It's sad to see that best videos of calculus on youtube are having such less views. Still you stand the BEST among the waste. Please, continue making more such videos & Thanks for making our studies enjoyable.
Some people are born to teach and this is a bless. You are one of those people, professor. So clear. Greetings from Brazil. I thank you for this video.
*Damn...this just gave me the whole conceptual picture of maths....YOU ARE THE BEST>>>>>.........Simple to the point and literally tells everything in a conceptual way*
Thank you so, so much for this short but sweet video on proving trig derivatives visually. I have terrible memory, and couldn't come to just memorizing them without truly understanding. this video helped me a lot. thank you infinitely ♥
This video doesn't "prove" a damn thing. All it does is visually illustrate. Typical of "Prof Dave" he vastly oversimplifies and therefore ultimately misleads.
@@davidmajor1508 He's not claiming to prove anything in this video, nor is he giving an oversimplification that would give misleading ideas. He's just giving idea behind how you can intuitively understand the derivative cycle of sine and cosine, and how you can recall it quickly, if you ever forget. Most people who will use practical applications of trigonometric derivatives don't need to know the formal the proof through the squeeze theorem from first principles, but knowing this illustration can help you recreate what you really would need to know.
Professor Dave Explains keep doing what your doing your content is some of the best educational wise material, it's clear and simple with neat little tricks that help get the information in
ua-cam.com/users/results?search_query=sinx%2F(1%2Bcosx) so that I am not giving somebody else's direct video, there are different scenarios listed there.
I rewrote the derivative of x^2*sin(x) to sec(x)+x*tan(x)/cos(x) or is this too much. I was just wondering hence you said there isn’t much we can do after the answer (cos(x)+x*sin(x))/cos(x).
@@egggames8059 I suppose, yes. You might also have a goal of keeping it only in terms of standard calculator trig functions, rather than secants, cosecants, and cotangents.
Does anybody understand the difference between (cos(x))^2 and cos^2(x)? I'm a little confused on why it's the latter, not the former. I understand the rest of the algebra and trig identities, I just don't understand how (cos(x))^2 becomes cos^2(x). Why isn't x also squared?
they are the same, just different notation to prevent the confusion of what is being squared, the whole function or the term the function is operating on
No you can’t, because the entirety of cos2x + sin2x is being divided by cos2x. Kinda like if you did (1 + 3) / 3 you can’t just cancel the three’s. If you separate everything you could get 1/3 + 3/3 so if you did a similar thing with this example problem you could get cos2x / cos2x + sin2x / cos2x which simplifies to 1 + sin2x / cos2x which is the same as 1 + tan2x. And according to the pythagorean identities 1 + tan2x = sec2x which is the exact same answer he has.
Because when you are only interested in multiplying numbers together, you're not really interested in finding the difference of something along a curve. You're solving for an exact value. This is why calculus is separate from other fields of mathematics, though many higher fields of math and physics rely upon calculus when studying systems that change over time.
It's sad to see that best videos of calculus on youtube are having such less views. Still you stand the BEST among the waste. Please, continue making more such videos & Thanks for making our studies enjoyable.
People are not really interested in things like this but the people that really want to understand calculus value channels like this
I learned more from this video in 7:56 than I would reading my textbook for two hours. Excellent work!
than attending classes and paying thousands
@@technically6193 I'm just paying for the degree and syllabi, im using youtube for the actual tuition
You have changed my life positively. You have enlightened me.
I'm grateful
Realising that Cosine is just the first derivative of Sine kinda blew my mind, it makes a lot of sense with hindsight. Epic
best professor in the world . was trying to understand this all for last one week . now almost all is clear just by watching 7 videos
When i my teacher taught me derivative of sinx, i just learnt it... today 3 years later i realized why... that illustration at 1:23 was amazing
Some people are born to teach and this is a bless. You are one of those people, professor. So clear. Greetings from Brazil. I thank you for this video.
*Damn...this just gave me the whole conceptual picture of maths....YOU ARE THE BEST>>>>>.........Simple to the point and literally tells everything in a conceptual way*
The fact this video was recommended to me the day we cover Trig derivatives in AP calc AB is amazing. Tank you professor Dave and the YT algorithm.
Thank you sir for your dedication and for making this free! 🙏
Loving your videos and I appreciate the depth of explanation on each subject.
Great visuals for both the graph and explanations! Very clear and easy to follow. Thanks for posting this.
Another day of thanking god I found this channel
Ahhh, precisely the explanation I was looking for. Thank you!
GREAT VIDEO thanks so much
Thank you, Professor!
Thank you so, so much for this short but sweet video on proving trig derivatives visually. I have terrible memory, and couldn't come to just memorizing them without truly understanding. this video helped me a lot. thank you infinitely ♥
same
This video doesn't "prove" a damn thing. All it does is visually illustrate. Typical of "Prof Dave" he vastly oversimplifies and therefore ultimately misleads.
@@davidmajor1508 He's not claiming to prove anything in this video, nor is he giving an oversimplification that would give misleading ideas.
