I love you're enthusiasm. It makes me feel like I'm not crazy or left alone because sometimes I find math or science fascinating and when I try to talk to people about it they look at me weird. We need more teachers like you.
I am a pensioner and I alternate between doing math and the garden.Your presentation is just so captivating. I just can't imagine what I would be doing if I couldn't do math .Kudos from Johannesburg. Been thinking that functional equations were reserved for IMOs. 😅
This teacher of ours; Eagle-eyed and confident. He displays body language according to the students' level of understanding. He gives wonderful and super lessons. He is a complete math genius.🌺👏
Your way of solving it is universal. Great! I found the numerator of RHS equals ( x + 2 )^2, and then I tried to express the denominator with ( x + 2) and ( x - 2 ). 8 x = ( x + 2 )^2 - ( x - 2 )^2 ∴ RHS = ( x + 2 )^2 ÷ { ( x + 2 )^2 - ( x - 2 )^2 } = { ( x + 2 ) / ( x - 2 ) }^2 ÷ [ { ( x + 2 ) / ( x - 2 ) }^2 - 1 ] Replace ( x + 2 ) / ( x - 2 ) with x, you can get x^2 / ( x^2 - 1 )
I also did this but the identity for the denominator might not be known by many so I will try make a story that might help finding solutions in the future. We will try to guess the function. First notice the x square in the numerator which means that there is some squaring involved. So try f(t) = t^2. You get the numerator of the Right Hand Side (RHS) but not the denominator. You can multiply and divide the denominator by the thing you want which is (x-2)^2. Then you have 8x/(x-2)^2 in the denominator. Issue is that there is no evident simplification unless you saw the relevant identity in the past and remembered it. So we will have to write 8x in some way that involves (x-2)^2. If in the end we want to write a function of (x+2)/(x-2) we will probably need to write 8x in terms of (x-2)^2 and (x+2). If we want to get rid of the x^2 in (x-2)^2 when that term is expanded then it might be interesting to look at (x-2)^2-(x+2)^2.
I am from Bangladesh. And mymother langyage is not english. But your lecture is incredible. Despite being a bangali i can understand your solution so easily.your way of teaching is not boring at all. You are a really great teacher
Muy interesante, didáctica y buena clase, a mi hija le servirá mucho esta excelente exposición. Estamos muy agradecidos con su bella persona, bendiciones y éxitos para Usted y su linda familia. ❤
Been WAAAAY too long since I looked at this stuff. I was always pretty good and keen on math, but once this stuff started to turn up, it made the subject loads more interesting. It's hard to describe, but the way these functions relate to one another, it almost feels like you're peeling away at the layers of how the universe as a whole operates. Some of the discoveries end up being more exciting than others, of course. Very similar vibes with how taking the derivative of a function, and then taking that derivative, and then taking that derivative, and all these functions you end up with all relate to one another. It's like the numbers behind the numbers behind the numbers. You're introduced to things like parabolas and other common graph shapes well before learning derivatives, so it just felt like a huge plot twist when you first learn that these derivatives were there 'driving' the shapes of the graph all along. I don't know, just always seemed very cool to me.
Your content is so good that i think you deserve atleast a million subs. I am from India and i love watching your content. If for any reason you get depressed or think that you should stop making your videos, there's always me and my group of friends watching your vdos. Your teaching skills are fabulous. The way you make maths interesting. Thanks a lot my man. Love from india
that's not entirely correct the final x is not the same as the first one. t cannot be 1 or -1. and if f(x) = t^2/(t^2-1) then x cannot be 1 or -1. But t = x+2/(x-2), then whatever x t cannot be 1 so there is no problem here. t = -1 when x = 0 so you have one exception in common x = 0 is the same as t = -1. when x = 2 t is not defined so there is no problem. The first equation is not defined on 0 and -2 but the answer is not defined on 1 and -1
in the original statement f((x+2)/(x-2)) = (x+2)^2/8x you would _not_ input 2 into that function by replacing the x with 2, because x is not the input to the function. You would replace the x with a number such that (x+2)/(x-2) is equal to 2, because (x+2)/(x-2) is the input to the function. (6+2)/(6-2)=2 (6+2)^2)/8(6)=4/3 thus 2 is in the domain of the original function, you can watch him work out how 0 is in the domain of the original function in the beginning of the video. Changing the value you put into a function does not change the function or its domain. If we had a separate function g, defined so that g(x) = f((x+2)/(x-2)) then _that_ function, g, would not be defined at 2, but f still is, because when you feed 2 into f, it returns 4/3.
