i have decent math teacher who is really calm, helpful but it ends up with people underestimating him
@riddhimandoley92784 жыл бұрын
You know he means business when keeps his calculator in a case.
@nekogod3 жыл бұрын
To be fair most scientific calculators come in a case. Though granted not as fancy as his.
@asphalt3253 жыл бұрын
Asian teacher with a calculator, that's disappointing
@jycegaming85302 жыл бұрын
@@asphalt325 yikes dude
@arveeharvind2 жыл бұрын
he cares about his most powerful tool yo
@blazoraptor33922 жыл бұрын
@@asphalt325 bruh
@FireGoesFast4 жыл бұрын
Eddie: what should i multiply this by? Student: 7 Eddie: how bout no Another Student: 5 Eddie: YES!
@anthonytonev13574 жыл бұрын
7 is not a creative number.
@Aaron-hv7pr4 жыл бұрын
I've noticed the same guy always saying 7.
@OmniscientWarrior4 жыл бұрын
It was more due to him wanting to keep the lesson simple and if it were done with 7, it would have been complicated and requires this lesson to be complete before they could do the math for that. And the other student suggested by itself not just 5.
@rebel2994 жыл бұрын
OmniscientWarrior ll
@lathil3 жыл бұрын
refunct and portal 2 gamer gang
@polkerabhay4 жыл бұрын
I really want to know what age group he is teaching
@polkerabhay4 жыл бұрын
@@saahilmehta143 yea bro, I'm from India too
@criscrosxxx4 жыл бұрын
@@saahilmehta143 bhai jaisa in bachon ka haal hai lg nhi rha hai inko roots aur cubes ka pta hai. Aur india mei square wagera 6-7 mein kara te hain.
@NovaYippee4 жыл бұрын
@Saahil Mehta ye here in the uk its taught in year 9- 10. They sound like maybe college or uni
@pelicanair20484 жыл бұрын
In my school we are learning this when we are 13
@حسنسلمان-ف6ث4 жыл бұрын
Saahil Mehta in iraq we taught that at. 7th grade
@Ozymandi_as4 жыл бұрын
This guy is such a great teacher, you can see how he engages with the class to be a guide and helper in a journey of discovery. Not some remote pedagogue, he gets alongside them. He loves his subject, and wants us to love it too. Exceptional.
@kalmanbekesi59803 жыл бұрын
It's a nice demonstration but he does the discovery instead of the students. Not this spectacular, but more beneficial to let the students do the thinking.
@stixoimatizontas2 жыл бұрын
@@kalmanbekesi5980 The spectacular fact is that he is minority.
@guybar81284 жыл бұрын
He makes these lessons so interesting that although I know the stuff he teaches I still watch it for entertainment...
@mofumofu5123 жыл бұрын
I feel that, I’m cutting into my geography revision because I’m watching this. Productive Procrastination™️ Trademark that, just in case.
@Asahi_9912 жыл бұрын
Me too 😅, damn so much for a revision
@Olflix Жыл бұрын
@@mofumofu512 Why procrastinate with entertainment when you can procrastinate productively?
@ido28394 жыл бұрын
7:19 fifty. Teacher: MULTIPLY
@Alkalite5 жыл бұрын
Why do kids think addition when we talk about exponents??? "What number, when multiplied by itself, gives you 100?" "50" 🤦♂️ "Multiply. Multiply. Multiply!"
@tristanlj34095 жыл бұрын
Likely because of the fact that if you have the same base, you just add the exponents to each other, eg: 2^2×2^4 = 2^(2+4) = 2^6
@Tomaplen4 жыл бұрын
im sorry mr terence tao
@ManekiNeko19724 жыл бұрын
I actually knew a kid who tried to convince me that 5q - q = 5. Yes, really. You had to say 1q, even though 1q is the same as q and we don't say 1.
@Pumbear4 жыл бұрын
I imagine it's because they are learning something new
@IgnaRcio4 жыл бұрын
That happens when you are not used to exponents yet
@sketchyth0ughts3992 жыл бұрын
Most people learn this stuff in the early years of HS, but I like Eddie because he explains the origins and concepts of everything he teaches. Like, he tells us *why* things are the way they are, which is the main way I remember things so it's super helpful (I find it harder to cram stuff).
@seisveintiocho-x9e9 күн бұрын
I think everyone finds cramming stuff more difficult. Understanding is a great aid to memory.
@kallewirsch22634 жыл бұрын
8:35 I really was surprised, that they got 4*4 correct on the first try
@IStMl4 жыл бұрын
Ikr
@brandonm79524 жыл бұрын
I StM I huh why
@IStMl4 жыл бұрын
@@brandonm7952 It's ironical. It's a very basic thing, but those students look really bad and stupid. So he was making fun of them.
@tf2hontom4 жыл бұрын
@@IStMl rude much? but what am i to expect on yt comments section?
