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Question
velocity review guide
- what is the difference between distance and displacement?
- what is the difference between speed and velocity?
- what do we mean when we say constant speed or constant acceleration?
- what is the definition of acceleration?
- how do we find the average speed of an object?
a. rearrange the equation to solve for time.
b. rearrange the equation to solve for distance.
- how do we find the acceleration of an object?
a. rearrange the equation to solve for speed.
b. rearrange the equation to solve for time.
Brief Explanations
- Distance is a scalar, total path length; displacement is a vector, straight - line from start to end.
- Speed is scalar, rate of distance covered; velocity is vector, rate of displacement change.
- Constant speed: unchanging rate of distance covered; constant acceleration: unchanging rate of velocity change.
- Acceleration is the rate of change of velocity, $a=\frac{\Delta v}{\Delta t}$.
- Average speed $v_{avg}=\frac{d}{t}$. To solve for time $t = \frac{d}{v_{avg}}$, for distance $d=v_{avg}\times t$.
- Acceleration $a=\frac{v - u}{t}$. To solve for speed $v = u+at$, for time $t=\frac{v - u}{a}$.
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- Distance is a scalar quantity representing the total path length traveled, while displacement is a vector quantity representing the straight - line distance and direction from the initial to the final position.
- Speed is a scalar quantity that measures the rate of distance traveled per unit time, while velocity is a vector quantity that measures the rate of displacement per unit time.
- Constant speed means the object covers equal distances in equal intervals of time. Constant acceleration means the object's velocity changes by an equal amount in equal intervals of time.
- Acceleration is the rate of change of velocity with respect to time, given by the formula $a=\frac{\Delta v}{\Delta t}$, where $\Delta v$ is the change in velocity and $\Delta t$ is the change in time.
- The average speed of an object is found by dividing the total distance traveled by the total time taken, $v_{avg}=\frac{d}{t}$.
- a. To solve for time, $t=\frac{d}{v_{avg}}$.
- b. To solve for distance, $d = v_{avg}\times t$.
- The acceleration of an object is found by dividing the change in velocity by the time taken, $a=\frac{v - u}{t}$, where $v$ is the final velocity, $u$ is the initial velocity, and $t$ is the time.
- a. To solve for speed, $v=u + at$.
- b. To solve for time, $t=\frac{v - u}{a}$.