No
Answer2: Yes.
Scalar S and vector V . S/V= SV*/VV* = SV*/Norm of vector(VV*).
Example: a/bi = a(-bi)/bi(-bi)= -abi/b2 =-ai/b.
It is not possible the addition of scalars as well as vectors because vector quantities are magnitude as well as direction and scalar quantities are the only magnitude; they have no directions at all. Addition is possible between scalar to scalar and vector to vector. Under some circumstances, you may be able to treat scalar quantities as being along some previously undefined dimension of a vector quantity, and add them that way. For example, you can treat time as a vector along the t-axis and add it to an xyz position vector in 3-space to come up with a four-dimensional spacetime vector.
A scalar times a vector is a vector.
if you take a vector (= group of numbers) and you divide it by a scalar (=one number) then you get a vector (=group of numbers)
Scalar
Time is scalar
For differentiation, you have to divide a vector by a scalar. Therefore, you should get a vector.
scalar lol
A scalar times a vector is a vector.
It is not possible the addition of scalars as well as vectors because vector quantities are magnitude as well as direction and scalar quantities are the only magnitude; they have no directions at all. Addition is possible between scalar to scalar and vector to vector. Under some circumstances, you may be able to treat scalar quantities as being along some previously undefined dimension of a vector quantity, and add them that way. For example, you can treat time as a vector along the t-axis and add it to an xyz position vector in 3-space to come up with a four-dimensional spacetime vector.
vector
Vector is NOT a scalar. The two (vector and scalar) are different things. A vector is a quantity (measurement) in which a direction is important. A scalar is a quantity in which a direction is NOT important.
current is vector or scalar
The product of scalar and vector quantity is scalar.
vector
scalar direction is a vector quantity
If a direction is relevant, then it is NOT a scalar, but a vector.
if you take a vector (= group of numbers) and you divide it by a scalar (=one number) then you get a vector (=group of numbers)