@pointlesslylukesplainingpo12004 жыл бұрын
@@IStMl I wouldn't be so condescending if I were you, considering the hypocrisy of your entire statement... you just said "ironical", which isn't even a word... plus I don't think you know the meaning of ironic lmao. The word you're looking for that describes the joke is "hyperbolic"... so I don't think you're one to ridicule others' academic abilities.
@leidenjun5 жыл бұрын
Why are all the best teachers in KZbin and not in actual classrooms?
@BethanyLowe87735 жыл бұрын
He is in an actual classroom.
@Noor-ib5hf4 жыл бұрын
Oh he is in an actual classroom but just not yours or mine..
@tookoko24884 жыл бұрын
And you only see those 10min videos when your in the mood so you're automatically more likely to listen
@MrSivilla4 жыл бұрын
I'm in a classroom and I'm awesome.
@Hello-nj6pg4 жыл бұрын
Tookoko he’s enthusiastic and makes it sort of fun, there is a difference.
@bieltann90583 жыл бұрын
Every math teacher ever: "Let's just use whatever number I think of... Could be anything... Anything at all." *inserts very specific number to illustrate the lesson*
@treyslider69543 жыл бұрын
Which is a useful skill in higher math, but that's a bad way to teach it: One of the most useful tools when dealing with complicated algebra is the knowledge that as long as you multiply both sides of the equation by the same thing, you can multiply them by *anything*. So, just like the teacher in the example, you pick something *useful*. This concept is tangentially useful later with substitutions as well. Of course, the trick is being able to tell what is going to be useful to you in a given problem...
@EpicWayWay3 жыл бұрын
@@treyslider6954 Maybe don’t multiply both sides by 0 but yeah.
@treyslider69543 жыл бұрын
@@EpicWayWay I mean, it's still valid. 0*A = 0*B for all A & B (but yeah that one probably isn't useful...)
@prumchhangsreng9793 жыл бұрын
@@treyslider6954 to multiply both side by 0 mean u are dividing 0/0. The reason u can multiply both side by any number its because they would divide by themselve. But u cant divide 0/0
@Firefly2562 жыл бұрын
How about we use the complex number (π + ei)
@Moolhood3 жыл бұрын
The fact that I understand all of this with almost no effort even after my grades in maths 15 years ago were rubbish is absolutely astounding
@andrewiaia84412 жыл бұрын
This isn’t hard at all
@munadoesstuff39892 жыл бұрын
For what grade is this?
@codmobile1v1s582 жыл бұрын
@@munadoesstuff3989 year 7 or 8. This is pretty basic math but its part of the fundamentals you need to know for more advanced topics
@seisveintiocho-x9e9 күн бұрын
No, this stuff is very easy. I understood it even before fully watching the video as I could figure ithe rest out myself in a few seconds.
@kathytarkovsky15534 жыл бұрын
“Is the 3 there because there’s three fives” that killed me
@Osirion163 жыл бұрын
I literally wanted to leave the video lol
@amosw7663 жыл бұрын
@@Osirion16 crazy that people aren't born knowing this shit. So rude that a 13 year old asks a question because the topic is unfamiliar!
@Osirion163 жыл бұрын
@@amosw766 I'm not saying that he was wrong for asking, I'm just pointing out the fact that if you know about the topic it's gonna make you cringe. Also, he wasn't so wrong since the 3 fives technically came from the 1/3 so it was actually kind of linked together anyways... Being real here those were the types of questions I'd ask in my math class ;) except I'd reflect a bit more before asking ( Which isn't the right way to do it since there isn't a right or a wrong way to ask a question ! )
@unclegardener3 жыл бұрын
I mean you probably were once in that state. It’s always good to ask if you don’t understand
@KareemMohamed-ff5tt4 жыл бұрын
I couldn't concentrate knowing that he forgot ^10 on the 7^(1/10)
@OmniscientWarrior4 жыл бұрын
I could, thanks to ADHD, but I also never forgot that it was a thing and had focus on it as well, also thanks to ADHD.
@stwyev4 жыл бұрын
Me neither
@idman40814 жыл бұрын
He didn't though, he wrote it out correctly Edit: never mind I see it now, had to watch it like 5 times to see it
@Praneettigga3 жыл бұрын
But by the method he got to =7 I.e. by multiplying the exponents, you do get 10. That’s what I don’t get. You get two different answers from two different methods.
@angelmendez-rivera3513 жыл бұрын
@@Praneettigga No, you must have made a mistake with your arithmetic. The exponents are 1/10 and 10, and they are being multiplied. 1/10·10 = 1, and the base is 7, so you get 7^1 = 7, which is indeed correct.
@iVick19732 жыл бұрын
I really hope his students appreciate how lucky they are
@iamnotcameron3 жыл бұрын
I love the personality and energy, and the wording is great for students who "get" maths, but there are clearly students that haven't grasped previous concepts (such as roots that are anything but square roots). Also, it's never specifically stated that a^1/X is the x root of a, and by the end some students have clearly missed that and still think it's magic.