He's just giving idea behind how you can intuitively understand the derivative cycle of sine and cosine, and how you can recall it quickly, if you ever forget. Most people who will use practical applications of trigonometric derivatives don't need to know the formal the proof through the squeeze theorem from first principles, but knowing this illustration can help you recreate what you really would need to know.
@Carl Hansen
The person I responded to DID indeed mention "proof". READ.
@Carl Hansen
How does this magically help one "intuitively" understand?
Great sir. Thank you
You are a literal godsend.
Much thanks to you
மிக்க நன்றி.வாழ்க பல்லாண்டு வாழ்க வளமுடன்.
literally binge watching these videos until my final next tuesday
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Thank you!
✨Thank you, Sir, 🙏🌺✨
very good explaination~!!!
Done.
Thank you very much!
When it's time to check comprehension, I find myself doing samba around the room. This may affect my grade.
Dear Professor,
Could we have a video to explain dirac delta functions, fourier series and fourier transformation
Try 3blue1brown
Nooo I have a maths test next week only problem, it's on integration. None the less still a useful video
sorry integration is coming soon!
Professor Dave Explains keep doing what your doing your content is some of the best educational wise material, it's clear and simple with neat little tricks that help get the information in
Great go on
I was looking for this
For the elementary functions, memorize the Magic Hexagon and utilize it for elementary calculus
thanks I love you
YES!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!
Not a math trained person: Anyone care to explain how does (cos x + cos^2 x + sin^2 x) becomes (1 + cos x) @ 7:16? Any material I can look up to?
Hello! It's because cos^2 x + sen^2 x=1
It's all well explained in the video n 88 of this same serie :)
I was confused on this, too. I'm struggling to understand the difference between (cos(x))^2 and cos^2(x).
Amazing
Prof can you explain how when we derived sinx/(1+cosx) it expanded?
P.S. sorry if its explained in your video my brain is just mush right now
ua-cam.com/users/results?search_query=sinx%2F(1%2Bcosx)
so that I am not giving somebody else's direct video, there are different scenarios listed there.
I rewrote the derivative of x^2*sin(x) to sec(x)+x*tan(x)/cos(x) or is this too much. I was just wondering hence you said there isn’t much we can do after the answer (cos(x)+x*sin(x))/cos(x).
There's plenty you can do after the form he gave, just not much you can really do to make a simpler expression.
@@carultchI mean whenever u can get rid of a denominator u do, no?
@@egggames8059 I suppose, yes. You might also have a goal of keeping it only in terms of standard calculator trig functions, rather than secants, cosecants, and cotangents.
I wrote it.
prof dave at 6:03 why did you divide cos X by one of the cos^2 X ? thank you for you tutorials.
due to the quotient rule
Prof, derivative of Sinh(x) is what?
check out my tutorial on hyperbolic functions!
Does anybody understand the difference between (cos(x))^2 and cos^2(x)? I'm a little confused on why it's the latter, not the former. I understand the rest of the algebra and trig identities, I just don't understand how (cos(x))^2 becomes cos^2(x). Why isn't x also squared?
they are the same, just different notation to prevent the confusion of what is being squared, the whole function or the term the function is operating on
Bro.
3:16 Wait, from what do we know that? It's not in the video that you referred to.
If you’re referring to the quotient rule he covers how to use it here ua-cam.com/video/aL15O6rS9z0/v-deo.htmlsi=Gkvaf0eAYJ2h9Yht
No, I mean that tan(x) = sin(x) / cos(x).@@ddevil768
@@607 that's basic Trig Identities. You should've learned that in Precalc.
@@lucyla9947 Where is the precalc video?
4:00 Can't you let the cos2x's cancel each other out, and end up with sin2x/cos2x?
No you can’t, because the entirety of cos2x + sin2x is being divided by cos2x.
Kinda like if you did (1 + 3) / 3 you can’t just cancel the three’s. If you separate everything you could get 1/3 + 3/3 so if you did a similar thing with this example problem you could get cos2x / cos2x + sin2x / cos2x which simplifies to 1 + sin2x / cos2x which is the same as 1 + tan2x. And according to the pythagorean identities 1 + tan2x = sec2x which is the exact same answer he has.
Thanks! I wonder if I'm going to need to memorise all these identities.@@ddevil768
Just realized im learning an 11th grade subject while I am 5th grade, a month away from 6th.....
What's your iq? 195? By god you're amazing! Lots of love
POV: You're here for homework help
(very generic comment)
Hey uep
can anyone tell me that when we multipy why dont we direct find derivative and then multiply
Because when you are only interested in multiplying numbers together, you're not really interested in finding the difference of something along a curve. You're solving for an exact value.
This is why calculus is separate from other fields of mathematics, though many higher fields of math and physics rely upon calculus when studying systems that change over time.
I knew Jesus Christ about 3 years ago and he changed my life
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I guess trigonometry in calculus & post-calculus is really just about memorizing 🥲Takes too much time to derive them one by one.
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