Difference between scalars and vectors

In summary, a scalar quantity has magnitude and a vector has both magnitude and direction. In math, scalar multiplication is the ordinary multiplication of scalars, while vector multiplication refers to the dot product and cross product. The dot product and cross product are not always the same for general vectors, but are equivalent to scalar multiplication. The direction of a vector is important in physical situations, as it provides more information. The cross product is only defined for three vectors, while the dot product can be calculated as the sum of the products of the corresponding components. It is important to distinguish between ordinary multiplication, scalar multiplication, and the scalar product (dot product) of two vectors.
  • #1
brandy
161
0
i know that a scalar quantity is something with magnitude and a vector is something with magnitude and direction but how do u apply that in maths. what's the difference between scalar multiplication and vector multiplication...?
if its not too hard could u dumb it down. am not all that smart.
please and thanku.
 
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  • #2
Scalar Multiplication is just the multiplication of scalars, ordinary multiplication that you already know of =]. The ordinary numbers you already now are all scalars, they have a magnitude. They also have a direction, as we can see if we draw a number line. The positive numbers are in the right direction, and we denote the left direction with the negative numbers.

The direction of a general Vector can be must more complex than that, and can't just have a simple +/- sign to work it out. There are two main operations we call vector multiplication, the Dot product and the cross product. As we have just discussed, scalars are vectors with very simple directions. The dot product and cross product of two general vectors do not always have the same result, but when with scalars are always the same, and also equate to normal multiplication. This is why sometimes we use a dot to denote scalar multiplication instead of a cross.

The direction in a vector is very important when being applied in physical situations. For example, take the scalar quantity - speed. The speed of two separate objects may be both 10m/s. This isn't too much useful. However, the velocity of these two objects may be 10m/s North and 10m/s South , which gives us more information about what's going on.
 
  • #3
so for 1*2 is scalar multiplication? and (1,2)*(2,3) is vector? well wat about dot product and cross product. for (1,2);(2,3) would u go 1*2,2*3 or 1*2+2*3
 
  • #4
the "cross product" is only defined for 3 vectors, the dot product is the latter of what you put down.
 
  • #5
One should try to distinguish
- "multiplication of scalars" (i.e. "ordinary" multiplication)
- the more-ambiguous "scalar multiplication", which may refer to the multiplication of a scalar and a vector (i.e. "scaling" a vector by changing its magnitude without changing its direction), and
- "scalar product ["dot product" of two vectors]".
 
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Related to Difference between scalars and vectors

What is the difference between scalars and vectors?

Scalars and vectors are both mathematical quantities used to describe physical quantities like distance, speed, and force. The main difference between them is that scalars have only magnitude (size) while vectors have both magnitude and direction.

How are scalars and vectors represented?

Scalars are represented by a single number and can be positive, negative, or zero. Vectors are represented by an arrow with its length representing the magnitude and its direction indicating the direction of the vector.

What are some examples of scalars and vectors?

Examples of scalars include temperature, mass, and time. Examples of vectors include displacement, velocity, and acceleration.

Can scalars and vectors be added together?

No, scalars and vectors cannot be added together because they represent different mathematical quantities. Scalars can only be added to other scalars, and vectors can only be added to other vectors.

How are scalars and vectors used in science?

Scalars and vectors are used in science to describe and analyze physical phenomena. For example, velocity, a vector quantity, is used to describe the speed and direction of an object's motion, while temperature, a scalar quantity, is used to describe the average kinetic energy of particles in a substance.

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