways except

A) the magnitude of A times the component of B in the direction of A.
B) the magnitude of B times the component of A in the direction of B.
C) the magnitude of A times the magnitude of B times the cos of the angle between A and B.
D) the magnitude of A times the magnitude of B times the sin of the angle between A and B.
Question
The magnitude of the cross product (A ×\times B) of two vectors can be correctly thought of in all of the following ways except

A) the magnitude of A times the component of B perpendicular to A.
B) the magnitude of B times the component of A perpendicular to B.
C) the magnitude of A times the magnitude of B times the cos of the angle between A and B.
D) the magnitude of A times the magnitude of B times the sin of the angle between A and B.
Question
All of the following combinations of vectors A and B are themselves vectors except

A) A + B.
B) A - B.
C) A · B.
D) A ×\times B.
Question
Vector A points horizontally toward the right of the paper. Vector B points perpendicular to the plane of the paper and toward the reader. The direction of A ×\times B is

A) in the plane of the paper, toward the top.
B) in the plane of the paper, toward the bottom.
C) in the plane of the paper, toward the left.
D) perpendicular to the plane of the paper.
Question
Consider vectors A and B (not parallel to each other). In a rotated coordinate system (compared to an original coordinate system), all of the following remain unchanged except

A) A · B.
B) A ×\times B.
C) |A| and |B|.
D) the components of A and the components of B.
Question
The angle between two vectors is equal to the (smallest) angle between their lengths when they are joined in all of the following ways except

A) tail to tail.
B) head to head.
C) head to tail.
D) Hold it! There are no exceptions.
Question
If A = 2i + 3j, and B = 2j + 3k, then A ×\times B is equal to

A) 2i + 5j + 3k.
B) 2i - 5j + 3k.
C) 9i - 6j + 4k.
D) 9i + 6j + 4k.
Question
If A = 2i + 3j, and B = 2j + 3k, then |A ×\times B| is equal to

A) 4 + 5 + 3 = 12.
B) (16+25+9)=50\sqrt { ( 16 + 25 + 9 ) } = \sqrt { 50 }
C) (81 + 36 + 16) = 133.
D) (81+36+16)=133\sqrt { ( 81 + 36 + 16 ) } = \sqrt { 133 }
Question
If A = 2i + 3j, and B = 2j + 3k, then A · B is equal to

A) 4 + 6 + 6 + 9 = +25.
B) 4 - 6 + 6 + 9 = +13.
C) 0 + 0 + 6 + 0 = +6.
D) 0 + 0 - 6 + 0 = -6.
Question
 If A×B=0, and A0,B0, then \text { If } \mathbf { A } \times \mathbf { B } = 0 \text {, and } | \mathbf { A } | \neq 0 , | \mathbf { B } | \neq 0 \text {, then }

A) A is perpendicular to B.
B) A is parallel to B.
C) either of the first two answers may be correct, depending on details not supplied.
D) neither of the first two answers is correct.
Question
 If AB=0, and A0,B0, then \text { If } \mathbf { A } \cdot \mathbf { B } = 0 \text {, and } | \mathbf { A } | \neq 0 , | \mathbf { B } | \neq 0 \text {, then }

A) A is perpendicular to B.
B) A is parallel to B.
C) either of the first two answers may be correct, depending on details not supplied.
D) neither of the first two answers is correct.
Question
The properties of a vector include

A) magnitude.
B) direction.
C) both of the above.
D) neither of the above.
Question
The properties of a scalar include

A) magnitude.
B) direction.
C) both of the above.
D) neither of the above.
Question
A vector A has the components Ax = 3.0 and Ay = 4.0. The magnitude of A is

A) 1.0.
B) 3.5.
C) 5.0.
D) 7.0.
Question
A vector A has a magnitude |A| and makes an angle θ\theta with respect to the x axis in a two-dimensional rectangular coordinate system. Ax is given by

A) |A| sin θ\theta .
B) |A| cos θ\theta .
C) |A| tan θ\theta .
D) none of the above.
Question
A vector A has a magnitude |A| and makes an angle θ\theta with respect to the y axis in a two-dimensional rectangular coordinate system. Ax is

