Why is calculus so ... EASY ?

Calculus is incredibly easy and trivial if you already know calculus

Looking back on calculus, most of the things I actually had issues with were not the core concepts, but in fact was my ability to perform algebra without making small mistakes, remembering and applying trigonometric identities, and getting used to new notation. To anyone going through Calculus I urge you not to stress too much about it, just do your best it comes in time!

The concepts of calculus are easy, and so is making programs to do it. The hard part of calculus is how they teach it in school. They want you to solve it with all of the rules to memorize. But memorizing all those rules- and the exact situations in which to use them- is the difficult part. The ideas of differentiation and integration can frankly be understood by anyone who can understand the area of a circle and how to graph a line; in other words, a late elementary school student or older. But for me, calculus was the first math class where suddenly there was no ability to look at a problem and know immediately how to solve it; you had to try different things on the same problem until it worked. And that does make it more difficult than any previous math class. Granted, it really doesn't have to be that way. Teachers could teach it differently and you wouldn't have that problem.

"Calculus is easy, if you are me." - Gottfried Wilhelm Leibniz

It is easy. The harder part is learning all the prerequisite material you need to know to start to learn calculus. But if you know algebra, trig, and geometry really well, calculus is incredibly easy.

One of the first exams I had in physics the teacher gave us velocity over time graphs and we had to “be the car” and move in distance over time. Now that I’m 63 and still remember this tells me it was one of the best learning tasks I ever had.

Calculus makes things easier once you know it. Learning integration is a perfect example. First we were taught to integrate using infinite rectangles , trapezoids , etc. It was tricky to find the correct formula and take the limit. However, once we were taught anti derivatives , it became much easier.

Silvanus Thompson’s book “Calculus Made Easy” sparked my interest in higher math when I was younger and definitely influenced me into becoming a math major, absolute gem of a book every calc student needs a copy

In high school, I was surprised by how by far the hardest parts of Calc I and II simply involved a lot of steps of algebra. Things like partial fraction decomposition are a major pain, but actually integrating the resulting rational functions was very straightforward--once you did the necessary algebra (completing the square, etc.). Then in Calc III, I found it was much the same. Vector algebra is obnoxious, but the calc part really isn't so bad. I will say though that it gets much worse. Nonlinear differential equations are way harder than anything you have to deal with in a high school algebra class. I'd sooner factor ten solvable quintics than stare at a system of nonlinear PDEs until my brain melts.

I found calculus to be really easy when I first learned it, but it was always the algebra that held me back. Just as they say, people take calculus to finally fail algebra.

Awesome video. I learned late in life that this kind of math isn't something I'm naturally bad at, just something that requires more effort on my part than, say, writing an essay on Wittgenstein's late period thought. But then again, calculus is something that requires a lot of effort for MOST people. Anyway, it's great to have resources like this, which are obviously the product of a great deal of passionate labor on the part of Mathologer.

I'm deeply moved by this class! Your passion for teaching shines through, and it's impossible not to be inspired by your enthusiasm.

When you mentioned _Calculus Made Easy_ I thought, "Hey, I have that book!" and ran to the bookshelf to retrieve it. As it turns out, no I don't. I have a book called _Calculus the Easy Way_ by Douglas Downing of Yale University, © 1982.
It's a fun little book wherein the protagonist is involved in a shipwreck and washes ashore in the land of Carmorra where he, in essence, helps its denizens invent calculus in order to answer burning questions involving the speeds of trains, the areas of fields, the simple harmonic motion of a spring-powered chicken scaring machine, etc.

Nice explanation of calculus. However, I would have preferred the masterclass on Galois theory you promised three years ago 🙂

When I started learning Calculus in High School, I began to realise that everything I had learned in maths before then from simple arithmetic, geometry, algebra and trigonometry was leading up to it. Does this mean that one reason we learn how to add and subtract is so that we can eventually do Calculus?

Having always been a touch afraid of calculus this video is a revelation. Thanks for framing this in such a straightforward way!

Calculus is only hard until the point where it clicks in your head and then you feel: "How could I not understand it?"
Tangent 🤣: Archimedes was really close. I think he makes for an incredibly plausible "what if?" scenario. What if he discovered calculus? How much would it change the world?

