DOT PRODUCT AND CROSS PRODUCT
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VECTORS

268946 If \(\vec{A}\) along North and \(\vec{B}\) along vertically upward then the direction of \(\vec{A} \times \vec{B}\) is along

1 west
2 south
3 east
4 vertically downwards
VECTORS

268947 The angle between \((\vec{A}+\vec{B}) \&(\vec{A} \times \vec{B})\)

1 0
2 \(\pi / 4\)
3 \(\pi / 2\)
4 \(\pi\)
VECTORS

268934 Cross product of vectors obeys

1 commutative law
2 associative law
3 distributive law
4 all the above
VECTORS

268935 Distributive law is obeyed by

1 scalar product
2 vector product
3 both
4 none
VECTORS

268936 Choose the false statement

1 Scalar product and vector product obey commutative law
2 Scalar product does not obey distributive law where as vector product obeys commutative law
3 Scalar product and vector product obey associative law
4 All the above
NEET DIGITAL LIBRARY
VECTORS

268946 If \(\vec{A}\) along North and \(\vec{B}\) along vertically upward then the direction of \(\vec{A} \times \vec{B}\) is along

1 west
2 south
3 east
4 vertically downwards
VECTORS

268947 The angle between \((\vec{A}+\vec{B}) \&(\vec{A} \times \vec{B})\)

1 0
2 \(\pi / 4\)
3 \(\pi / 2\)
4 \(\pi\)
VECTORS

268934 Cross product of vectors obeys

1 commutative law
2 associative law
3 distributive law
4 all the above
VECTORS

268935 Distributive law is obeyed by

1 scalar product
2 vector product
3 both
4 none
VECTORS

268936 Choose the false statement

1 Scalar product and vector product obey commutative law
2 Scalar product does not obey distributive law where as vector product obeys commutative law
3 Scalar product and vector product obey associative law
4 All the above
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VECTORS

268946 If \(\vec{A}\) along North and \(\vec{B}\) along vertically upward then the direction of \(\vec{A} \times \vec{B}\) is along

1 west
2 south
3 east
4 vertically downwards
VECTORS

268947 The angle between \((\vec{A}+\vec{B}) \&(\vec{A} \times \vec{B})\)

1 0
2 \(\pi / 4\)
3 \(\pi / 2\)
4 \(\pi\)
VECTORS

268934 Cross product of vectors obeys

1 commutative law
2 associative law
3 distributive law
4 all the above
VECTORS

268935 Distributive law is obeyed by

1 scalar product
2 vector product
3 both
4 none
VECTORS

268936 Choose the false statement

1 Scalar product and vector product obey commutative law
2 Scalar product does not obey distributive law where as vector product obeys commutative law
3 Scalar product and vector product obey associative law
4 All the above
For More Updates join with Us
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VECTORS

268946 If \(\vec{A}\) along North and \(\vec{B}\) along vertically upward then the direction of \(\vec{A} \times \vec{B}\) is along

1 west
2 south
3 east
4 vertically downwards
VECTORS

268947 The angle between \((\vec{A}+\vec{B}) \&(\vec{A} \times \vec{B})\)

1 0
2 \(\pi / 4\)
3 \(\pi / 2\)
4 \(\pi\)
VECTORS

268934 Cross product of vectors obeys

1 commutative law
2 associative law
3 distributive law
4 all the above
VECTORS

268935 Distributive law is obeyed by

1 scalar product
2 vector product
3 both
4 none
VECTORS

268936 Choose the false statement

1 Scalar product and vector product obey commutative law
2 Scalar product does not obey distributive law where as vector product obeys commutative law
3 Scalar product and vector product obey associative law
4 All the above
NEET DIGITAL LIBRARY
VECTORS

268946 If \(\vec{A}\) along North and \(\vec{B}\) along vertically upward then the direction of \(\vec{A} \times \vec{B}\) is along

1 west
2 south
3 east
4 vertically downwards
VECTORS

268947 The angle between \((\vec{A}+\vec{B}) \&(\vec{A} \times \vec{B})\)

1 0
2 \(\pi / 4\)
3 \(\pi / 2\)
4 \(\pi\)
VECTORS

268934 Cross product of vectors obeys

1 commutative law
2 associative law
3 distributive law
4 all the above
VECTORS

268935 Distributive law is obeyed by

1 scalar product
2 vector product
3 both
4 none
VECTORS

268936 Choose the false statement

1 Scalar product and vector product obey commutative law
2 Scalar product does not obey distributive law where as vector product obeys commutative law
3 Scalar product and vector product obey associative law
4 All the above