A) |A| sin θ\theta .
B) |A| cos θ\theta .
C) |A| tan θ\theta .
D) none of the above.
Question
If vector A makes an angle of θ\theta with respect to the x axis and Ax is given in a two-dimensional rectangular coordinate system, then |A| is equal to Ax times

A) sin θ\theta .
B) l/(sin θ\theta ).
C) tan θ\theta .
D) l/(cos θ\theta ).
Question
Consider the vector A = 2i + 5j. Vectors parallel to A include

A) 4i + 10j.
B) 5i + 2j.
C) 5i - 2j.
D) none of the above.
Question
Consider the vector A = 2i + 5j. Vectors perpendicular to A include

A) 4i + 10j.
B) 5i + 2j.
C) 5i - 2j.
D) none of the above.
Question
Consider two vectors A and B. |A ×\times B| = |A| |B|. This implies that

A) A and B are perpendicular.
B) A and B are parallel.
C) the angle between A and B is 45°.
D) Hold it! Such a situation is not possible.
Question
If A, B, and C are nonzero vectors, the quantity A · B ×\times C cannot be

A) zero.
B) negative.
C) a scalar.
D) a vector.
Question
All of the following combinations of vectors A, B, and C are scalars except

A) A + B - C.
B) (A - B) · C.
C) A · B ×\times C.
D) A · B.
Question
All of the following combinations of vectors A, B, and C are vectors except

A) A + B + C.
B) (A · B)C.
C) A · B ×\times C.
D) A ×\times B.
Question
The dot product between vector A and vector B is 1, and the cross product between the two vectors is 2k. The angle between the two vectors

A) is 26.6°.
B) is 45.0°.
C) is 63.4°.
D) cannot be determined from the given information.
Question
If A = 2i + 2k and B = i + j, the angle between vector A and vector B is

A) 30°.
B) 45°.
C) 60°.
D) 90°.
Question
If A = 2i - 2j + k, B = i + 2j + 2k, and C = - i + 2j + k, the area of a parallelepiped whose edges are defined by the vectors A, B, and C is

A) 3.
B) 6.
C) 8.
D) 9.
Question
If A = 4i - 2j + 3k and B = 2i + j - 2k, the angle between vector A and vector B is

A) 0°.
B) 45°.
C) -45°.
D) 90°.
Question
If A = i + 3j and B = 3i + j, the angle between vector A and vector B is

A) 53°.
B) 30°.
C) 45°.
D) 37°.
Question
The angle between the diagonal of a cube and an edge is

A) 45.0°.
B) 54.7°.
C) 90.0°.
D) 35.3°.
Question
If A = 2i - 2j - k and B = i + 2j - 2k, the area of a parallelogram whose sides are defined by vectors A and B is

A) 0.
B) 3.
C) 6.
D) 9.
Question
 Determine the result for the following operation: (k×i)×(j×k)\text { Determine the result for the following operation: } ( \mathbf { k } \times \mathbf { i } ) \times ( \mathbf { j } \times \mathbf { k } ) \text {. }

A) -k
B) k
C) 0
D) 1
Question
 Determine the result for the following operation: k×[k×(j×k)]\text { Determine the result for the following operation: } \mathbf { k } \times [ \mathbf { k } \times ( \mathbf { j } \times \mathbf { k } ) ] \text {. }

A) 0
B) -j
C) -i
D) j
Question
If A = -i + 2j + k and B = i + j + 2k, the angle between vectors A and B is

A) 53°.
B) 30°.
C) 37°.
D) 60°.
Question
 The resulting unit vector for the operation k×[j×(j×i)] is \text { The resulting unit vector for the operation } \mathbf { k } \times [ \mathbf { j } \times ( \mathbf { j } \times \mathbf { i } ) ] \text { is }

A) the null vector.
B) -j.
C) -i.
D) j.
Question
A person walks one block north, two blocks west, and then two blocks northwest. The magnitude and direction of the resultant are