Yes u are almost right (I see what u were trying to say) - clearly plugging in x = 0 ==> there is a simple pole at t = -1 for f(t) and taking some limit e.g. let x -> 2+ ==> f(t) -> 1 as t-> +inf let x -> 2- ==> f(t) -> 1 as t -> -inf This can be seen all from the initial question (and clearly holds with the final answer!), but all he wanted to do was find the function, which he did - not specify the domain and range of the functional equation (which is an obvious 2 second job anybody can do). Slight mistake in your comment: the domain of f(x+2/x-2) has those problems, not the domain of f itself; domain of f only has a singularity at -1
As x approaches 2 from 2+ or 2- we see that the value is 1, thus allowing us to find f(t) as t approaches both negative and positive infinity. Mind Blown.
Great videos you make, they are super useful. For me personally i have, in the last couple of days, learned a bunch of new techniques from your videos.
Sir I am an Indian student studying in class 12th (high school).. i substituted t = x+2/x-2, and then directly used COMPONENDO-DIVIDENDO to get t+1/t-1 = x/2.. so x = 2(t+1/(t-1)).. then I directly considered (x^2 + 4x + 4)/8x as (x+2)^2/8x and substituted x as 2(t+1/(t-1)) on both the sides to get the desired answer. Thanks a lot for this question sir..
(x^2+4x+4)/8x=(x+2)^2/((x+2)^2-(x-2)^2). After dividing both numerator and denominator of the fraction by(x-2)^2, the result is: f(z)=z^2/(z^2-1), where z=(x+2)/(x-2). It is always a pleasure to watch your enthusiastic presentations.
Neat algebra - you might wish to explain how the original function won't given an answer at x = 2, whereas the revised function won't give an answer at x = 1 or -1 and how that works okay - as you have shifted the points where the function doesn't converge because of a divide by zero and why that would be allowed!
Hey, really nice. I noticed something though, before 12:36 but at that time it's the step above the one you're pointing at. The top is the form a^2 + 2ab + b^2, so it equals (a+b)^2, which is ((t+1)+(t-1))^2 which evaluates to (2t)^2 then 4t^2, which is what you end up with as well. Just thought it was interesting, I immediately noticed it when I saw it
I prefer a clear and simple formulation to avoid any confusion In the first and second lines, the letter 'x' is used in different ways. We're used to writing y=f(x), so it's easier to change the 'x' to 't' in the first line. This gives us the equations: f(x)=y x=(t+2)/(t-2) y=(t^2+4t+4)/(8t) Our task is to eliminate the variable 't' from these equations. (t-2)*x=(t+2) x*t-2x=t+2 x*t-t=2x+2 t=2(x+1)/(x-1) y=(t+2)^2/(8t)= ... etc
You have very good content and scenic mastery. The form presented shows the equivalence with the change of variable It could also have been done like this x²+4x+4=(x+2)² (x²+4x+4)/8x=(x+2)²/8x, dividing numerator and denominator by (x-2)² =((x+2)²/(x-2)²)/(8x/(x-2)²), adding and subtracting 1 from the denominator =((x+2)/(x-2))²/(8x/(x-2)²+1-1) =((x+2)/(x-2))²/(((x+2)/(x-2))²-1) then the change f(x)=x²/(x²-1)
I have a very easy solution. in the RHS, the numerator can be written as (x+2) ^2 and denominator can be written as ((x+2) ^2 - (x-2) ^2) and then divide the numerator and denominator with (x-2) ^2. Then replace x + 2/x - 2 with x. The solution is x^2/x^2 - 1
Wonderful manner that conveys such enthusiasm and positivity. I would have understood better if a graph of the function had been included when it was found. That might have helped understand the domain issues that got so many commenters in knots.
After substitution of t := (x+2)/(x-2), I found f(t) = 1 + 1/[(t - 1)(t + 1)] which can be reasonably defined for all real (or complex) values of t except for t = ±1. It's an even function with a double zero at t=0, two poles of order 1 at t=-1 and t=+1, and a horizontal asymptote y=1. 😃
The solution is actually easy. On the first sight, we can already see that 8x = (x+2)² - (x-2)², let u = (x+2)/(x-2), the eq becomes f(u)=1/(1-u⁻²) And that's the function we need to find.