I always liked to describe differentiation as just a bunch of rules you have to apply and it's usually straight forward how to do it.
Integration on the other hand consists of either knowing the answer or trying to manipulate the function until you do.... with the optional third step of giving up and looking it up on a table.
Also I like that the music got way more epic as soon as you got to the chain rule.

I can't recall what famous mathematician once had this quote (in German): "Ableiten ist Handwerk, aber Integrieren ist eine Kunst".
In english like: "Taking a derivate is a craft, but integration is art."
When you know the rules, you can take the derivative of any function, no matter how complicate it is.
But integration can be a pain in the butt. Without the help of substitution tables, I was quite busted during my studies at university when it came to quotient of functions.
Thanks Burkard for this video (as always)!

Very nicely explained, calculus has always been my favourite, now you just showed another interesting way to learn it, great effort!

Never commented here before... Burkard, you seem like the coolest person! Loved every one of your videos that I have watched. I wish I had the internet when I was a kid. Learning math with you as a kid would have been so much simpler and so much more fun. Thanks for everything! You rock!

Yet again, you manage in 30 mins to better explain something than my maths teachers could over a year. Bravo, sir!

You know Calculus is difficult when someone writes a whole book about how easy it is.

That's what I've always asked myself, I can't believe how amazingly simple calculus is. Truly wonderful.

Welcome back i dont know why should i watch and rewatch your videos over and over again ??????? Thanks much prof .

It always irks me when people teach the subtraction rule and the quotient rule as separate unique rules. The subtraction rule is the addition rule and the constant multiple rule combined. After all, f-g is simply f+c*g where c=-1. Same rules, no need to make a special subtraction rule. The quotient rule can be explained by the product and chain rules combined. f/g = f*h (product) where h = g^-1 (chain).
I just dislike having to learn special cases when they're not at all special cases.

best explanation ever on a math topic from CZcams I've ever found, I'm currently learning cuadratic functions and this video was really easy to understand!

This video helped me so much, and really helped me enjoy calculus (and mathematics in general) much more. Your reasoning made understanding the notation and mathematical processes much easier. I couldn't thank you enough Mathologer!

Only 20 years too late! This is the calculus lesson I wish I had while I was an engineering student. Very well done!

Doing seperation of variables in Diff Eqs was the first time it really hit me how nice Leibniz notation is. It's really just the chain rule, but still, super nice.

65yo, haven't used calculus in over 40 years, still remember the heart of calculus and find it easy to follow this wonderful presentation. I see calculus as "depowering" or "powering" operations. Exponents become addition and back again. I imagine this ranking of increasingly more powerful operations, and calculus as the rules for going up and down in effect.
Very similar to the way explained here by graphs and the table of elementary operations. Go up for slope, go down for area. From the first it seemed so intuitive back when I was young.
Then again, so did dancing molecules which led to my career in medicine and biochemistry as an expert in single carbon metabolism ( the dance of the B vitamins).
Mathologer is a wonderful channel because he loves this. There's an inherent beauty that simplicity brings; but you must first love knowing for the sake if knowing, not some other goal.
Sorry, an old man reminiscing of when he still had a functional mind here. Soon again, I will think.

Wonderful lectures on Calculus! This is the best video I have ever seen on the topic of calculus!👍👍

I'll be honest, I don't know why, but the second problem of integration, about there not being elementary antiderivatives of all elementary functions, just crushed me psychologically when I was learning calculus. I know there are ways around the problem, and I memorized them enough to do decently well in calc, but somehow the trial and error nature of it just lost some of the luster off something I previously quite enjoyed, and turned me off of pursuing any higher forms of calculus.
To this day I can handle most high school math up to that point with only minimal references, but all the various methods of integration slipped away from me like water once the class was over.

"A Tour of the Calculus" (Berlinski) was successful in terms of sales, but a pompous flop in terms of making calculus accessible. Martin Gardner prepared an edition of Silvanus Thompson's "Calculus Made Easy" that includes some additional chapters. Steven Strogatz's "Infinite Powers" is a fascinating contemporary take on how calculus works and what it can do. Highly recommended. I also took a crack at it in "A Stroll through Calculus," which is subtitled "A Guide for the Merely Curious" because it keeps the math as elementary as possible. (It's been used as a textbook for non-STEM majors who need a math class.)