@esaedromicroflora12473 жыл бұрын
if only my teachers had 1% of this guy ability and pleasure to teach
@catalinas.salazar13863 жыл бұрын
wow, I really needed a refresh. I haven't had any math class since the start of learning virtually and totally forgot how fractional exponents worked. I appreciate it :) thanks
@tmann986 Жыл бұрын
8:40 the way that you multiplied that i had to rewatch a couple of times and that’s a big brain move! Ty!!!!
@briantravelman2 жыл бұрын
This is actually starting to come back to me. I also remember learning a version where the square roots were two different fractions, and I think it's also possible for the square root to be fraction. I was hoping he'd get into those more complex aspects.
@VikeingBlade2 жыл бұрын
Yeah, if you have a fractional root, it's like this: n'th root of x = x^(1/n) so, one-half ' th root of x = x^(1 / 1 / 2) and 1 / 1 / 2 = 2 (because there are two halves in one whole. In general, dividing by a fraction is the same as multiplying by the flipped fraction. Like, dividing by 2/3 is the same as multiplying by 3/2.) So, one-half ' th root of x = x^2. This also works for general fractions: (a/b)'th root of x = x^(1 / a / b) = x^(b/a) Additionally, with some further math, x^(b/a) can be written as the a'th root of x^b. So, (a/b) ' th root of x = a'th root of x^b . Example: (3/2) ' th root of x = 3rd root of x^2 (or "cube root of x^2) Another example: (3/2) ' th root of 8 = the 3rd root of 8^2 = the cube root of 64 = 4.
@captaincaseyvids85792 жыл бұрын
Do you mind explaining what happens if we have a/b as a power as opposed to 1/n?
@louisvictor34732 жыл бұрын
@@captaincaseyvids8579 Basically, you have the bth root of said number to the power of a. Or vice versa, (cube root (5))^3 = 5 = cube root (5^3). You just apply the same reasoning here. Say for simplicity 2^(3/4). We don't now what it is, but we know how to manipulate it based on the "rules" for exponents (they're on the left side of the board if you need a refresher, and technically they're just short cuts based on taking exponents and turning them into sequential multiplications). So, we already know that 2^(1/4) = 4th root of 2, and need to turn that 1 into a 3. By the rules, either we have (2^3)^(1/4), or (2^(1/4)) ^3, either way it is 2^(3 * 1/4) = 2^(3/4). So 4th√(2^3) or (4th√(2))^3. Or generally, for X^(a/b) = bth√(X^a) = (bth√(X))^a
@captaincaseyvids85792 жыл бұрын
@@louisvictor3473 Much Thanks!
@RoniRonkoKovatch4 жыл бұрын
Which means: X^(a/b) = b root of X^a 10^(3/4) = 4th root of 10^3
@tiosam14264 жыл бұрын
hypercube root
@AdrianAbdel4 жыл бұрын
This is exactly what I was looking for, thanks! the 1/x exponents I actually learnt about in economics for growth rates but I was curious about other fractional exponents, not presented here.
@RoniRonkoKovatch4 жыл бұрын
@@AdrianAbdel The general case was missing from the video :-( So i wrote it for everyone... :-)
@IStMl4 жыл бұрын
Bedloe Did you really need someone to extrapolate the general case for you ?
@inigo87404 жыл бұрын
Might I add, you can have the roots/exponents in any order you want. They are both basically the same operation like division is backwards multiplication so a*b/c=a/c*b.
@jasonlough66402 жыл бұрын
These videos are the best magic tricks. Nothing required but thought, and suddenly everything looks different.
@NiIex4 жыл бұрын
6:47 "true because we said so" was how I was though at high-school. This is the first time I seen it explained so intuitively so I'll never have to remember where does what go in m/n over X. Once you understand something you don't have to rely on memory because you'll always be able to fall back on logic. The more logic you accumulate the easier is gets. Got one anecdote from when I was around 8 years old and we learned about division with leftover. They never explained what "leftover" part was: the stuff left in your hand or the stuff you are missing to hand out so everyone is satisfied. For example 33/7 is 4(+5) but for me it was 5(+2). I need two more so there's no leftover to hand out. Lol I got the lowest grade on the test in class but it was the most valuable grade I got in my life. Because from then on I learned the importance of understanding rather than memorizing. Since then I was top guy in math class throughout my education and loved math most of the time. It's all about the teacher. Until, many many years later, I learned from Numberphile that 1+2+3+... = -1/12. Yeah, fek math after that :)
@VikeingBlade2 жыл бұрын
That's a pretty cool understanding, actually! "I need two more" is the same as saying "I have negative two left over." You could perfectly say 5 with remainder -2. I'd give credit for that if I were the teacher grading. Also, the -1/12 thing isn't a true equality. It's just a cool kind of thing you can work out with algebra, but it's not an actual value. It's sorta like a "glitch in the system"; it doesn't really matter, it's just cool. So I wouldn't let that deter you from learning interesting math! I'm glad you liked the video :)
@scragar2 жыл бұрын
@@VikeingBlade The answer does come useful in a few situations with physics where summing an infinite number of possibilities sums to a negative possibility less than 1 which you can approach using the same sort of technique, but it's actually for a very different reason to their abuse of a divergent series, in physics the possibilities interfere so multiple similar but out of phase possibilities can be less likely than any single possibility in the sum.