A) 4.2 blocks at an angle of 55° west of north.
B) 4.2 blocks at an angle of 35° west of north.
C) 5.0 blocks at an angle of 55° west of north.
D) 5.0 blocks at an angle of 35° west of north.
Question
If A = 2i + j - k, B = 2i - 3j + 3k, R = i - j + 4k, and A + B + C = R, then C is

A) 5i - 3j + 6k.
B) -3i + j + 2k.
C) 3i - j - 2k.
D) -3i + j 2k. -
Question
If A = i + 2j and B = 2i - j, the angle between vectors A and B is

A) 30°.
B) -45°.
C) 60°.
D) 90°.
Question
If A = 2i - 3j + 2k and B = -i + j + 2k, the unit vector in the direction given by the difference A - B is

A) (3/5)i - (4/5)j.
B) 3i + 4j.
C) 3i - 4j.
D) (3/5)i + (4/5)j.
Question
If A = 3i - 2j + 2k and B = i + 2j + 2k, the unit vector perpendicular to both vectors A and B is

A) -(2/3)i - (1/3)j + (2/3)k.
B) -(2/3)i - (2/3)j - (1/3)k.
C) (2/3)i + (1/3)j + (2/3)k.
D) none of the above.
Question
If A = 2i - j - 2k and B = i - 2j + 3k, the cross product A ×\times B is

A) -7i - 8j - 3k.
B) -7i + 8j - 3k.
C) +7i + 8j + 3k.
D) -7i - 8j + 3k.
Question
If A = 2i - j - 2k and B = i - 2j + 3k, the dot product A · B is given by

A) 0.
B) 2.
C) -8.
D) none of the above.
Question
Let vector A = 3.0i + 2.0j. A new rectangular coordinate system is generated by a 45° counterclockwise rotation about the k axis. Vector A in the new coordinate system is given by

A) 3.5i - 0.71j.
B) 2.0i + 3.0j.
C) 3.5i + 0.71j.
D) 2.0i - 3.0j.
Question
Points (0,0,0), (1,1,0), and (0,1,1) belong to the same plane. The vector that is perpendicular to the plane is

A) j + k.
B) i.
C) i - j - k.
D) i - j + k.
Question
If A = -2i - 4j + 4k and B = i - 2j + 2k, the vector of magnitude 2 that is perpendicular to both A and B is

A) (j + k).
B) 2(jk)\sqrt { 2 ( \mathbf { j } - \mathbf { k } ) }
C) 2(j+k)\sqrt { 2 ( \mathbf { j } + \mathbf { k } ) }
D) (j - k).
Question
Let vector A = -2i - j + 2k. The unit vector parallel to vector A is

A) -i - j + k.
B) -(2/3)i - (1/3)j + (2/3)k.
C) i + j - k.
D) none of the above.
Question
A vector A has a magnitude of 3.0 units and makes an angle of 30° with the + x axis in a two-dimensional rectangular coordinate system. Ay is equal to

A) 1.5 units.
B) -1.5 units.
C) 2.6 units.
D) -2.6 units.
Question
If A = -2i - 4j + 4k, B = i + 2j - 2k, and C = 2i - 3j + 2k, then A·(B ×\times C) is

A) 0.
B) 4i + 24j - 28k.
C) -48.
D) -4i - 24j + 28k.
Question
The dot product of a cross product of three vectors A·(B ×\times C) represents

A) the area of the parallelogram defined by B and C.
B) the area of the parallelogram defined by A and B.
C) the volume of the parallelepiped with sides A, B, and C.
D) none of the above.
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Deck 3: Vectors
1
In a rectangular coordinate system, the magnitude of a three-dimensional vector obeys all of the following rules except

A) it is at least as large as that of any single component.
B) it is smaller than the simple arithmetic sum of the magnitudes of the components.
C) it is the square root of the sum of the squares of the individual components.
D) it may be positive or negative, depending on the direction of the components.
it may be positive or negative, depending on the direction of the components.
2
The magnitude of the resultant vector obtained by adding any two vectors