Great channel, I really appreciate what you're doing and how you explain math concepts. Regarding this algebra the only thing I miss is to determine the function domain which is also part of the solution.
Excellent video sir, i thoroughly enjoyed it. just by looking at the thumbnail. I guessed we would have to plug in another variable, But I made the mistake of substituting a directly into the equation. like, f(a) = (((x+1)/(x-1))^2 + 4(x+1)/(x-1) + 4 )/ 8((x+1)/(x-1))
Man I wish I had found you earlier. You make things so interesting and easy. You are such a charismatic person and teacher which makes it very easy for me to learn. Thank you for your videos.
11:15 When simplifying [(t+1)^2 + 2(t+1)(t-1) + (t-1)^2)], instead of expanding everything and cancelling out you could have used the general formula (a+b)^2 = a^2 + 2ab + b^2, would’ve been neater.
So my takeaway is that when given a functional equation call it f(g(x)) in order to determine f(x) we simply find the inverse of g(x) so that when we plug that into f(g(x)) we get f(x). Sounds simple enough! Very good example I just wish he would have mentioned the technique in more general terms at the end. After all as a mathematician we want to be able to generalize results.
Something cool i noticed is that at 10:50, the numerator is the expansion of: (a+b)^2 where a=(t+1) and b=(t-1) So we can simplify the numerator here to: ((t+1)+(t-1))^2 Which is (2t)^2 Which is 4t^2
You have great "board-side" manner. Cool...But sometimes shorter methods are easier to follow. Put x+2=a, x-2=b and a/b=c, then, f((x+2)/(x-2)) is f(a/b) or f(c) and RHS = a^2/(a^2-b^2) = 1/(1-(b/a)^2) = 1/(1-(1/c)^2) = c^2/(c^2-1) Now, as f(c)=c^2/(c^2-1) Substituting x for c, gives f(x)= x^2/(x^2-1)
let's say you have g(y) = y. You can also say g(z) = z, without much of an explanation right ? You can also say g(t) = t or g(x) = x. y z t and x are defined localy, they only exis fort this function and do not depend on anything else around. It is the same thing at the end, you just replace the variable inside without any trouble. f(t) = t^2 / (t^2 -1) is the same as f(x) = x^2/(x^2-1) The last x is not the same as the first one. Moreover the first x has not the same domain as the last one.
Hello! At the beginning of the video we are given a function f. We know that if the input is x+2/x-2 then the output is x²+4x+4/8x. We want to know what will be the output if the input is just x. And of course, x is just some number. Sio if we know the output od the function for some number, we can subatitute x as input value and find the result! If we create a new variable t such that t=x+2/x-2, we can say that f(x+2/x-2)=f(t)=x²+4x+4/8x. As you can see, we now have one single number as an input, instead of expression. However, function of t is equal to the x²+4x+4/8x, how do we calculate that? Well, t is a number that we defined as t=x+2/x-2, and that implies that x=2t+2/t-1. So now we can replace every x in x²+4x+4/8x with 2t+2/t-1, because that's what x is equal to, if x+2/x-2=t. After simplifying we get f(t)=t²/t²-1. I remind you that t is just some number. So if we plug some number into the function, we get number²/number²-1. Just plug x as the number and the result is f(x)=x²/x²-1
10:49 You could have factorised the numerator (t+1)^2 + 2(t+1)(t-1) + (t-1)^2 = ((t+1) + (t-1))^2 = (2t)^2 = 4t^2 since it is of the form (a + b)^2 = a^2 +2ab +b^2
If I plug x = -1 into the original equation, I get f(-1/3) = -1/8, but I can’t even substitute -1 instead of x in the resulting expression for the function. Isn't this a contradiction?
13:18 Why can you switch the f(t) = (t^2)/( (t^2) - 1) to f(x) = (x^2)/( (x^2) - 1) when we defined t as (x + 2) / (x - 1)? It doesn't make sense to me because I think that is like saying t = x, when at the start it did not. Was the goal just to get the input to be one letter?