@jamesmosher69123 жыл бұрын
I really enjoy your videos! Keep up the great work! Love your enthusiasm and your style of breaking down and trying to show things in a simple manner. This is how most math teachers should be.
@eliot75024 жыл бұрын
Whait what kind of place do you teach in to have people not knowing the square root of 100 ?????
@JordHaj4 жыл бұрын
Pre school
@tatowerty72364 жыл бұрын
Third trimester
@charbelkassab63534 жыл бұрын
The square root of 100 is 10.
@southernkatrina81614 жыл бұрын
Any year 8 class.
@xdgaming9524 жыл бұрын
hey! it keeps happening no matter how old u are! sometimes 2x3 seems 5 LOL!
@baptistebauer993 жыл бұрын
Been knowing you for a while now, but I've never actually watched your videos (College student right here). Now I'm watching them because it's possible I'll become a high school math teacher pretty soon... and I want to learn how to teach :) Learning from the best! Very good approach. Thank you a lot sir!
@justgiz4 жыл бұрын
I love how often you say "Get your calculator out". Back in my day they'd say "No calculators, you need to know how to do this in your head, You won't always have a calculator with you"
@jeremiahbarron21584 жыл бұрын
Michael Lanman ok boomer
@dhplaz14754 жыл бұрын
Phones: Let me introduce my self!
@CodeWithLukas4 жыл бұрын
@@jeremiahbarron2158 damn you just slayed him
@mrviometal49484 жыл бұрын
@@jeremiahbarron2158 Allow me to be the party pooper here, this is not an okay boomer moment for 2 main reasons: 1- It is not a boomer thing, it happened to Millenials and to some Gen Z's and is still happening in many countries to Gen Z's in school....sooooooo....yeah, not a boomer thing, he is not talking about the time people had to go several miles to make a phone call or something. 2- okay boomer doesn't apply here cause the guy is not criticizing anyone nor glorifying "boomer's days"...so the whole foundation and context of using the "okay boomer" card are non-existent. PS: waiting for your reply to this with "okay boomer"
@OmniscientWarrior4 жыл бұрын
But notice that he only does that to show that the math adds up and remove the probability of error. Otherwise, they have to do this in their heads.
@ervingori5533 жыл бұрын
I love how you teach them I learned so much just by watching a few of your videos
@quantumfrost94674 жыл бұрын
I'm going into an engineering degree and I've done real well at calculus. Not sure why I'm watching but this is a good teacher in action Also at about 6:50 it is written that 10root7=7, it's nit picking but it'll be counted as wrong in an exam
@sethvoll2 жыл бұрын
yea i think he meant to put (10root7)^10=7
@f0z1la2 жыл бұрын
usually i get bored in maths class but this guy got me invested in watching the whole video in full screen-
@Ender7j3 жыл бұрын
I haven’t seen someone do multiplication like that in a long time. That was how I was taught to do it, break it down and add the parts. Nice
@mofumofu5123 жыл бұрын
Wut how else do you do your multiplication? That’s like the only way to do it. Unless I’m really dumb and don’t know some other way, pretty sure the only way is breaking it down
@louisvictor34732 жыл бұрын
Btw, the "break it down and add parts) is really just (a+b) * (c + d) = ac + ad + bc + bd (in any order, ofc) but with the occasional trivial steps removed, and some turbo nesting simplified. The above rule is itself just x(c+d) = xc + xd, applied recursively (x = a + b -> xc + xd = (a+b)c + (a+b)d = ac + bc + ad + bd. For example, 46 * 4 = (40 + 6) * (4 + 0) = we skip this step excluding the trivials [40*4 + 40*0 + 6 * 4 + 6 * 0] = 40*4+6*4. When we have multiple digits on both, it is just the longer version (23 * 16) = (20 + 3) * (10 + 6) = 6 * 3 + 6 * 20 + 10 * 3 + 10 * 20 [this is literally the same order you learn to do in school when you put the 16 under the 23 and do the "shift 1 to the left" trick which is really making the writing more clear ignoring the zeroes. When you get to something with more digits, you're just doing the longer x(c+d+e+...) where x=(a+b+...) version of it in a simplified way, but it is still the same thing.