A) is always at least as large as the magnitude of either vector.
B) is never larger than the simple arithmetic sum of the magnitudes of the two vectors.
C) is always the square root of the sum of the squares of the magnitudes of the two vectors.
D) may be positive or negative, depending on the directions of the two vectors.
is never larger than the simple arithmetic sum of the magnitudes of the two vectors.
3
The dot product (A · B) of two vectors can be correctly thought of in all of the following ways except

A) the magnitude of A times the component of B in the direction of A.
B) the magnitude of B times the component of A in the direction of B.
C) the magnitude of A times the magnitude of B times the cos of the angle between A and B.
D) the magnitude of A times the magnitude of B times the sin of the angle between A and B.
the magnitude of A times the magnitude of B times the sin of the angle between A and B.
4
The magnitude of the cross product (A ×\times B) of two vectors can be correctly thought of in all of the following ways except

A) the magnitude of A times the component of B perpendicular to A.
B) the magnitude of B times the component of A perpendicular to B.
C) the magnitude of A times the magnitude of B times the cos of the angle between A and B.
D) the magnitude of A times the magnitude of B times the sin of the angle between A and B.
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5
All of the following combinations of vectors A and B are themselves vectors except

A) A + B.
B) A - B.
C) A · B.
D) A ×\times B.
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6
Vector A points horizontally toward the right of the paper. Vector B points perpendicular to the plane of the paper and toward the reader. The direction of A ×\times B is

A) in the plane of the paper, toward the top.
B) in the plane of the paper, toward the bottom.
C) in the plane of the paper, toward the left.
D) perpendicular to the plane of the paper.
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7
Consider vectors A and B (not parallel to each other). In a rotated coordinate system (compared to an original coordinate system), all of the following remain unchanged except

A) A · B.
B) A ×\times B.
C) |A| and |B|.
D) the components of A and the components of B.
Unlock Deck
Unlock for access to all 50 flashcards in this deck.
Unlock Deck
k this deck
8
The angle between two vectors is equal to the (smallest) angle between their lengths when they are joined in all of the following ways except

A) tail to tail.
B) head to head.
C) head to tail.
D) Hold it! There are no exceptions.
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Unlock for access to all 50 flashcards in this deck.
Unlock Deck
k this deck
9
If A = 2i + 3j, and B = 2j + 3k, then A ×\times B is equal to

A) 2i + 5j + 3k.
B) 2i - 5j + 3k.
C) 9i - 6j + 4k.
D) 9i + 6j + 4k.
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10
If A = 2i + 3j, and B = 2j + 3k, then |A ×\times B| is equal to

A) 4 + 5 + 3 = 12.
B) (16+25+9)=50\sqrt { ( 16 + 25 + 9 ) } = \sqrt { 50 }
C) (81 + 36 + 16) = 133.
D) (81+36+16)=133\sqrt { ( 81 + 36 + 16 ) } = \sqrt { 133 }
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11
If A = 2i + 3j, and B = 2j + 3k, then A · B is equal to

A) 4 + 6 + 6 + 9 = +25.
B) 4 - 6 + 6 + 9 = +13.
C) 0 + 0 + 6 + 0 = +6.
D) 0 + 0 - 6 + 0 = -6.
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12
 If A×B=0, and A0,B0, then \text { If } \mathbf { A } \times \mathbf { B } = 0 \text {, and } | \mathbf { A } | \neq 0 , | \mathbf { B } | \neq 0 \text {, then }

A) A is perpendicular to B.
B) A is parallel to B.
C) either of the first two answers may be correct, depending on details not supplied.
D) neither of the first two answers is correct.
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13
 If AB=0, and A0,B0, then \text { If } \mathbf { A } \cdot \mathbf { B } = 0 \text {, and } | \mathbf { A } | \neq 0 , | \mathbf { B } | \neq 0 \text {, then }

A) A is perpendicular to B.
B) A is parallel to B.
C) either of the first two answers may be correct, depending on details not supplied.
D) neither of the first two answers is correct.
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14
The properties of a vector include

A) magnitude.
B) direction.
C) both of the above.
D) neither of the above.
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15
The properties of a scalar include

A) magnitude.
B) direction.
C) both of the above.
D) neither of the above.
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16
A vector A has the components Ax = 3.0 and Ay = 4.0. The magnitude of A is