This video helped me a lot! I already studied calculus, but I didn't understand most things I was doing, and this video was a savior for me! Awesome work!!!

Thank yyou for your clarity and humour .It made remembering Calculus so much fun. Bless you.

I always go back to time, distance, speed, and acceleration whenever I need to get an intuition about differentials, it's the simplest indeed, and it's so natural to all of us

just starting to really enjoy maths and discovered it as one of my passions, (doing hours everyday), your videos are very fun and useful! much appreciated!

12th grader here, this is the best educational video I have ever watched. I can not tell you how clear this has made everything to me, I just started calculus, but it feels like I have been doing it for months now. Genuinely thank you.

Amazing! Even if i still remember the calculus and derivative rules, your video makes it easy: the car analogy is pretty much spot on!
The end animations are the top cherry!
"Simple isn't it?" 😁
Thank you!

Pro tip: if you are manipulating equations without regard for units, you are doing mathematics. If instead you DO consider units, you are probably doing physics, engineering, or some other useful thing ;-)

Great, as always! Loved the animations of Thompson and Leibnitz and the metal soundtrack of the end (though I've always been a fan of the usual wistful and nostalgic guitar theme)--it was distracting, but worth the distraction!

Thank you for this kind of video, it really helps to drive home some of the concepts that are often explained in such convoluted terms

Wow. That's the best intuitive explanation of calculus I found. Thanks a lot 💙

Thanks for the video! One more bump you might want to mention is that we're assuming continuous functions and sometimes assuming continuous derivatives. Works great for the Mathologermobile, which I assume can't teleport or go from 0 to 60 in zero seconds.

Its so nice to watch a simplified version of maths. This should be played on the very 1st calculus lesson in highschool.
During my classes they just have us formulas and didn't give much explanation, but on uni on mathematical analysis we went thoroughly through all the proofs. None of those 2 approaches are good for people which have never heard what calculus is, so i don't understand why on most highschools they either don't explain it or prove it in a way that highschoolers have no chance of understanding.

This was epic. I want to get a good book with plenty to practice and teach myself calculus. I think this is very useful!

Because of your videos I learned moving numbers from some place to another by my mind and solve equations, so thanks for teaching me the magic of mathematics.❤️

my high school had a copy of that same book, Thompson's "Calculus Made Easy". i remember using it to teach myself calculus before i ever took a class because i wanted to help my girlfriend at the time with her homework lol

Calculus is so beautiful and elegant theory....and also it is really easy if learned from the correct teacher or book

Dear Professor Polster, I wish Your videos became a part of mandatory study materials at tech. universities. Sincerely, I learned more and many mathematical concepts "clicked into the right place" within my mind while watching Your videos. I have a PhD. in electrical engineering where I worked with Markov chains and complex calculus on a daily basis. Had I had the chance to have such a quality study materials 15 years ago, I feel could have learned 10 times more in the limited timespan. Your visual proofs and way of calculation helped me to perform quick calculations by just manipulating symbols in my imagination rather than writing everything down. One big thank You, since You have the talent not only to understand the topic, but also explain it as real παιδαγωγός.

My favourite extension of calculus is the vector calculus. I studied it in the first year of my graduation. It's been over a decade since - how time flies!!!!

Thompson's book is superb. It's like being led through the steps of calculus by a friendly Victorian uncle

Done. This motivated me 100times to excel at calculus. I'm in 9th standard and that is surely old enough to learn about this. I am sure I will give effort and completely understand the formulas, rules and everything of calculus. Thank you Sir! Funfact : calculus is one of the most scoring parts in maths. If your brain refuses to understand the calculus things, take a small break and think of professor Calculus from Tintin. Also you control your brain, it doesn't control you. Cheers 🍻 bye

I remember how hard it was learning calculus in university. 25 years later, I went back for a Master's in Engineering and realized how amazingly simple and easy it was.