@Ender7j2 жыл бұрын
@@louisvictor3473Here are two examples that show how I was shown: 46*4 = 40*4 + 6*4 = 160 + 24 = 184 Or 46 * 32 = 40*32 + 6*32 = 1280 + 192 = 1472 Just seems simpler the way I was shown to make math easier to do. Just break up one of the numbers so it’s a multiple of ten, multiply that and the part you took off by the other number and add them back together. Nothing fancy. Cheers
@louisvictor34732 жыл бұрын
@@Ender7j Exactly. When you break one of those apart, you're basically doing x(a+b), but faster. Just pointing out where those methods come from, and why they're mathematically sound.
@Gauteamus4 жыл бұрын
8:25 Always find a way to bring old Ramanujan into the class room!
@dk31533 жыл бұрын
isnt it funny how simple and logical this is but no teacher could ever make me realize it up until now :/ i wonder if there is a playlist with these simple but essential rules. would love to see em all through.
@xSpeakerYT3 жыл бұрын
I was hoping he would do a crazy fraction too like 3 to the 5/7 power
@justmehere_3 жыл бұрын
I think he was just doing basics for the sake of the students so they can understand this first before getting into the more complex stuff but it's basically the numerator will be a power and the denominator will be a root so in your example it would be the 7th root of 3^5
@xeonlw7 жыл бұрын
Just a question, how do you do numbers to fractions like 2/3 Like how would you do 3 to the power of 2/3
@sparky97057 жыл бұрын
3^2/3 would be equal to the cube root of 3^2, the denominator is the root and the numerator is the power.
@iqtidarrahman21487 жыл бұрын
2/3 is really 2 * 1/3 so it would be cube root squared ((x)^1/3)^2
@sparky97057 жыл бұрын
"2/3 is really 2 * 1/3" - This isn't true with powers, though what you continued on with was. EDIT: I misinterpreted what Iqtidar said, so this is wrong and he was right, I apologise. x^(1/3)^2 = x^(2/3), but x^2 * x^(1/3) != x^(2/3) (which was how I originally interpreted it).
@piggo56455 жыл бұрын
The denominator (in this case, 3) is the root. The numerator (in this case, 2) is the power! So this will be cube root of 3, and then square it
@jasondeng76774 жыл бұрын
Root by the denominator, power by the numerator (you can remember this because numerator sounds more like generator than denominator and generators generate power) 2^ 2/3 = 2^2 then take that, and cube root. Equation: x^(y/z) = x^y root z'ed
@Roarssk69203 жыл бұрын
Needed to brush up on this exact thing for reasons. This guy is a really great teacher.
@aburritosdestiny56157 жыл бұрын
Thank you so much Eddie I'm so thankful for this video. My maths Teacher is horrible at teaching that. Keep it up man. Thanks heaps, I get it now 👍🏽
@s0li4 жыл бұрын
this is so amazing how simply this guy answers questions i have been thinking of for a longer while
@MrJanes-cl5sj3 жыл бұрын
when he realized no one in the class could do an elementary cube root in their heads, he must have been like "wow I just wasted my day..."
@Fillster3 жыл бұрын
Teachers aren’t like that
@TheIntrovertsDebrief-lq4hg4 ай бұрын
This was exactly the thing that kept making me stumble but oh my you explained it so easily
@werdazhel_96724 жыл бұрын
Wait I learned this in 7th grade
@zafarb42193 жыл бұрын
I mean, this looks to be the very first introduction to Exponential / logarithmic function s, so it's normal to do his stuff again in 10th grade
@danijones86014 жыл бұрын
Very helpful. I'm teaching myself calculus and i got stuck on fractional exponents
@MayankGoel4476 жыл бұрын
Thanks alot Eddie!! You are one of my best teachers in life
@sleepwalker67752 жыл бұрын
"whenever you're unsure, get your calculator out." - Eddie Woo
@ManekiNeko19724 жыл бұрын
I was always sarcastic around teachers, but this guy I'd be so interested I wouldn't try anything with him.
@Hello_there_obi3 жыл бұрын
You were a terrible person hahaha
@angelmendez-rivera3513 жыл бұрын
One interesting fact that students should definitely be careful of is that while (a^m)^n = a^(m·n) is always true when m and n are integers, this is not so when they are rational non-integers, and so the order in which you exponentiate matters. For example, (x^2)^(1/2) = |x|, because x^(1/2) is typically defined in such a way that it is never negative. Therefore, even if x is negative, (x^2)^(1/2) is not. So the exponents will cancel one another, but the sign of x is changed if x < 0, because ^(1/2) can never return a negative value by definition. However, if you change the order of the exponents, you get [x^(1/2)]^2 = x, which is a different result than |x|. Once you begin to deal with exercises where x is an arbitrary complex number, it only becomes more complicated and the difference becomes more noticeable. This is why one should be careful when explaining fractional exponents. The convention is to define x^(m/n) as [x^(1/n)]^m and not as (x^m)^(1/n) because it leads to more consistency.
