Great Work! You are a born teacher, and teaches with ease. This class is so natural that I felt I was in the Primary School. Imagine his ruler in this 21st Century, all these made the whole thing easy and natural. This concept is a difficult one, but you have cleared a lot of confusion. Thanks a lot, more wisdom and Remain Blessed!
Coming back again to extend my thanks; I have a learning disability and I draw from a non-engineering background, so I never grasped what the professor was instructing. Exceptional instruction. Thank you, deeply. Love from Palestine!
I'm really glad to be helpful. When I was young I found the jargon used in the MSE to be difficult to follow. Once you "get it" it isn't difficult, but those in the field often forget that those new need help. I try to make my content for everyone.
Thank you for watching. My goal is to give as many As as possible, but I can only do this by getting as many students as possible to participate in learning the content.
Indeed, Miller Indices are mellow. It takes 20 seconds to step through to the right answer -- jumping forward is sometimes faster, but there is a danger of mistakes.
Thanks. Educational videos that solve the details don't get many clicks. Perhaps I could add a click-bait title, "Three weird tricks to understand Miller index notation." or something similar.
Great Vid ! Thank you Dr. Beckman. Is there any video on angles between directions as well ? for cubic its easy but other than cubic angles might be tough to find out
Everything is scaled into a single dimensionless cell that is 1x1x1. You can perform all the work you need inside this cell. Then when you have your result you can transform back into the actual unit cell defined by the lattice vectors. This trick makes it possible for you to avoid dealing with the complexity of the actual unit cell.
The are the same direction. If you instead think of planes, then the d spacing between the planes are different. The d spacing for a cubic crystal uses the equation d=a*(h^2+k^2+l$2)^-1/2 So the (001) planes are separated by a, the cubic lattice parameter, and the (002) planes are separated by a/2.
Hopefully you won't have to find out. I have plans to prepare a new set of thermodynamics videos based on the textbook by Herbert B. Callen. I also will be finishing up a monograph "Overview of Elasticity of Materials" this summer over at Wikibooks.
Yes, there are two planes that are directly on top of each other. Planes are defined by their normal vector. These two vectors are identical except one is multiplied by -1.
Thanks sir but if you help to learn vector addition on lattice points or you have any practices regarding these planes please share Thanks in anticipation
This is the best Miller indices video on RUclips☑️. I've Watched a ton of them. The length is worth it guys, don't let it scare you 🚫
Absolutely agree! 5 minutes in and it makes so much sense!!
my professor explained this and I was so confused. literally a few minutes into your video and I finally get it. thanks!!
Great Work! You are a born teacher, and teaches with ease. This class is so natural that I felt I was in the Primary School. Imagine his ruler in this 21st Century, all these made the whole thing easy and natural. This concept is a difficult one, but you have cleared a lot of confusion. Thanks a lot, more wisdom and Remain Blessed!
Took my prof 2 days to not explain this clearly. I now understand after this 50 min video. Thanks a bunch.
You literally saved me, thank you from the bottom of my heart. Thank you for covering all of the subject matter
Coming back again to extend my thanks; I have a learning disability and I draw from a non-engineering background, so I never grasped what the professor was instructing. Exceptional instruction. Thank you, deeply. Love from Palestine!
I'm really glad to be helpful. When I was young I found the jargon used in the MSE to be difficult to follow. Once you "get it" it isn't difficult, but those in the field often forget that those new need help. I try to make my content for everyone.
Best video so far regarding this topic
This Video is really helpful. Thank you, Dr. Scott, for doing that
Thank you for watching. My goal is to give as many As as possible, but I can only do this by getting as many students as possible to participate in learning the content.
This video is so relaxing, I do not know why.
It's like meditation on finding miller indices.
Indeed, Miller Indices are mellow. It takes 20 seconds to step through to the right answer -- jumping forward is sometimes faster, but there is a danger of mistakes.
The best video in crystallography. Thank you very much
غدًا امتحاني .. انت انقذتني دكتور شكرًا جزيلًا😢❤❤❤❤❤
Hi from Germany. Great joooobbb merciiii
Thanks to your kind lecture, I got a lot of help in understanding the concept. Thank you very much.
I'm in the MSE program at WSU. This video cleared up so much confusion that my professor won't address
Thanks. My goal is to help as many students as possible, so I'm always adding content here.
Was this is the best video I have seen on RUclips 💯💯💯
Thanks. I'm glad that this work is useful.
fenomenal explanation
SUPER CLEAR!!!
Thanks. This is my goal for all my videos. I'm trying to contribute to the greater good of materials education.
Thank you so much for this video! So helpful and well explained. 🥰
Awesome 😎... love the explanation
I would die for this video, really good and deserves more click obviously
Thanks. Educational videos that solve the details don't get many clicks. Perhaps I could add a click-bait title, "Three weird tricks to understand Miller index notation." or something similar.
Thank you so much sir! Greeting from Turkey.
Are you at METU?
@@beckmanwsuofficial8503 no i am studying in germany but i am in Turkey now. :)
Great Vid ! Thank you Dr. Beckman. Is there any video on angles between directions as well ? for cubic its easy but other than cubic angles might be tough to find out
Everything is scaled into a single dimensionless cell that is 1x1x1. You can perform all the work you need inside this cell. Then when you have your result you can transform back into the actual unit cell defined by the lattice vectors. This trick makes it possible for you to avoid dealing with the complexity of the actual unit cell.
one of the best explanation.
Thank you very much i watch this vidéo from Tunisia
Great video
tnx a bunch sir🎉
this is best way, i understood , thanks.
You're the best man thank you❤️
çok teşekkürlerrrr!!
Thanks for this video. I really appreciate it
how do you draw the direction [002] in a cubic, the same as [001]?
The are the same direction. If you instead think of planes, then the d spacing between the planes are different. The d spacing for a cubic crystal uses the equation
d=a*(h^2+k^2+l$2)^-1/2
So the (001) planes are separated by a, the cubic lattice parameter, and the (002) planes are separated by a/2.
hvala bratic
I love you man
adammmmmmmm , çok sağ ol aşk
Rica ederim
Prof, what would we do without you? 👌
Hopefully you won't have to find out. I have plans to prepare a new set of thermodynamics videos based on the textbook by Herbert B. Callen. I also will be finishing up a monograph "Overview of Elasticity of Materials" this summer over at Wikibooks.
yo bro you are good teacher
At 29:45 if we find the answer (1 -1 2) instead of (-1 1 -2) is it still right?
Thank you
Yes, there are two planes that are directly on top of each other. Planes are defined by their normal vector. These two vectors are identical except one is multiplied by -1.
thank you so much sir
Thanks sir but if you help to learn vector addition on lattice points or you have any practices regarding these planes please share
Thanks in anticipation
Vector addition. You can always define the origin so pick it such that your addition is simple.
결국 origin을 잘 잡아주거나, 면을 평행이동 시켜서 miller's indicates를 잡은값은
원래의 plane 과 평행하다... symmetric의 의미를 깨달았습니다. 한줄기의 빛... 감사합니다
This video is great!! thanks ! (Anyway those colors are helpful ;) )
Glad it was helpful!
Ty u made my day 😍
You're welcome.
Thanks so much
thank you!!
Thank you really
Great!
Thanks
👏🏻
Go Cougs!!!!
thank u
LAnAt trey ty
thanks but get a ruler lol
I was still reminiscing about my brief vacation.
幹 甚麼鬼
Otherwise I was cooked
Great video