I'm thoroughly enjoying a reentry to calc. Still catching up with the language, so it's a bit bumpy. So the first part was, as always, a challenge. The last section is an eye opener. When these solutions are presented in that way it all becomes very clear. Thank you, please continue!

Maybe you could do a follow-up video about the Risch algorithm to find anti-derivatives for elementary functions. Would be interesting to get an understanding how that works in principle.

00:00 Intro
00:49 Calculus made easy. Silvanus P. Thompson comes alive
03:12 Part 1: Car calculus
12:05 Part 2: Differential calculus, elementary functions
19:08 Part 3: Integral calculus
27:21 Part 4: Leibniz magic notation
30:02 Animations: product rule
31:43 quotient rule
32:18 powers of x
33:10 sum rule
33:52 chain rule
34:54 exponential functions
35:30 natural logarithm
35:56 sine
36:32 Leibniz notation in action
36:43 Creepy animations of Thompson and Leibniz
37:00 Thank you!

Far removed from mathematical studies (6 years since undergrad) … but this might be the best way to describe derivatives and integrals to quite literally anyone and I love it!

Love this summary! Thank you so much!

I love this! Why burden the new student of calculus with all the limit and epsilon-delta proofs before you even start to learn about derivatives and integrals. Here, you just jump right into the fun, powerful stuff and make it easy to understand. Once the student has a grasp of what you can do with calculus, then maybe dig into it a little deeper with the formal proofs involving limits, etc. Learning is so much easier when you first understand why you'd want to learn whatever the subject is. This video does that!

Math was very challenging until grade 10, honestly, in my case, I understood math very quickly afterward. Calculus was the easiest subject during university. Now after 10 years I still remember these rules. Math is all about understanding concepts and visualization of problems in your head, most students I came across learn math by doing examples and memorizing types of problems, at first glance, it seems the correct approach, but in reality, when the problem is slightly changed they struggle to solve it.

One of the best explanations I've seen

I've been teaching myself calculus, and I was very surprised how easy it is. I started in August, only having taken algebra 1 and sort of teaching myself algebra 2/basic trig. It is so interesting.

I have a degree in Math. As most degrees needing math, there were Calc 1, 2, and 3. There is usually another one after that.
After finishing those, I remember taking a Math 300, Into to Calc. This class made all the rest of the calc classes easy/obvious,
I never did figure out if the 300 class was so enlightening since I had the other classes or if I could have taken the class earlier and the other classes would have been easier.

Imo you only really need the chain rule to rule them all.
The product rule *is* the chain rule for multiple variables.
And all others can be derived from it and might sometimes be trivially easy
Like this:
d/dt f(x(t), y(t)) = df/dx dx/dt + df/dy dy/dt
That's the multivariate chain rule, and it's extremely close to the product rule. If you simply take f: KxK -> K to be the product on K, you get:
d/dt x(t) * y(t) = y dx/dt + x dy/dt
which is literally just the product rule.
If you take it to be the sum instead, you get the sum rule, etc.
And the quotient rule is one I never ever use: Just transform to powers and apply the product rule! (Which nets you the power rule too)

at 22:17. Thank you. That is the best description of +C I have encountered. Well done and appreciated. :)

This is a beautiful and very informative video. Thank you for this

I agree. It is also a very "attractive" type of math. What I mean is that once you get it over with, by completing the classes, you kinda want to go back and continue doing calculus. Its not the same with linear algebra or other maths. At least thats my opinion on cal.

I always struggled with algebra but actually found integral calculus to be very easy.

Great video. Animation are very nice and they help a lot. You have putted so much work into this video and I thank you for that.

The book in the description actually makes the learning process much better 🔥🔥

Personally I find the limit definition of calculus very unwieldy and intuitive. Working with Leibniz notation like this is always much preferred in my eye. Turning your differential operations into statements about the convergence of sequences doesn't seem like a particularly natural step and is one that I don't tend to see people do when working with calculus in physics or dealing with them numerically.
In physics and while working with numerical methods I feel like what we do most resembles non-standard calculus, especially ERNA and ERNA^A.
Sam Sanders 2010 article "More infinity for a better finitism" gives a really nice write up of this. Being able to manipulate infinitesimals symbolically without fearing that one of your implied sequences stops converging is great peace of mind. In particular their example of pushing sums through integrals without fear (as long as your result is sensible) is one of those things I bet thousands of people do without thinking about whether it is justified.