@Smokyjohnson19834 жыл бұрын
Where was Mr Woo when I was at school? I would have been a Maths genius by now
@alburnto4 жыл бұрын
Thanks Eddie, needed some help visualizing rational exponents :)
@jeremysasson33494 жыл бұрын
That teacher is teaching where? Edit: Cherrybrook Technology High School
@Hello_there_obi3 жыл бұрын
I think it’s also useful to explain every operator has its mirror opposite (inverse). So minus can undo an addition, divide can undo a multiplication, and a root power can undo a power. Also its useful to add the when you write the square root sign, the root power is 2 so whilst there should be a little 2 above the root symbol, we dont add it because its the most common and we dont bother because mathematicians are lazy haha! Just like you dont write +5; you just write 5. You assume it to be positive
@aneecraft23505 жыл бұрын
What grade are you teaching? I would love to be in your class. Amazing tutoring bro!
@namzeyt43562 жыл бұрын
probably like 6th
@ElektrikDunyam4 жыл бұрын
At time index 6:18 10th root of 7 is equal 7 . Small mistake but in general very good lesson.... thanks
@TasTheWatcher4 жыл бұрын
What about irrational indices?
@scmiller4 жыл бұрын
Tas That one is doable but a little harder. It comes down to the fact that irrational numbers, at their core, are defined by which rational numbers are to their left and which to their right. So you can just say what numbers your result is between: 2^pi is more than 2^(31/10) but less than 2^(32/10). And you can do that until the indices get infinitely close, and then you know where your result is.
@Lashb1ade4 жыл бұрын
If an irrational number can be written as an infinite series then you could do: 2^e=2^(2 + 1/2 + 1/6 + ... ) = 2^2 * 2^(1/2) * 2^(1/6) * ...
@kallewirsch22634 жыл бұрын
it depends If you are just interested in a numerical result you could also use logarithms to "bring down" the exponent. a ^ x is the same as eg. e ^ ( x * ln ( a ) ) you can calculate that for a numerical result or if this happens in some mathematical derivation continue with that. But of course: if you haven't learned about logairthms yet, there still is something waiting to be learned.
@IStMl4 жыл бұрын
So 3 methods out of the comments: 1. Approximate (frame it) 2. Use a series if possible 3. Give the exact result using logs
@benaronson24102 жыл бұрын
I feel bad for the guy who asked why Eddie is multiplying the cube root of 5, 3 times. He's so lost.
@braingamer19246 жыл бұрын
the 10th root of 7 is not equal to 7 it is (10th root of 7)^10 is equal to 7
@aneecraft23505 жыл бұрын
Nerd
@tristanlj34095 жыл бұрын
Which is exactly what he taught
@ahmadalqassem18393 жыл бұрын
this mans teaching methods are MAD their amazing i wish my teacher was like him
@yehoshuas.69174 жыл бұрын
I already knew this...thought he might go more in depth conceptually. Oh well, better luck next time.
@Swagmittens4 жыл бұрын
me too. I know it's the same as the roots, but I was interested in knowing how roots are calculated
@chrisofnottingham4 жыл бұрын
A conceptual step for fractional indices is; The fraction of the (identical) factors. So for a = 3 x 3 x 3 x 3 x 3, then a^(4/5) means 4/5 of the factors, ie 3 x 3 x 3 x 3
@xdgaming9524 жыл бұрын
Basically i guess u take the root of that number which is in denominator and keep the number in the space on which it has the power as a fraction
@johanjacobsen3934 жыл бұрын
Interesting how I normally fall asleep at my own math lessons but watch this in my spare time. The students must love to have him as their teacher
@shere_kan83294 жыл бұрын
How hold are they ?? I've learned that when I was 14
@ayushi263 жыл бұрын
13*
@Hello_there_obi3 жыл бұрын
Too old.
@Fillster3 жыл бұрын
@@ayushi26 Why are you correcting him? If he learned it at 14 he learned it at 14
@diemt60823 жыл бұрын
@@Fillster im pretty sure it was a joke
@jiong853 жыл бұрын
We should use his KZbin videos to teach math from now on. He teaches way better than ALL the teachers i have ever had.
@44r0n-94 жыл бұрын
Btw, the 10th root of 7 is not equal to 7 :D
@xsamsungg57354 жыл бұрын
It says: [ 7^(1/10) ]^10 You multiply the exponents, and the fraction cancels out, and you're just left with 7^1, which is just 7.
@dreamsnicer4 жыл бұрын
theheroinfather yeah, he just forgot to add the ^10 part at the end
@guilhermedantas50673 жыл бұрын
I and most people watching this are fully aware of fractional indices. Yet, we're all here because of this dude, which is quite entertaining.
@AnonimityAssured4 жыл бұрын
At 4:00 (and just after 10:00), "three times" should have been "twice" (or "two times", if you prefer). Such a good teacher deserves far smarter students, but I suppose such slow students need a really good teacher. I strongly suspect that if Mr. Woo were teaching in Malaysia, his students would shout out in unison the correct answers to his questions.
@crystallizard58674 жыл бұрын
Do your parents love you? Do you love yourself?The correct answer is no, because nobody should love you after what you have just said.
