A vector quantity is differentiated from a scalar value by virtue of having both magnitude and direction. Hence, 30km/h is a scalar quantity, 30km/h NNE is a vector quantity.
EXAMPLES: -
DISPLACEMENT
VELOCITY
FORCE
MOMENTUM
ACCCLERATION
ELECTRICITY
GRAVITIONAL FORCE
FIELD
An example of a vector quantity would be velocity. The velocity of the wind, for example, has both speed and direction. Another example would be an automobile. It has both speed or magnitude and direction.
The Universe is composed of "reals" and "vectors". Energy and force are vectors. Energy = Er + Ev= -mu/r + mcV where V is the vector velocity. Force is F= Fr + Fv ('r' denotes real and 'v' denotes vector).
F= ma= m(v^2/r - vc/r cos(b)) + m(cdV/dr + cv/r sin(b)T + v/c vc/r R/r)
Electromagnetism contains vectors E=Er + Ev = c(Br + Bv) = z(Hr + Hv) = cz(Dr + Dv),
where E is the electric field, B is the magnetic desnsity field, H is the magnetic intensity field, and D is the electric density field.
Examples of vector quantity are displacement, velocity, acceleration, momentum, force, E-filed, B-field, torque, energy, etc.
Acceleration
To make it easy, vector quantities have a direction aswell as a magnitude.While scalar quantities just have a magnitudeAn example of a scalar quantity is "Speed" and the vector quantity would be "Velocity"
Scalar quantities are an amount, for example 5 pounds, 15 feet, etcetera. Vector quantities are an amount coupled with a direction, for example 20 miles northwest, 7 meters south, etcetera.
It is necessary to know the magnitude and the direction of the vector.
Describe scalar and vector quantities. Include a definition and provide at least one example of how they are alike and how they are different.
Mainly because they aren't scalar quantities. A vector in the plane has two components, an x-component and a y-component. If you have the x and y components for each vector, you can add them separately. This is very similar to the addition of scalar quantities; what you can't add directly, of course, is their lengths. Similarly, a vector in space has three components; you can add each of the components separately.
To make it easy, vector quantities have a direction aswell as a magnitude.While scalar quantities just have a magnitudeAn example of a scalar quantity is "Speed" and the vector quantity would be "Velocity"
Scalar quantities are an amount, for example 5 pounds, 15 feet, etcetera. Vector quantities are an amount coupled with a direction, for example 20 miles northwest, 7 meters south, etcetera.
Scalar quantities are defined as quantities that have only a mganitude. Vector quantities have magnitude and direction. Some example of this include Scalar Vector Mass Weight length Displacement Speed Velocity Energy Acceleration
Scalar quantities - quantities that only include magnitude Vector quantities - quantities with both magnitude and direction
It is necessary to know the magnitude and the direction of the vector.
Yes, it is a vector quantity.
Not at all. Scalar are numerical quantities without direction (for example time) where as vectors are numerical quantities with direction (for example gravitational force downward)
Vector quantities are those that must be described with both a magnitude and direction. Scalar quantities can be described with only a single value.
Describe scalar and vector quantities. Include a definition and provide at least one example of how they are alike and how they are different.
Mainly because they aren't scalar quantities. A vector in the plane has two components, an x-component and a y-component. If you have the x and y components for each vector, you can add them separately. This is very similar to the addition of scalar quantities; what you can't add directly, of course, is their lengths. Similarly, a vector in space has three components; you can add each of the components separately.
No. Force and acceleration are vector quantities.
A vector quantity refers to a physical quantity that has both magnitude and direction. Some examples of vector quantities include velocity (speed and direction), force (magnitude and direction), and displacement (distance and direction).