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Dot and cross product between 3D and 4D?
here are the possible answers: A) A tridimensional vector B) A 4D vector C) A 5D vector D) An scalar number E) It is undefined
What has the author Richmond Beckett McQuistan written?
Richmond Beckett McQuistan has written: 'Scalar and vector fields: a physical interpretation' -- subject(s): Scalar field theory, Vector analysis
Why null vector has a direction as it has magnitude 0?
The null vector is a special case where both magnitude and direction are undefined. This vector represents a point in space, rather than a physical quantity with magnitude and direction.
Does the phrase direction of zero vector have physical significance?
No, the zero vector has no direction as it does not have magnitude or point in any specific direction. It represents a point in space with no displacement.
What is an under vector room?
There does not seem to be an under vector room, but there is vector space. Vector space is a structure that is formed by a collection of vectors. This is a term in mathematics.
What is an explanation of Free and bound vectors?
Free vectors have no fixed point of application and can be moved around without changing the physical meaning. Bound vectors are tied to a specific point and cannot be freely moved without altering the physical interpretation of the vector.
Why do you we that velicity is a vector and speed is not?
because speed only takes in account the factors Distance and Time. Velocity takes in account a direction in physical space in addition, which makes the latter a vector.
What is relationship between vector space and vector subspace?
Vector spaces can be formed of vector subspaces.
What is mean by vector point function?
A vector point function is a function that maps points in a domain to vectors in a vector space. Each point is associated with a vector, serving as an output of the function. This can be used to represent physical quantities like force or velocity that have both magnitude and direction.
Direction of vector in space is specified by?
It is an integral part of the vector and so is specified by the vector.
What is an affine space?
An affine space is a vector space with no origin.
What is need of space vector pulse width modulation?
due to space vector modulation we can eliminate the lower order harmonics