Well, t = (x + 2) / (x - 2) is a substitution. He could have used something other than 't', and the question could have used a different variable like 'a' instead of 'x'; it doesn't really matter. What matter is, that in the end, he ended up with f(t) = t² / (t² - 1). If that's true, then no matter what you replace t with, the function should remain valid: f(0) = 0² / (0² - 1) = 0 f(z) = z² / (z² - 1) f(x) = x² / (x² - 1) He surely chose x because the function in the question was given in terms of x.
What I did instead was The numerator was (x+2)² and the denominator was just the difference of (x+2)² -(x-2)² by comparing this to f(x+2/x-2) We can say that f(x)=f(x/1)=x²/x²-1
It's a month late, but basically since f(t) means that t is a variable of that function, t could be replaced by other variable including x. However t ≠ x, like you said, t = x+2/x-2, t is not equal to x. And f(t) ≠ f(x). Basically means that t is not implied to be equal to x, the variable that is used in the function is changed, not made equal. For example if f(x) = x+2 Let's say x = 2 and t = 3 Then f(t) = t+2 = 3+2 = 5 And f(x) = x+2 = 2+2 = 4 the formula of (x+2) is still the same, but x ≠ t because 2 ≠ 3 and f(t) ≠ f(x) I hope anyone reading this comment understood my explanation.
@@fannyliem3536i got your point but aren’t we supposed to calculate the actual f(x)’s value? It is like saying i found the f(P) but not f(x) but since i can rename the variable let’s replace P by x…..the value which we got at last is not of the actual defined function.
@@3v4battler well again t and x are just variables and they can be replaced with each other or any other variable. you can even check the answer. using the f(x) he found, find the original f(x + 2/x - 2) and you will get the same equation given in the question. thus verifying.
He is a very patient teacher with a very sympathic voice and charisma.
Sympathetic*
his english very clear too. yes he is very sympathetic.
I love you're enthusiasm. It makes me feel like I'm not crazy or left alone because sometimes I find math or science fascinating and when I try to talk to people about it they look at me weird. We need more teachers like you.
Agreed, he has a perfect attitude to teach!
hey, I'm 65 and just starting to do some math again. I was able to follow that long forgotten algebra so thanks, that is encouraging - subscribed.
I am a pensioner and I alternate between doing math and the garden.Your presentation is just so captivating. I just can't imagine what I would be doing if I couldn't do math .Kudos from Johannesburg. Been thinking that functional equations were reserved for IMOs. 😅
So nice of you
i am 70 retired eng;ineer you got my attention love your teaching style and i love math
This teacher of ours; Eagle-eyed and confident. He displays body language according to the students' level of understanding. He gives wonderful and super lessons. He is a complete math genius.🌺👏
I love the fun you have with maths. Your enthusiasm is infectious. I wish my teachers had had half your ability.
انا من فلسطين . واحب الرياضيات . انت مذهل و رائع . ساتابعك باستمرار . تحياتي
Never stop teaching Coach !
Thanks
10:55 The top part was a perfect square, you don't even need to distribute everything
((t + 1) + (t - 1))^2 = (2t + 1 - 1)^2 = (2t)^2 = 4t^2
Haha! Now I see it.
yup, this is the comment im looking for
That is how I handled it, too.
Yup, came for this!
I noticed that and was wondering whether you would use it.
Your way of solving it is universal. Great!
I found the numerator of RHS equals ( x + 2 )^2, and then I tried to express the denominator with ( x + 2) and ( x - 2 ).
8 x = ( x + 2 )^2 - ( x - 2 )^2
∴ RHS = ( x + 2 )^2 ÷ { ( x + 2 )^2 - ( x - 2 )^2 }
= { ( x + 2 ) / ( x - 2 ) }^2 ÷ [ { ( x + 2 ) / ( x - 2 ) }^2 - 1 ]
Replace ( x + 2 ) / ( x - 2 ) with x, you can get x^2 / ( x^2 - 1 )
I did exactly the same thing!!
Same thing I did
Me too
I tried same thing but missed in expressing 8x in terms of X+2 ad X-2 , thanks for the steps
I also did this but the identity for the denominator might not be known by many so I will try make a story that might help finding solutions in the future.
We will try to guess the function. First notice the x square in the numerator which means that there is some squaring involved. So try f(t) = t^2. You get the numerator of the Right Hand Side (RHS) but not the denominator. You can multiply and divide the denominator by the thing you want which is (x-2)^2. Then you have 8x/(x-2)^2 in the denominator.
