Advertisements
Advertisements
प्रश्न
Write a short note on the vector product between two vectors.
उत्तर
The vector product or cross product of two vectors is defined as another vector having a magnitude equal to the product of the magnitudes of two vectors and the sine of the angle between them. The direction of the product vector is perpendicular to the plane containing the two vectors, in accordance with the right-hand screw rule or right-hand thumb rule. Thus, if `vecA` and `vecB` are two vectors, then their vector product is written as `vecA` × `vecB` which is a vector C defined by `vecc` = `vecA` × `vecB` = (AB sin 0) `hatn`
The direction `hatn` of `vecA` x `vecB`, i.e., `vecc` is perpendicular to the plane containing the vectors `vecA` and `vecB`.
APPEARS IN
संबंधित प्रश्न
Two objects of masses m1 and m2 fall from the heights h1 and h2 respectively. The ratio of the magnitude of their momenta when they hit the ground is ______
Define a vector. Give examples?
Explain in detail the triangle law of addition.
Discuss the properties of scalar and vector products.
Convert the vector `vecr = 3hati + 2hatj` into a unit vector.
What are the resultants of the vector product of two given vectors given by `vecA = 4hati - 2hatj + hatk` and `vecB = 5hati + 3hatj - 4hatk`?
Calculate the area of the triangle for which two of its sides are given by the vectors `vecA = 5hati - 3hatj, vecB = 4hati + 6hatj`
The resultant of two vectors A and B is perpendicular to vector A and its magnitude is equal to half of the magnitude of vector B. Then the angle between A and B is