@AnonimityAssured4 жыл бұрын
@@crystallizard5867 Did you listen to the answers to his questions? Did they strike you as being the product of quick thinking and astute reasoning? Did you notice how few students were even offering answers? It may seem mean-spirited to point out that the class, as a whole, was not particularly focused or interested, but that doesn't make it any less true.
@aidafresh78734 жыл бұрын
@@AnonimityAssured i'd say they were rather engaged but you're right, not the brightest. eg "whats the square root of 100"... "50" ????
@oligophrenie55712 жыл бұрын
I feel like if Eddie books a flight he has to buy 2 seats so his brain can rest as well
@tanelkagan4 жыл бұрын
If there isn't already, there needs to be a Part 2 to this, to examine fractional indices where the numerator isn't 1. For example, what does 5 to the power 2/3rds mean? I know the answer, just saying that it would be useful for those learning to be able to explore the next step. :-)
@bayon82912 жыл бұрын
So what is 5^2/3
@tanelkagan2 жыл бұрын
@@bayon8291 So if we're at the point where we understand what 5^(1/3) is, we can just use the exponent rules again. As we know, multiplying two numbers with the same base involves adding the powers, but this can equally be applied "in reverse". We can think of 5^(2/3) as being 5^(1/3 + 1/3). Applying the "addition of powers" rule, we can see that this must be the same as 5^(1/3) x 5^(1/3). Now we have something (5^(1/3)) multiplied by itself, in other words, we have 5^(1/3) all squared. In the video, around the 3:00 mark, Eddie looks at a similar situation but in that case, he uses it to show that 5^(1/3) is essentially the cube root of 5. That's because in that example, 5^(1/3) is being multiplied by itself not once but twice, so there is a "chain of three" and we are cubing it. That is why 5^(1/3) must be the cube root. In our case we're multiplying 5^(1/3) by itself just the once, i.e. squaring it. So 5^(2/3) can be thought of as the square of the cube root of 5. However, there's another interesting application of the exponent rules here. One of the rules says that if we raise a power to another power, we multiply the powers. So, (x^y)^z = x^ (yz). But multiplication is commutative, so (yz) = (zy). We can arrive at the number (2/3) by multiplying 2 and 1/3, but the order doesn't matter. 2 x 1/3 is the same as 1/3 x 2. Therefore, we could get to a power of 2/3 by having something raised to the power 1/3, and then squaring it (in which case the powers multiplied would be 1/3 x 2) or, we could just as well square something first, then take its cube root (in which case multiplying the powers gives 2 x 1/3). The take away here is that both approaches give the same result. So, whilst a power of 2/3 can be thought of as the square of the cube root (as we saw above), it can just as equally be thought of as the cube root of the square. That's a beautiful result, and it means that we have at least two ways of approaching how to evaluate (if that's what we want to do). For example, let's look at 64^(2/3). We can either work out the square of 64, and then take its cube root, or we can take its cube root, then square that. We should get the same result. Now I don't know about you but I'm not particularly keen on working out 64 squared. It's not *too* difficult but it's a bigger number than I need to work with, and then I have to think about how to work out a cube root of that big number. Not impossible but not too obvious. Instead, I may know, or can reasonably easily work out that the cube root of 64 is 4 (since 4 x 4 x 4 = 64). Now, I can simply square that to get my answer, 16. If I *had* done it the first way, I would have had 64 x 64, equalling 4096. Then I'd have to work out the cube root of 4096, which is indeed 16 (since 16 x 16 x 16 = 4096). If our numbers are nice and friendly then trial and error may work, but again there's no simple way to do this without a calculator or using some other processes so its much easier to calculate the cube root of 64 instead of 4096. In summary, if you have a number x raised to a fractional power (y/z), the result is equivalent to (i) raising x to the "yth" power, then taking the "zth" root of the result; or (ii) taking the "zth" root of x, then raising the result to the "yth" power. Hope that helps!
@masterhind2036 Жыл бұрын
I know this is very late but think of it like the other rule where (a^m)n=a^mn but go in reverse so picture 2/3 as the mn. You can split 2/3 as 2×1/3 and and that basically makes it (5^2)1/3 which is 25^1/3 so 5^2/3 =25^1/3. So basically you raise it by the numerator and then root it by the denominator.
@niedzwiedz18434 жыл бұрын
3:10 seven
@schumzy4 жыл бұрын
I really like this guys intuitive explanation of maths. I only figured most maths rules later in life after too much struggle.
@zamasuawaken19084 жыл бұрын
what year class is that
@vibs0034 жыл бұрын
I also wanna know. Someone said sq. root of 100 is 50
@ahsannazar66524 жыл бұрын
Looks really dumb class tho
@IStMl4 жыл бұрын
Ahsan Waleed Exactly
@andyward52144 жыл бұрын
11 I think
@kimpavfx3 жыл бұрын
everyone gangsta till eddie woo pulls up without monetizing his vids
@michaelwirth68434 жыл бұрын
These students should stop talking nonsense and start listening.
