Parth G | Visualizing This Equation in 60 Seconds! #shorts (SUVAT equations Kinematics by Parth G) @ParthGChannel | Uploaded 3 years ago | Updated 14 hours ago
Here's a #shorts discussing how to visualize one of the kinematic / suvat equations that deals with objects moving in a straight line with constant acceleration.
The suvat / kinematic equations are a set of 5 equations that deal with the motion of objects moving in a straight line with a constant acceleration. They deal with the displacement, initial velocity, final velocity, acceleration, and time related to the object's motion.
The equation being studied in this video is s = ut + (1/2)at^2. If you can remember how to derive it using the following method, then you don't have to memorize it!
If we plot the motion of our object on a velocity-time graph, then we'll get a straight line graph, since the acceleration (gradient / slope) of the graph is constant. And we can also recall that the displacement of our object is given by the area underneath our graph.
To calculate this area, we can split it up into a rectangle and a triangle. Then, using the well-known equations for areas of triangles and rectangles, we find that the displacement of the object is exactly that given by the equation we are studying. (Of course, we need to remember to substitute in the fact that the acceleration is equal to (v-u)/t).
Many of you have asked me what equipment I use to create my videos - so here are some of my Amazon Affiliate links. I make a small commission whenever you make a purchase after clicking on them.
My camera (Canon EOS M50): https://amzn.to/3lgq8FZ
My Lens (Canon EF-M 22mm): https://amzn.to/3qMBvqD
Microphone and Stand (Fifine): https://amzn.to/2OwyWvt
Thanks so much for watching - please do check out my socials:
Instagram - @parthvlogs
Patreon - patreon.com/parthg
Here's a #shorts discussing how to visualize one of the kinematic / suvat equations that deals with objects moving in a straight line with constant acceleration.
The suvat / kinematic equations are a set of 5 equations that deal with the motion of objects moving in a straight line with a constant acceleration. They deal with the displacement, initial velocity, final velocity, acceleration, and time related to the object's motion.
The equation being studied in this video is s = ut + (1/2)at^2. If you can remember how to derive it using the following method, then you don't have to memorize it!
If we plot the motion of our object on a velocity-time graph, then we'll get a straight line graph, since the acceleration (gradient / slope) of the graph is constant. And we can also recall that the displacement of our object is given by the area underneath our graph.
To calculate this area, we can split it up into a rectangle and a triangle. Then, using the well-known equations for areas of triangles and rectangles, we find that the displacement of the object is exactly that given by the equation we are studying. (Of course, we need to remember to substitute in the fact that the acceleration is equal to (v-u)/t).
Many of you have asked me what equipment I use to create my videos - so here are some of my Amazon Affiliate links. I make a small commission whenever you make a purchase after clicking on them.
My camera (Canon EOS M50): https://amzn.to/3lgq8FZ
My Lens (Canon EF-M 22mm): https://amzn.to/3qMBvqD
Microphone and Stand (Fifine): https://amzn.to/2OwyWvt
Thanks so much for watching - please do check out my socials:
Instagram - @parthvlogs
Patreon - patreon.com/parthg