Issue is that there is no evident simplification unless you saw the relevant identity in the past and remembered it.
So we will have to write 8x in some way that involves (x-2)^2.
If in the end we want to write a function of (x+2)/(x-2) we will probably need to write 8x in terms of (x-2)^2 and (x+2).
If we want to get rid of the x^2 in (x-2)^2 when that term is expanded then it might be interesting to look at (x-2)^2-(x+2)^2.
Functional equations were always very cruel to me. Thanks to you, I'm starting to see the light. Keep on teaching!
I am from Bangladesh. And mymother langyage is not english. But your lecture is incredible. Despite being a bangali i can understand your solution so easily.your way of teaching is not boring at all. You are a really great teacher
Same bro🇧🇩🇧🇩
this is one of the most compelling math videos it has been my joy to behold. Nice cap, too.
This is where i learnt how to solve functional equations, thank you so much!!
Excellent sir. Loved the way you simplified and great explanation.
Muy interesante, didáctica y buena clase, a mi hija le servirá mucho esta excelente exposición. Estamos muy agradecidos con su bella persona, bendiciones y éxitos para Usted y su linda familia. ❤
that's amazing. Never seen functional equations before but solving that looked like a lot of fun.
Been WAAAAY too long since I looked at this stuff. I was always pretty good and keen on math, but once this stuff started to turn up, it made the subject loads more interesting. It's hard to describe, but the way these functions relate to one another, it almost feels like you're peeling away at the layers of how the universe as a whole operates.
Some of the discoveries end up being more exciting than others, of course. Very similar vibes with how taking the derivative of a function, and then taking that derivative, and then taking that derivative, and all these functions you end up with all relate to one another. It's like the numbers behind the numbers behind the numbers.
You're introduced to things like parabolas and other common graph shapes well before learning derivatives, so it just felt like a huge plot twist when you first learn that these derivatives were there 'driving' the shapes of the graph all along. I don't know, just always seemed very cool to me.
I’m very happy to have found your channel!!!
That quote at the end sent me. Very enjoyable personality.
Excellent, very interesting this exercise. Thanks so much!!! Greeting from Perú!
Your content is so good that i think you deserve atleast a million subs. I am from India and i love watching your content. If for any reason you get depressed or think that you should stop making your videos, there's always me and my group of friends watching your vdos. Your teaching skills are fabulous. The way you make maths interesting. Thanks a lot my man. Love from india
Wow! That means a lot to me. Thank you, and God bless.
You should specify that x cannot be 0 or 2 in domain of f as those values are not in the domain of original functional equation.
that's not entirely correct the final x is not the same as the first one. t cannot be 1 or -1. and if f(x) = t^2/(t^2-1) then x cannot be 1 or -1.
But t = x+2/(x-2), then whatever x t cannot be 1 so there is no problem here. t = -1 when x = 0 so you have one exception in common x = 0 is the same as t = -1.
when x = 2 t is not defined so there is no problem.
The first equation is not defined on 0 and -2 but the answer is not defined on 1 and -1
I was just looking for f(x).
in the original statement
f((x+2)/(x-2)) = (x+2)^2/8x
you would _not_ input 2 into that function by replacing the x with 2, because x is not the input to the function. You would replace the x with a number such that (x+2)/(x-2) is equal to 2, because (x+2)/(x-2) is the input to the function.
(6+2)/(6-2)=2
(6+2)^2)/8(6)=4/3
thus 2 is in the domain of the original function, you can watch him work out how 0 is in the domain of the original function in the beginning of the video.
Changing the value you put into a function does not change the function or its domain. If we had a separate function g, defined so that
g(x) = f((x+2)/(x-2))
then _that_ function, g, would not be defined at 2, but f still is, because when you feed 2 into f, it returns 4/3.
Yes u are almost right (I see what u were trying to say) - clearly plugging in x = 0 ==> there is a simple pole at t = -1 for f(t)
and taking some limit e.g. let x -> 2+ ==> f(t) -> 1 as t-> +inf
let x -> 2- ==> f(t) -> 1 as t -> -inf
This can be seen all from the initial question (and clearly holds with the final answer!), but all he wanted to do was find the function, which he did - not specify the domain and range of the functional equation (which is an obvious 2 second job anybody can do). Slight mistake in your comment: the domain of f(x+2/x-2) has those problems, not the domain of f itself; domain of f only has a singularity at -1
Every one in the comment going crazy
As x approaches 2 from 2+ or 2- we see that the value is 1, thus allowing us to find f(t) as t approaches both negative and positive infinity. Mind Blown.
