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There are many algebraic representations that can denote the vector.
A number is an algebric representation of a vector, when denoted by a unit vector factor, e.g Av= IAx + JAy + KAz. The unit vectors are I, J and K and these denote the vector. The subscript v as in Av also denotes the vector, other denotations can be Bolding A, as a vector.o
I use brackets A= Ar + Av = [a, A] where the upper case is the vector in the brackets and the lower case is the scalar or real.
You can use just the comma, A= [5 ,6 4 3] where the real 5 is before the comma and everything past the comma is a vector.
There are many algebraic representations that can denote the vector.
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How do you make vector representation?
explain the vector representation of Coulom's law.
What is the algebraic representation of (5x5y)?
It is 25xy.
How can algebraic concepts be applied to geometry?
Coordinate geometry (or analytical geometry) allows the algebraic representation of geometric shapes. This then allows algebraic concepts to be applied to geometry.
What would be an algebraic representation of an even number?
2n, where n is an integer.
When is the vector sum of two vectors not equal in magnitude to their algebraic sum?
In all cases except when they act in the same direction.
What are the theories of representation?
Representation theory is a branch of mathematics that studies abstract algebraic structures by representing their elements as linear transformations of vector spaces. It also studies modules over these abstract algebraic structures.
How do you make vector representation?
explain the vector representation of Coulom's law.
What has the author Valery Alexeev written?
Valery Alexeev has written: 'Compact moduli spaces and vector bundles' -- subject(s): Vector bundles, Moduli theory, Algebraic geometry -- Curves -- Vector bundles on curves and their moduli, Congresses, Algebraic geometry -- Curves -- Families, moduli (algebraic), Algebraic geometry -- Families, fibrations -- Fine and coarse moduli spaces, Algebraic geometry -- Surfaces and higher-dimensional varieties -- Families, moduli, classification: algebraic theory, Algebraic geometry -- Families, fibrations -- Algebraic moduli problems, moduli of vector bundles
What is the algebraic representation of (5x5y)?
It is 25xy.
When is the vector sum not equal in magnitude to the algebraic sum?
The magnitude of the vector sum will only equal the magnitude of algebraic sum, when the vectors are pointing in the same direction.
What is the difference between vector addition and algebraic addition?
There is no difference between vector addition and algebraic addition. Algebraic Addition applies to vectors and scalars: [a ,A ] + [b, B] = [a+b, A + B]. Algebraic addition handles the scalars a and b the same as the Vectors A and B
How can algebraic concepts be applied to geometry?
Coordinate geometry (or analytical geometry) allows the algebraic representation of geometric shapes. This then allows algebraic concepts to be applied to geometry.
What would be an algebraic representation of an even number?
2n, where n is an integer.
What is physical interpretation of vector space?
A vector has two properties: magnitude and direction. The representation of a vector is an arrow. The tip of the arrow points to the direction the vector is acting. The length of the arrow represents the magnitude.
What are the methods in determining the resultant vector?
The two main methods for determining the resultant vector of two or more vectors are graphical and algebraic methods. In the graphical method, vectors are drawn to scale with appropriate angles and then the resultant vector is measured. In the algebraic method, vector components are added or subtracted using trigonometric functions to find the magnitude and direction of the resultant vector.
What would be an algebraic representation of an odd number?
Assuming that n is an integer, 2n + 1 is an odd number.
When is the vector sum of two vectors not equal in magnitude to their algebraic sum?
In all cases except when they act in the same direction.
