He makes me like math so much more. I have been self teaching calculus and linear algebra, I guess I'm into math now, many thanks to such beautiful minds.
You are teacher that even a child or a novice can understand and you have demonstrated this in all Chemistry, Physics and Maths lessons. I truly owe you a debt of appreciation. Thank you very much
I don't usually write comment however I really think it's necessary to thank you for all your efforts esp proofing things. You may have no idea about the impact and changes you make on some body in another place in the world with your knowledge and explaining it. Everything is perfect. There is nothing to say that make your teaching better. You are the best. Thank you
I haven't seen any video that fully explains dot products like this. You should be paid for this, this indeed is exceptional, damn you gave this away for free? Wow!!!!!!?
i too felt with satisfaction after watching such an amazing explanation .I was much frustated of not having understood the very first concept of my textbook but after watching ur video sir truly Id say sir u r a genius and u made clear my doubt regarding dot product😭
Of the many good videos on this topic I think this is the best and most thorough because it goes through step by step in a practical way steps that can be memorized and practiced in real life
Great lesson I especially liked how you recapped everything at the end. With a lesson with so much content, that helped. During the proof, my first thought was this is going ro be really difficult with all those terms in it. My "aha" moment was when I remembered that many of those terms would go to zero since the unit vectors are all perpendicular.
So, as a chemical engineer, I can easily do the math, but could to give a real life example if why we would multiply vectors? I totally understand the real life meaning of adding or subtracting vectors, but not multiplying them. Thanks! (ChEs do not use vectors, so I am limited to what I learned in college 30+ years ago. 😂)
He makes me like math so much more. I have been self teaching calculus and linear algebra, I guess I'm into math now, many thanks to such beautiful minds.
You are teacher that even a child or a novice can understand and you have demonstrated this in all Chemistry, Physics and Maths lessons.
I truly owe you a debt of appreciation. Thank you very much
Best teacher on youtube, thank you for all the time and effort you put into all your videos
a^•b^[acos]b a^•b^=a•bcos°
I don't usually write comment however I really think it's necessary to thank you for all your efforts esp proofing things. You may have no idea about the impact and changes you make on some body in another place in the world with your knowledge and explaining it. Everything is perfect. There is nothing to say that make your teaching better. You are the best. Thank you
Thank you Prof. Jason for helping us see the mystery of the vector dot product.
I haven't seen any video that fully explains dot products like this. You should be paid for this, this indeed is exceptional, damn you gave this away for free? Wow!!!!!!?
Welcome to youtube!
My search for the best teacher stops here. This is coming from an educator myself. Love from India.
Thank you for going beyond and trying so so hard to help us.
It is working. You are the best and extremely sincere teacher. THANK YOU!
i too felt with satisfaction after watching such an amazing explanation .I was much frustated of not having understood the very first concept of my textbook but after watching ur video sir truly Id say sir u r a genius and u made clear my doubt regarding dot product😭
This is the best lecture I ever watched on dot product!
Thanks a lot, I love how you like explaining the point of math and equations
You are honestly wonderful . How you explain concepts is remarkable . Physics uni student . Thankyou
Of the many good videos on this topic I think this is the best and most thorough because it goes through step by step in a practical way steps that can be memorized and practiced in real life
THANK YOU... SIR...!!!
I really have to watch and grasp it mentally...!!!
THANKS AGAIN...!!!
This video helped me to understand the meaning of dot product. Thanks.
Great channel.....Great professor.
جامد يا عمنا و الله 🥰🤍🤍🤍
I believe you could teach rocket science to the dumbest person on earth. That's how good you are.
Thank you so so much. You are a star.
Great lesson I especially liked how you recapped everything at the end. With a lesson with so much content, that helped.
During the proof, my first thought was this is going ro be really difficult with all those terms in it. My "aha" moment was when I remembered that many of those terms would go to zero since the unit vectors are all perpendicular.
I’m impressed by this teacher . Is there any exclusives or more of theses courses?
You teach really well sir. Thanks for taking your time.
i like the way you've explained it better than my teachert thanks
The Best Teacher Ever!
Brialliantly explained… thank you sir
Bravo!
Brilliant
good lesson, thanks
Best teacher. Thanks
Excellent. Thank you very much
Thank you so much, your work is a masterpiece
Thank you very much for this sir!
I really appreciate it .
I needed it.
Thank you so much incredible teacher!!!
Thank you for Fantastic explanaition about dot product
Great explanation and lesson.
Thank you sir
very brilliant and nice explanation.
great presentation!! Superb teacher!!
Hello Teacher, I am an Italian following for passion, very excellent experience! Could you do some excercise? Tks
You are good techer tanks
thank you I love you
Nice 👍
You are the very best greatest teacher❤❤❤
So, as a chemical engineer, I can easily do the math, but could to give a real life example if why we would multiply vectors? I totally understand the real life meaning of adding or subtracting vectors, but not multiplying them. Thanks!
(ChEs do not use vectors, so I am limited to what I learned in college 30+ years ago. 😂)
He gave the example that force times distance is an example of a “dot product”
Where is the video of cross product I need that
a^•b^[acos°]b a^•b^=abcos°
W=Fd
b^•a^ =[bcos°]a
b^•a^=abcos°