In two dimensions, that would mean that the vector is at an angle of 45° or 135°. Often there is nothing special about this, since this typically depends on the coordinates chosen, which are often quite arbitrary.
can a vector have a component greater than the vector magnitude
No. The magnitude of a vector can't be less than any component.
No.
No.
No.
Yes. A vector in two dimensions is broken into two components, a vector in three dimensions broken into three components, etc... If the value of all but one component of a vector equal zero then the magnitude of the vector is equal to the non-zero component.
no a vector cannot have a component greater than the magnitude of vector
can a vector have a component greater than the vector magnitude
No. The magnitude of a vector can't be less than any component.
The magnitude of dot product of two vectors is equal to the product of first vector to the component of second vector in the direction of first. for ex.- A.B=ABcos@
No.
No.
No.
No.
No a vector may not have a component greater than its magnitude. When dealing with highschool phyics problems, the magnitude is usually the sum of two or more components and one component will offset the other, causing the magnitude to be less then its component
Yes. For instance, the 2-dimensional vector (1,0) has length sqrt(1+0) = 1 A vector only has zero magnitude when all its components are 0.
No.