@IStMl4 жыл бұрын
Exactly, such a good teacher for such bad students
@jamesa.6464 жыл бұрын
@@IStMl Omfg get your head out of your ass
@inigo87404 жыл бұрын
At least they're participating. I've never heard such an active class before.
@wingjaigaming82404 жыл бұрын
At least they are not falling asleep or zoning out
@michaelwirth68434 жыл бұрын
@@inigo8740 Yes but they don't have the decency to quit the talking when the interesting teacher talks.
@williamwilting4 жыл бұрын
Let me take a guess here. What if you do this the opposite way? What I mean is this: you take a fraction root of a number, for example the 1/3 root of 4. Does that basically mean that you're taking 4 to the power of 3, making the result 64? And if so, how would you explain it on the board?
@Grizzly013 жыл бұрын
That's exactly right. You could write the 1/3 root of 4 as 4^(1/(1/3)). 1/(1/3) = 3
@liamcraddock95394 жыл бұрын
Just realised I watched a whole video explaining what a cube root is... I finished A level maths what the hell am I doing here? lol
@bionicpenguin54714 жыл бұрын
me 2 bruh.....
@KingMe-qz2hr3 жыл бұрын
I’m interested in how he explained things like 4^3/2
@davidjames16844 жыл бұрын
6:20 - 10th root of 7 = 7? The bastard didn't fix that.
@44r0n-94 жыл бұрын
Yeah that bugged me too😂
@heyjude20543 жыл бұрын
How i miss my advanced algebra teacher. He also teaches like you mr. Woo. He made Math my favorite subject. Props to all of the teacher who teaches like you!. Happy new year!
@mohammadaijaz74184 жыл бұрын
The students seen to be atleast 15-16 and if this is how they are at that age, no wonder Asians seem legend to them.
@soham75104 жыл бұрын
They can't be 15-16.... Look at their silly answers
@soham75104 жыл бұрын
They don't know 64 cube root... They aren't 16
@mgjvd2 жыл бұрын
I really fascinates me how much base school teachings can vary so much between countries. This can be common knowledge for someone, and complex maths for another. Bizarre
@AlanRWynne3 жыл бұрын
You explain very well how it works when raising to the power of a fraction when the numerator is 1, How about adding further explanations on the implications and effect when you are raising to a fractional power and the numerator is not 1.
@Anonymous40452 жыл бұрын
You have the discriminate be raised to the power of the numerator. In the case of the numerator being 1, it’s implied to raise it to the 1st
@eddielou3 жыл бұрын
This guy is an amazing teacher! Wow, I wish I had had a math teacher with such a phenomenal way of explaining things.
@Ebvardh Жыл бұрын
No matter how many times I see this explained, and no matter how many different teachers say this, it always feels arbitrary that fractional exponents are equal to roots indexed by the denominator.
@tyaniggy13974 жыл бұрын
love your lessons, making math very interesting
@rifatibnnezam74222 жыл бұрын
An amazing math teacher that I've ever seen.
@hiteshranjanmohanty2193 жыл бұрын
Sir You teach in an excellent way
@shaheenkotwal6093 жыл бұрын
after a long time refreshing my basic maths superb...loved it
@ES117772 жыл бұрын
He's a great teacher!!!
@LunchThyme2 жыл бұрын
I've been wondering this exact thing for 10 years, wish they'd taught this at my high school.
@2cents4833 жыл бұрын
Man's got epic patience. I came here to see if there was a better way to teach my 8-year old math. I wouldn't have this patience!
@LoveBystroem4 жыл бұрын
I want this guy as my math teacher
@samueleleuzzo2546 Жыл бұрын
I would love to have a math teacher like you
@superman000013 жыл бұрын
Such a great guy.
@ralphcaluag24032 жыл бұрын
I miss doing this during my college... Being a teacher trainee, I get to do what he does in highschool setting. Now that I graduated, I was starting out as a tutor... Until the pandemic ruined my chances due to limited occupation resources. Things may be going back to normal, but it's still a slow pace so I doubt openings are available for Face2Face classes.
@bentaylor254 жыл бұрын
"I wonder if that's the wind taking down a power station" you said that right as I turned my brightness down...
@qasimmohamed13384 жыл бұрын
Excellent teacher with enthusiasm to teach
@MrZnarffy3 жыл бұрын
Very good teacher, logical and good explanations..
@drewsturgiss2 жыл бұрын
I love that you hear the class talking at the start (normal high school), and then it eventually becomes raptured silence. He makes learning a joy.
@aiapihud43442 жыл бұрын
Even as I already know this, it's fun to see how he explains it.
@gauravjain16654 жыл бұрын
My school would become heaven if i see him at my school.. Love from India
@Chrls53 жыл бұрын
Awesome classes!!!!
@mikehunt36883 жыл бұрын
6:32 imagine the frustration if you were working on something in a computer class.