I spent hours trying to find a more visual, intuitive explanation for the sum and difference identities and couldn't find anything beyond algebraic proofs (which helped a little to show where the identities derived from but did little to elaborate on their relationship to something tangible). Thank you for your video! I never comment on videos but this was such a big help to me and my understanding of this topic. So glad I found this before my exam tomorrow 🙌
I love this proof... its clear and clean.... its intuitive and insightful... let me state the obvious for anyone who is as blank as myself... each 90deg is composed of (alpha, beta and gamma)... once you identify any 'single term' in any of the triangle... the other angles are either a 90deg right angle... or a composition of the two missing terms... hope I helped someone.
..... طريقة ممتازة للبرهنة....... وتبدو سهلة لفهم كيف تستنج العلاقات المثلثية لمجموع زاويتين..... اعرف طريقة الجداء السلمي..... وتعلمنا طريقة اخرى...... لكن هذه جميلة جدا...... تعلمت طريقة المستطيل وحساب مساحات... داخل مستطيل.... الانترنات.... سهلت الكثير لمن يريد التعلم...... فكيف يكون الحال مع الذكاء الصناعي......!!!!؟؟؟؟
This is great but the real answer is when you look at a problem you see the square and reverse derive all counterrelations and sum or subtract when you need to get. Not for stupid people. Mnemnoics are just fine for
Nice Video Math Proofs. Very clear and vivid step by step explanation. Why don't you upload more? Which software (S) did you use by the way for writing/editing?
Thanks a lot! Definitely will. What topics in mathematics interest you? I am planning to add the software used in the description, once I am clear with the legal issues.
I have searched for an intuitive explanation of this concept, and I have to admit, this is very clear and insightful.
I spent hours trying to find a more visual, intuitive explanation for the sum and difference identities and couldn't find anything beyond algebraic proofs (which helped a little to show where the identities derived from but did little to elaborate on their relationship to something tangible). Thank you for your video! I never comment on videos but this was such a big help to me and my understanding of this topic. So glad I found this before my exam tomorrow 🙌
Can you please share the algebraic ways you found?
I couldn't agree more with u on the understanding part. Good video
Wonderful, easy and fluently proves. Especially I like it because you showed it with using unit circle.
I love this proof... its clear and clean....
its intuitive and insightful...
let me state the obvious for anyone who is as blank as myself... each 90deg is composed of (alpha, beta and gamma)... once you identify any 'single term' in any of the triangle... the other angles are either
a 90deg right angle... or a composition of the two missing terms...
hope I helped someone.
Thanks. One of best explanation
Very clear and very helpful, thank you.
Proof sin(a+b) in unit circle taking (a+b) greater than 90 degree
I guess I am going to jail for a long time
Very nice. In single concept, two proofs are done.
..... طريقة ممتازة للبرهنة....... وتبدو سهلة لفهم كيف تستنج العلاقات المثلثية لمجموع زاويتين..... اعرف طريقة الجداء السلمي..... وتعلمنا طريقة اخرى...... لكن هذه جميلة جدا...... تعلمت طريقة المستطيل وحساب مساحات... داخل مستطيل.... الانترنات.... سهلت الكثير لمن يريد التعلم...... فكيف يكون الحال مع الذكاء الصناعي......!!!!؟؟؟؟
Skp to 3:00 if you just want the proof without a lengthy into
I am an abituriend from Russia and would like to glad you for this explanation
Keep up the good work. Good luck for your TH-cam career. We really need teachers with the kind of mindset you mentioned at the start of the video.
Beautiful explanation!
this is a beautiful proof
great explanation.
it is very good explanation
loved your video! very interesting and elegant proof, and very clearly explained!
Thanks a lot! Let me know what other theorems might be interesting for you, so that I can cover them in my later videos.
cos (a-b) please :'))
Thanks very much for this. Very helpful.
Nice explanation
Excellent video. Thank you.
Excellent!
Awesome proof!!!
Ingenious
too good bro too good
Keep the good work, great video!
Very nice video.
훌륭한 가르침. 감사합니다.
Nice!
Beautiful work thanks :)
nice video good work .... please what is the name of the program you use
Very nice!
I think it would help greatly if you could explain why you multiply inner sides to get the outside.
great job
THANK U VERY MUCH SIR! !
well explained
its 1am and my brain is fried so quick question why is alpha in the green triangle?
Excellent
6:37 why is it cosBcosA ?
oh I got it.
you explained in the beginning
The radius multiple by cosB and got the adjacent B. Adjacent B = hypotenuse A, times by cosA and got adjacent A.
Amazing
Mind = Blown
Thank you sir
Good and clear presentation. What app did you use here sir, I use geogebra but I can't use only symbols to represent the angles
This is great but the real answer is when you look at a problem you see the square and reverse derive all counterrelations and sum or subtract when you need to get. Not for stupid people. Mnemnoics are just fine for
thank you bro
Which software is this????
Dude, that criminal/non-criminal comment is hilarious
Is this visual representation enough as a proof?
Very sad to see you post no more,,,, what happened to you?
Nice Video Math Proofs.
Very clear and vivid step by step explanation.
Why don't you upload more?
Which software (S) did you use by the way for writing/editing?
Thanks a lot! Definitely will. What topics in mathematics interest you? I am planning to add the software used in the description, once I am clear with the legal issues.
thank you
Neat!
👏👏👏👏👏👏👏👏👏👏👏💛
very good .great job but if u can do another video to proof cos (a-b) and sin(a-b)then u ll save my life
cos(a-b)=cos(a+(-b))
sin(a-b)=sin(a+(-b))
Just use the same formulas but remember that sin(-x)=-sin x and cos(-x)=cos x
Thx
чітко! дякую
oh i can see!!
I am from India
This is because the teacher doesnt care to take the time to teach this to us
Here i found mathematics
you can work on your graphics more..
Total ly green blur😭
The proof is hard to understand,
Just start on blank page by yourself ...by drawing a circle of any radius ...in anticlockwise dir take two Angels Alpha and bitha
I only clicked on this video because I didn't have a unit circle handy ;)
This theorem cab proof by circle of any radius
thanks