I found that running the segment starting at 16:58 at 1/4 speed several times and saying the process as it occurred Very helpful. (But don't forget to MUTE it. The music will kill you.)

Awesome presentation on the beauty of calculus. This is how calculus should be introduced.

Im so happy leasing calculus with you, amazing vídeo professor

Thank you so so much

Oh, this reminds me of large parts of my first calculus class, in particular when my teacher stated that calculous was easy, it's the algebra you have to go through to DO calculus that's hard. Which is true to an extent.
It too me a long time to realize that d/dx meant "As X changes". I was a lot happier when I figured that out.
I don't know if I'd have been less intimidated if I'd known at the time that if you have a number of datapoints, you can figure a formula that fits them and then to calculus to THAT. Ah, well.
Don't forget that the Cs cancel! But your teacher will be mad if you don't put them in!
I wonder if calculus can be used to prove that the distrebution of numbers in pi is normal.
I got lost in analytical geometry. I understood the bits but putting them together was beyond me. And ultimately, I was more interested in humanities. But I did do very well on the math portion of my GRE's. :)
I wonder what the Austrian Autobahn's like.

Fractional Calculus would make for a great series of videos. I happened upon it once and the next day a math professor came in near the end of my physics class. I asked him about it and he had never heard of it. Soon after he gave me and my physics professor a short series of lectures on it. I've always regretted not recording those.

I’m glad there’s smart people out there that understand calc so that the rest of us don’t have to 🙏

Being honest...I rarely make it to the end of a Mathologer video. In this case I've surprised myself by not only making it to the end, but in a seemingly too short amount of time.
No video stretches like a Mathologer video.

I wish I had a math teacher like you in high school. You are great!

Beautiful explanation! Thank You very much !

11:20 "None of what I said so far is really terrifying"
Are you sure?!?! You just talked about suddenly stopping and going backwards on the Germany Autobahn, that _is_ terrifying.

Fermat invented it first, Newton's fluxions make the most physical sense. Leibnitz's notation is way the best.

well explained thank you , this was a great refresher for the basic concepts

Amazing video! A fresh and new take on Calculus logic for me. It really helps!

Fun fact: you can use the velocimeter to measure the velocity of your car, but you can't use the odometer to measure the odor of your car.

Me after failing my calculus final : yes very easy

Beauty. Loved the simplified explanation

Thank you sir for this wonderful representation ,I believe I've learnt a lot from this one video

Ah yes, the subject that made me rip out my scalp

Challenge: Make a similar YT primer on the Calculus of variations. That's not gonna be that easy due to the intrinsic unintuitive nature of the subject.
Anyways, great stuff.

This has made math seem so straightforward in a way that had never even occurred to me.

I almost screamed when you mentioned "Calculus made easy" in the video! It was my first exposure to calculus as well and it is a fantastic book

When I learned calculus, I always seemed to screw up the algebra and not the calculus.

Learning calculus is easy, learning about calculus is hard

This was a great watch.
What makes calculus hard is having to use big words to describe very simple things we all understand.
If you put your foot on the accelerator and speed up 10 km/h/s after one second you're traveling 10 km/h, after 2 -> 20 km/h after 10 seconds -> 100 km/h.
If you then drive 100 km/h for two hour you traveled 200 km
All math my 12 year old can do. The problem is when you try to explain *how* that works. Start using big words like "curves", "slopes" and "areas" and abstract concepts of difference in time dx/dy and peoples' brains start leaking out their ears. Math as it taught from a young age is all about combing numbers to get some number as a result and what matters in getting a correct result. It took me forever to wrap my head around the concept that solving for dx/dy does not mean putting an actual specific value in and getting a result, it's a way to generally define what happens for **any** value you could put in.

I loved the end of the video, beautiful visualization to understand how these properties appear, amazing Journey, even with a Tool vibe at the end hahaha, greetings!!

"Calculus is sO easy!"
- Literal fucking mathematicians