Great videos you make, they are super useful. For me personally i have, in the last couple of days, learned a bunch of new techniques from your videos.
Sir I am an Indian student studying in class 12th (high school)..
i substituted t = x+2/x-2, and then directly used COMPONENDO-DIVIDENDO to get t+1/t-1 = x/2.. so x = 2(t+1/(t-1))..
then I directly considered (x^2 + 4x + 4)/8x as (x+2)^2/8x and substituted x as 2(t+1/(t-1)) on both the sides to get the desired answer.
Thanks a lot for this question sir..
(x^2+4x+4)/8x=(x+2)^2/((x+2)^2-(x-2)^2). After dividing both numerator and denominator of the fraction by(x-2)^2, the result is: f(z)=z^2/(z^2-1), where z=(x+2)/(x-2). It is always a pleasure to watch your enthusiastic presentations.
You just need to be diligent to solve such a tedious exercise. I like the way you're teaching, thanks Prime!
Neat algebra - you might wish to explain how the original function won't given an answer at x = 2, whereas the revised function won't give an answer at x = 1 or -1 and how that works okay - as you have shifted the points where the function doesn't converge because of a divide by zero and why that would be allowed!
Nice lesson! Congratulations teacher.
Hey, really nice. I noticed something though, before 12:36 but at that time it's the step above the one you're pointing at. The top is the form a^2 + 2ab + b^2, so it equals (a+b)^2, which is ((t+1)+(t-1))^2 which evaluates to (2t)^2 then 4t^2, which is what you end up with as well. Just thought it was interesting, I immediately noticed it when I saw it
I prefer a clear and simple formulation to avoid any confusion
In the first and second lines, the letter 'x' is used in different ways. We're used to writing y=f(x), so it's easier to change the 'x' to 't' in the first line.
This gives us the equations:
f(x)=y
x=(t+2)/(t-2)
y=(t^2+4t+4)/(8t)
Our task is to eliminate the variable 't' from these equations.
(t-2)*x=(t+2)
x*t-2x=t+2
x*t-t=2x+2
t=2(x+1)/(x-1)
y=(t+2)^2/(8t)= ... etc
I love your introduction sir...
easy to understand. you're a great teacher!
Very nice video! Students will love it! Keep going!
Your presentation is awesome.
The best Math teacher i have ever seen
Iam from egypt
And iam a new subscriber
YOU MAKE MATH FUN🎉
THX❤❤❤❤
i really like the syle he talks/teaches here!!
12:38 you can simply write the numerator as [ (t+1)+(t-1) ]^2=(2t)^2=4t^2
You have very good content and scenic mastery.
The form presented shows the equivalence with the change of variable
It could also have been done like this
x²+4x+4=(x+2)²
(x²+4x+4)/8x=(x+2)²/8x, dividing numerator and denominator by (x-2)²
=((x+2)²/(x-2)²)/(8x/(x-2)²), adding and subtracting 1 from the denominator
=((x+2)/(x-2))²/(8x/(x-2)²+1-1)
=((x+2)/(x-2))²/(((x+2)/(x-2))²-1) then the change
f(x)=x²/(x²-1)
Yes, Cooool !!!!
Very nice. I like your videos. Just continue
Bro you are great! I'm studying maths profoundly at school and your content is exactly what I'm obsessed with. Thank you!
Keep up the good work Sir!❤ From Nigeria😊
I have a very easy solution.
in the RHS, the numerator can be written as (x+2) ^2 and denominator can be written as ((x+2) ^2 - (x-2) ^2) and then divide the numerator and denominator with (x-2) ^2. Then replace x + 2/x - 2 with x. The solution is x^2/x^2 - 1
Wonderfully clear explanation!
Wonderful manner that conveys such enthusiasm and positivity. I would have understood better if a graph of the function had been included when it was found. That might have helped understand the domain issues that got so many commenters in knots.
After substitution of t := (x+2)/(x-2), I found f(t) = 1 + 1/[(t - 1)(t + 1)] which can be reasonably defined for all real (or complex) values of t except for t = ±1.
