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Both speed and velocity describe how fast an object moves, but they differ in a crucial way:
Speed is the rate at which distance is traveled.
speed = $$\frac{distance}{time}$$
Characteristics:
Average Speed = $$\frac{total distance}{total time}$$
Velocity is the rate of change of displacement.
\(\vec{v}_{avg}=\frac{\Delta{\vec{r}}}{\Delta{t}}\)
Characteristics:
To describe motion at a specific moment:
\(\vec{v}=\frac{d\vec{r}}{dt}\)
Velocity is the derivative of position with respect to time.
| Quantity | Based on | Type |
|---|---|---|
| speed | distance | scalar |
| velocity | displacement | vector |
Example:
An object moves
10 m east, then 10 m west
So:
Speed is the magnitude of velocity:
speed = \(\vec{v}\)
If
\(\vec{v}=(v_x , v_y)\)
then
\(|\vec{v}|=\sqrt{{v_x}^2+{v_y}^2}\)
This follows:
In two dimensions:
\(\vec{v}=\vec{v_x}\hat{i}+\vec{v_y}\hat{j}\)
Each component represents motion along a specific axis.
Direction matters because it determines how motion changes and how vectors combine.
Speed:
speed = $$\frac{distance}{time}$$
Velocity:
\(\vec{v}_{avg}=\frac{\Delta{\vec{r}}}{\Delta{t}}\) , \(\vec{v}=\frac{d\vec{r}}{dt}\)
Key idea:
These concepts are essential for analyzing motion in one and multiple dimensions in kinematics.
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