A) 1.0.
B) 3.5.
C) 5.0.
D) 7.0.
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17
A vector A has a magnitude |A| and makes an angle θ\theta with respect to the x axis in a two-dimensional rectangular coordinate system. Ax is given by

A) |A| sin θ\theta .
B) |A| cos θ\theta .
C) |A| tan θ\theta .
D) none of the above.
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18
A vector A has a magnitude |A| and makes an angle θ\theta with respect to the y axis in a two-dimensional rectangular coordinate system. Ax is

A) |A| sin θ\theta .
B) |A| cos θ\theta .
C) |A| tan θ\theta .
D) none of the above.
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19
If vector A makes an angle of θ\theta with respect to the x axis and Ax is given in a two-dimensional rectangular coordinate system, then |A| is equal to Ax times

A) sin θ\theta .
B) l/(sin θ\theta ).
C) tan θ\theta .
D) l/(cos θ\theta ).
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20
Consider the vector A = 2i + 5j. Vectors parallel to A include

A) 4i + 10j.
B) 5i + 2j.
C) 5i - 2j.
D) none of the above.
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21
Consider the vector A = 2i + 5j. Vectors perpendicular to A include

A) 4i + 10j.
B) 5i + 2j.
C) 5i - 2j.
D) none of the above.
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22
Consider two vectors A and B. |A ×\times B| = |A| |B|. This implies that

A) A and B are perpendicular.
B) A and B are parallel.
C) the angle between A and B is 45°.
D) Hold it! Such a situation is not possible.
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23
If A, B, and C are nonzero vectors, the quantity A · B ×\times C cannot be

A) zero.
B) negative.
C) a scalar.
D) a vector.
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24
All of the following combinations of vectors A, B, and C are scalars except

A) A + B - C.
B) (A - B) · C.
C) A · B ×\times C.
D) A · B.
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25
All of the following combinations of vectors A, B, and C are vectors except

A) A + B + C.
B) (A · B)C.
C) A · B ×\times C.
D) A ×\times B.
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26
The dot product between vector A and vector B is 1, and the cross product between the two vectors is 2k. The angle between the two vectors

A) is 26.6°.
B) is 45.0°.
C) is 63.4°.
D) cannot be determined from the given information.
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27
If A = 2i + 2k and B = i + j, the angle between vector A and vector B is

A) 30°.
B) 45°.
C) 60°.
D) 90°.
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28
If A = 2i - 2j + k, B = i + 2j + 2k, and C = - i + 2j + k, the area of a parallelepiped whose edges are defined by the vectors A, B, and C is

A) 3.
B) 6.
C) 8.
D) 9.
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29
If A = 4i - 2j + 3k and B = 2i + j - 2k, the angle between vector A and vector B is

A) 0°.
B) 45°.
C) -45°.
D) 90°.
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30
If A = i + 3j and B = 3i + j, the angle between vector A and vector B is

A) 53°.
B) 30°.
C) 45°.
D) 37°.
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Unlock Deck
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31
The angle between the diagonal of a cube and an edge is

A) 45.0°.
B) 54.7°.
C) 90.0°.
D) 35.3°.
Unlock Deck
Unlock for access to all 50 flashcards in this deck.
Unlock Deck
k this deck
32
If A = 2i - 2j - k and B = i + 2j - 2k, the area of a parallelogram whose sides are defined by vectors A and B is

A) 0.
B) 3.
C) 6.
D) 9.
Unlock Deck
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33
 Determine the result for the following operation: (k×i)×(j×k)\text { Determine the result for the following operation: } ( \mathbf { k } \times \mathbf { i } ) \times ( \mathbf { j } \times \mathbf { k } ) \text {. }

A) -k
B) k
C) 0
D) 1
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34
 Determine the result for the following operation: k×[k×(j×k)]\text { Determine the result for the following operation: } \mathbf { k } \times [ \mathbf { k } \times ( \mathbf { j } \times \mathbf { k } ) ] \text {. }

A) 0
B) -j
C) -i
D) j
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35
If A = -i + 2j + k and B = i + j + 2k, the angle between vectors A and B is