It's an even function with a double zero at t=0, two poles of order 1 at t=-1 and t=+1, and a horizontal asymptote y=1. 😃
In the video, the handwriting on the blackboard is the prettiest I have ever seen on TH-cam.
Wow, thank you!
honestly i liked your explanation quite a lot dam it was interesting how you explained great respect from India Ali 🖖👍
We need more math teachers like this dude
Your enthusiasm is very nice
I really like this level of maths. Thanks.
Very, very nice explanation!
Greetings from Brasil
Dream math teacher around the world❤❤❤
The solution is actually easy. On the first sight, we can already see that 8x = (x+2)² - (x-2)², let u = (x+2)/(x-2), the eq becomes f(u)=1/(1-u⁻²)
And that's the function we need to find.
You are a very good teacher!
Sou muito fã de suas aulas, obrigado!
Great channel, I really appreciate what you're doing and how you explain math concepts. Regarding this algebra the only thing I miss is to determine the function domain which is also part of the solution.
A mathematics video has never had a harder plot twist than this 🔥
Very good. Greetings from Brazil
The way you explain the steps and logic is really remarkable and I enjoy all your videos.
Best math teacher i have ever seen, most think i love is your smile 😊
You have a Amazing attitude
A god's gift
Excellent video sir, i thoroughly enjoyed it.
just by looking at the thumbnail. I guessed we would have to plug in another variable,
But I made the mistake of substituting a directly into the equation.
like, f(a) = (((x+1)/(x-1))^2 + 4(x+1)/(x-1) + 4 )/ 8((x+1)/(x-1))
i like this person man, such a happy intraction
Man I wish I had found you earlier. You make things so interesting and easy. You are such a charismatic person and teacher which makes it very easy for me to learn. Thank you for your videos.
11:18 The numerator is (a+b)² identity. But Absolutely beautiful question and solution!!
I hated maths at school, yet here I am watching this and enjoying it now I'm retired. I guess we just didn't have very good teachers.
11:15 When simplifying [(t+1)^2 + 2(t+1)(t-1) + (t-1)^2)], instead of expanding everything and cancelling out you could have used the general formula (a+b)^2 = a^2 + 2ab + b^2, would’ve been neater.
You are awesome, subscribed immediately!
So my takeaway is that when given a functional equation call it f(g(x)) in order to determine f(x) we simply find the inverse of g(x) so that when we plug that into f(g(x)) we get f(x). Sounds simple enough!
Very good example I just wish he would have mentioned the technique in more general terms at the end. After all as a mathematician we want to be able to generalize results.
What you explained is brilliant. That wasn't my strategy in any way. I would try that next time. Thanks
Something cool i noticed is that at 10:50, the numerator is the expansion of:
(a+b)^2
where
a=(t+1) and
b=(t-1)
So we can simplify the numerator here to:
((t+1)+(t-1))^2
Which is
(2t)^2
Which is
4t^2
t로 치환하는 방법은 미처 몰랐네요. 멋진 아이디어 감사합니다!
Very nice video !
Thank you, awesome training.
Thank you. You are like the Bob Ross of math.
You have great "board-side" manner. Cool...But sometimes shorter methods are easier to follow.
Put x+2=a, x-2=b and a/b=c,
then, f((x+2)/(x-2)) is f(a/b) or f(c) and RHS
= a^2/(a^2-b^2) = 1/(1-(b/a)^2)
= 1/(1-(1/c)^2) = c^2/(c^2-1)
Now, as f(c)=c^2/(c^2-1)
Substituting x for c, gives
f(x)= x^2/(x^2-1)
THIS IS SO COOL! How was this never taught to me? I made it all the way through cal 3 without ever knowing this
13:00 can someone explain the last part? I don't really understand why t got replaced by x on all sides.
let's say you have g(y) = y. You can also say g(z) = z, without much of an explanation right ?
You can also say g(t) = t or g(x) = x.
y z t and x are defined localy, they only exis fort this function and do not depend on anything else around.
It is the same thing at the end, you just replace the variable inside without any trouble. f(t) = t^2 / (t^2 -1) is the same as f(x) = x^2/(x^2-1)
The last x is not the same as the first one.
Moreover the first x has not the same domain as the last one.
