before it i thought that the shear stress is the force that push the fluid but know after i get it's developed resistance it makes my happy and understood fully this concept thank you so mush for that
The effect of the velocity gradient between two parallel planes immersed in fluid is important and has dramatic implications. Rotating bodies that trigger a sensor in particular.
The last figure represents the relationship between the stress ( T) and deformation rate which has to be ( dB/ dT). However it shows the gradient velocity ( du/dy).
i think there's a mistake at 3:30, i don't think that the velocity varies linearly rather the velocity gradient. The velocity profile is not linear but parabolic, so velocity couldn't possibly have linear relationship with distance "l". Right?
@@jhanolaer8286 you can use pythagorean theorem ;) ... as the velocity profile is a triangle here .. The velocity profile depends on the source it flows ... for pipe and laminar flow .. the profile would be parabolic . XD
![Felix "Unfair" | [Stray Kids : SKZ-PLAYER]](http://i.ytimg.com/vi/Oswujxm2Ag0/mqdefault.jpg)
the simplicity of this is beyond words thanks a million times
this video was so beneficial to me, I've been looking for a video that explains these concept the great way u did here, so really thank u very much
oh! Glad to hear that ^^. Also Thank you for your precious comment
before it i thought that the shear stress is the force that push the fluid but know after i get it's developed resistance it makes my happy and understood fully this concept thank you so mush for that
Ahh glad to hear that.. welcome friend and enjoy reading ^^
The effect of the velocity gradient between two parallel planes immersed in fluid is important and has dramatic implications. Rotating bodies that trigger a sensor in particular.
Excellent video! Subscribed😁
THIS MADE ME UNDERSTAND SO EASILY...!I'VE ALSO WATCHED UR OTHER VIDEOS AND IT HELPED A LOT..👏👏😃
Aww glad to geal that. ^^
my professor didnt prove this at all, thx you for ur video, it help alot
wlc buddy ... glad you enjoy video :)
The last figure represents the relationship between the stress ( T) and deformation rate which has to be ( dB/ dT). However it shows the gradient velocity ( du/dy).
Nice explanation 💯💯
Very clear
tq....🥰🥰
Subsribed. Thank you for the great animation and explanation
Grat informations and illustration to understanding fluid behavior, thanks 😊
Took me 3 to 4 days to understand,
But i understand ❤❤🎉🎉 thanks buddy
Nice....
Amazing profile picture and amazing video
that was really good, keep offering such videoes plz
perfect explanation
very well explained.
great
Thank you Very much!
Welcome ^^
Always nice
But I personally request you to slowdown a bit
It's needs to be more clear
Animations are awesome no doubt I. That
Thanks
Thank you you your suggestion ^^ . Next time I shall try my best. enjoy reading.
I think its already slow enough as it is. If its too fast, I just pause and have a think to consolidate the concepts before moving on
i think there's a mistake at 3:30, i don't think that the velocity varies linearly rather the velocity gradient. The velocity profile is not linear but parabolic, so velocity couldn't possibly have linear relationship with distance "l". Right?
its not a half of parabolic?
Nope. Its Due to movement of upper plate. XD
@@NiLTime Okey, so the interval of each layers something like this sqrt((depth/cos(θ))^2-depth^2)
@@jhanolaer8286 you can use pythagorean theorem ;) ... as the velocity profile is a triangle here .. The velocity profile depends on the source it flows ... for pipe and laminar flow .. the profile would be parabolic . XD
Do more videos bro
sure :)
ty
4:55 "dβ~tanβ" wrong. dβ~tan(dβ).
I came for the profile picture +content
damnn Itachi!!!
Hi bro . how are you doing
Ducking he'll, that is so simple
Glad you like ^^
her voice is scary
haha you think so?? ^^
@@NiLTime yeahh 😵