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--- 183_notes:displacement_and_velocity [2021/02/18 21:16] – [Constant Velocity Motion] stumptyl
+++ 183_notes:displacement_and_velocity [2021/02/18 21:17] (current) – [Velocity and Speed] stumptyl
@@ Line 31: / Line 31: @@
 /* Add a little about distance versus displacement */
-==== Velocity and Speed ====
+===== Velocity and Speed =====
 **Velocity** is a vector quantity that describes the rate of change of the displacement.
@@ Line 37: / Line 37: @@
 \\
-=== Average Velocity ===
+==== Average Velocity ====
 **Average Velocity** ($\vec{v}_{avg}$) describes how an object changes its displacement in a given time. To compute an object's average velocity, you will need the position of the object at two different times. You can think of it as //average velocity = displacement divided by time elapsed//. Mathematically, we can represent the average velocity like this:
@@ Line 51: / Line 51: @@
 \\
-=== Approximate Average Velocity ===
+==== Approximate Average Velocity ====
 The average velocity is defined as the displacement over a given time, but what about the //arithmetic// average velocity? How do the arithmetic average velocity and average velocity compare?
@@ Line 63: / Line 63: @@
 \\
-=== Instantaneous Velocity ===
+==== Instantaneous Velocity ====
 **Instantaneous velocity** ($\vec{v}$) describes how quickly an object is moving at a specific point in time. If you consider the displacement over shorter and shorter $\Delta t$'s, your computation will give a reasonable approximation for the instantaneous velocity. In the limit that $\Delta t$ goes to zero, your computation would be exact. Mathematically, we represent the instantaneous velocity like this:
@@ Line 74: / Line 74: @@
 \\
-=== Speed ===
+==== Speed ====
 **Speed** is a scalar quantity that describes that distance (not the displacement) traveled over an elapsed time.