Hello! At the beginning of the video we are given a function f. We know that if the input is x+2/x-2 then the output is x²+4x+4/8x. We want to know what will be the output if the input is just x. And of course, x is just some number. Sio if we know the output od the function for some number, we can subatitute x as input value and find the result!
If we create a new variable t such that t=x+2/x-2, we can say that f(x+2/x-2)=f(t)=x²+4x+4/8x. As you can see, we now have one single number as an input, instead of expression. However, function of t is equal to the x²+4x+4/8x, how do we calculate that? Well, t is a number that we defined as t=x+2/x-2, and that implies that x=2t+2/t-1. So now we can replace every x in x²+4x+4/8x with 2t+2/t-1, because that's what x is equal to, if x+2/x-2=t.
After simplifying we get f(t)=t²/t²-1. I remind you that t is just some number. So if we plug some number into the function, we get number²/number²-1. Just plug x as the number and the result is f(x)=x²/x²-1
Excellent, sir
10:49 You could have factorised the numerator (t+1)^2 + 2(t+1)(t-1) + (t-1)^2 = ((t+1) + (t-1))^2 = (2t)^2 = 4t^2 since it is of the form (a + b)^2 = a^2 +2ab +b^2
If I plug x = -1 into the original equation, I get f(-1/3) = -1/8, but I can’t even substitute -1 instead of x in the resulting expression for the function. Isn't this a contradiction?
your a great teacher
Nice....nice.
Excellent blackboard techniques.
13:18 Why can you switch the f(t) = (t^2)/( (t^2) - 1) to f(x) = (x^2)/( (x^2) - 1) when we defined t as (x + 2) / (x - 1)? It doesn't make sense to me because I think that is like saying t = x, when at the start it did not. Was the goal just to get the input to be one letter?
Well, t = (x + 2) / (x - 2) is a substitution.
He could have used something other than 't', and the question could have used a different variable like 'a' instead of 'x'; it doesn't really matter.
What matter is, that in the end, he ended up with f(t) = t² / (t² - 1).
If that's true, then no matter what you replace t with, the function should remain valid:
f(0) = 0² / (0² - 1) = 0
f(z) = z² / (z² - 1)
f(x) = x² / (x² - 1)
He surely chose x because the function in the question was given in terms of x.
I am inspired by you my Brother
The change of variables from calc 2 at the end is so nice
This is the part I didn't understand! Why can you arbitrarily decide to call it x again? I thought x was defined in a specific way
What I did instead was
The numerator was (x+2)² and the denominator was just the difference of (x+2)² -(x-2)² by comparing this to f(x+2/x-2)
We can say that f(x)=f(x/1)=x²/x²-1
👍 great
Excellent!!
Glad to see that your channel is growing.
Hey I don’t understand at the end…at first you took x+2/x-2 = t…so it gives you X= 2t + 2/ t-1…but at the end why did you implied t = X
It's a month late, but basically since f(t) means that t is a variable of that function, t could be replaced by other variable including x.
However t ≠ x, like you said, t = x+2/x-2, t is not equal to x. And f(t) ≠ f(x). Basically means that t is not implied to be equal to x, the variable that is used in the function is changed, not made equal.
For example if f(x) = x+2
Let's say x = 2 and t = 3
Then f(t) = t+2 = 3+2 = 5
And f(x) = x+2 = 2+2 = 4
the formula of (x+2) is still the same, but x ≠ t because 2 ≠ 3 and f(t) ≠ f(x)
I hope anyone reading this comment understood my explanation.
@@fannyliem3536i got your point but aren’t we supposed to calculate the actual f(x)’s value? It is like saying i found the f(P) but not f(x) but since i can rename the variable let’s replace P by x…..the value which we got at last is not of the actual defined function.
@@3v4battler well again t and x are just variables and they can be replaced with each other or any other variable. you can even check the answer. using the f(x) he found, find the original f(x + 2/x - 2) and you will get the same equation given in the question. thus verifying.
Sir sorry to abrupt you
But in the end of solution
You just replaced x in place of t
And did not put the value of t taken x+2/x-2
Great video !!
Are you a mathmatics teacher in USA?
Nice! 👏👏👏👏
Can you make an alternate video with alterations such as if f(x) belonged to a certain set or the function was discontinuous.
Thank you
HAA, I did it correct. And....very nice handwriting!