A) 53°.
B) 30°.
C) 37°.
D) 60°.
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36
 The resulting unit vector for the operation k×[j×(j×i)] is \text { The resulting unit vector for the operation } \mathbf { k } \times [ \mathbf { j } \times ( \mathbf { j } \times \mathbf { i } ) ] \text { is }

A) the null vector.
B) -j.
C) -i.
D) j.
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37
A person walks one block north, two blocks west, and then two blocks northwest. The magnitude and direction of the resultant are

A) 4.2 blocks at an angle of 55° west of north.
B) 4.2 blocks at an angle of 35° west of north.
C) 5.0 blocks at an angle of 55° west of north.
D) 5.0 blocks at an angle of 35° west of north.
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38
If A = 2i + j - k, B = 2i - 3j + 3k, R = i - j + 4k, and A + B + C = R, then C is

A) 5i - 3j + 6k.
B) -3i + j + 2k.
C) 3i - j - 2k.
D) -3i + j 2k. -
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39
If A = i + 2j and B = 2i - j, the angle between vectors A and B is

A) 30°.
B) -45°.
C) 60°.
D) 90°.
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40
If A = 2i - 3j + 2k and B = -i + j + 2k, the unit vector in the direction given by the difference A - B is

A) (3/5)i - (4/5)j.
B) 3i + 4j.
C) 3i - 4j.
D) (3/5)i + (4/5)j.
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41
If A = 3i - 2j + 2k and B = i + 2j + 2k, the unit vector perpendicular to both vectors A and B is

A) -(2/3)i - (1/3)j + (2/3)k.
B) -(2/3)i - (2/3)j - (1/3)k.
C) (2/3)i + (1/3)j + (2/3)k.
D) none of the above.
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42
If A = 2i - j - 2k and B = i - 2j + 3k, the cross product A ×\times B is

A) -7i - 8j - 3k.
B) -7i + 8j - 3k.
C) +7i + 8j + 3k.
D) -7i - 8j + 3k.
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43
If A = 2i - j - 2k and B = i - 2j + 3k, the dot product A · B is given by

A) 0.
B) 2.
C) -8.
D) none of the above.
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44
Let vector A = 3.0i + 2.0j. A new rectangular coordinate system is generated by a 45° counterclockwise rotation about the k axis. Vector A in the new coordinate system is given by

A) 3.5i - 0.71j.
B) 2.0i + 3.0j.
C) 3.5i + 0.71j.
D) 2.0i - 3.0j.
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45
Points (0,0,0), (1,1,0), and (0,1,1) belong to the same plane. The vector that is perpendicular to the plane is

A) j + k.
B) i.
C) i - j - k.
D) i - j + k.
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46
If A = -2i - 4j + 4k and B = i - 2j + 2k, the vector of magnitude 2 that is perpendicular to both A and B is

A) (j + k).
B) 2(jk)\sqrt { 2 ( \mathbf { j } - \mathbf { k } ) }
C) 2(j+k)\sqrt { 2 ( \mathbf { j } + \mathbf { k } ) }
D) (j - k).
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47
Let vector A = -2i - j + 2k. The unit vector parallel to vector A is

A) -i - j + k.
B) -(2/3)i - (1/3)j + (2/3)k.
C) i + j - k.
D) none of the above.
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48
A vector A has a magnitude of 3.0 units and makes an angle of 30° with the + x axis in a two-dimensional rectangular coordinate system. Ay is equal to

A) 1.5 units.
B) -1.5 units.
C) 2.6 units.
D) -2.6 units.
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49
If A = -2i - 4j + 4k, B = i + 2j - 2k, and C = 2i - 3j + 2k, then A·(B ×\times C) is

A) 0.
B) 4i + 24j - 28k.
C) -48.
D) -4i - 24j + 28k.
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50
The dot product of a cross product of three vectors A·(B ×\times C) represents

A) the area of the parallelogram defined by B and C.
B) the area of the parallelogram defined by A and B.
C) the volume of the parallelepiped with sides A, B, and C.
D) none of the above.
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