Good evening sir, I have always hated studying since the exams in my country had killed my passion to learn or even understand why i was studying the subjects for. I found your channel about 5 months ago, although i do not watch all your videos, I have subscribed because of only 1 reason, your passion to teach and how you always smile while teaching. It has been an honor to be able to find a teacher/lecturer like you. Thank You!!

A whole blackboard, in which the solution of the problem is included: THESE ARE PURE MATHEMATICS!!🤪 Good day from Greece!!

0:08 how ever you are talking about thanks for giveing us your E-Mail, probably you will recive a question from me within the next days. 0:19 when it looks easy always look twice! 0:45 while i was watching your intro, i thought you would be a great teacher 1:42 first mision for me understanding the task (my english ...) 2:21 yes the space on a bord is always tiny i knowe that i have a board by my self! 2:29 and thanks for expandeing the binomic formulars 4:07 ok yes that is solvable 6:15 a i love this formular! 8:25 looking very interesting! and long but that is fine! 8:46 i allready knew it that you can not compare complex nubers! 9:48 ok here we go now it make sence 10:36 nice time laps that always looks funny during calculations! 12:06 ok and now what are you gonna do? 14:05 ok make sence! 16:47 3 conditions ok lets see 17:51 understood continue 20:14 wait that had to be greater than 0 haven´t it? 21:18 your nice end sentencas again! and sorry i had sth. to do and comment the video later and that will be also for the next videos maight be the case yours sincerly K.Furry

Sir, you are really the Rambo of the mathematics ! 🤗🤗🤗

I really like the way you are explaining those problems , thnak you

I couldn't catch why exactly 3b²-a² couldn't be 0. For x to be a real number, isn't it also possible for 3b²-a² to equal 0?

I like the way you tackle the problem

At 9:18, I suggest that you could have used the difference of two squares in the square root to do more work. 😊

Wow! How long did it take to prepare for this video, i.e., how much sit-down time working toward the solution before the presentation?

Please tell me from where have you studied. I also want to study maths for my higher study

😂 It's so funny when you are "accelerated" !!!!! (time = 9:49)

Solve jee advanced( entrance exam in india) questions are really good , will surely boost ur interest in mathematics 😶

4:38 Here we have Vieta formulas so we can easily write quadratic with roots x and y

Who is he? Fantastic!

11:39 could you explain how you made factoring mentally? Did you use the cross method (I've heard of it, though we have not learnt that at school where I live)

Sorry, but I don't see a problem with D=0, x would remain positive (a²+b²)/(4a²) . Why was this case excluded? Maybe the variables wouldn't not be dustinct, but it's not obvious so far

I believe you overlooked a difference of 2 squares in the discriminant, you would get factorisation with less effort. Also I'm curious when it happens to solving equations x+y=S, xy=P, people on English KZbin start from non-linear equation xy, thus getting a rational function that is to be fought heroically later on , while it's much easier to start from linear equation x+y, not causing any denominator to appear in the course of the solution?😮

Since x,y, and z are positive, and b is always squared, couldn't you have assumed (wlog) that b is positive and do away with the absolute values?

It’s quite an interesting maths but at the end I got confused😂

Thanks

17:15 you have only shown under which conditions the discriminant is positive. For a2 + b2 + D obviously x will be positive, but for a2 + b2 - D it hasn't been shown that x is positive under the given conditions.

I love Math but school just discourages me from solving problems as we are , in a way , forced to cram shit for the exams.

At the end you could only conclude x, y and z are not all the same, but what about x=y and x=z

If x + y + z = a, and x, y and z are distinct, then a >= 6

💚 from india

I only would have gotten to the stage where a>absolute b😢

What?

Again, there is an obvious factorization. The discriminant is a difference of squares.

First view and comment!!!

41 seconds ago...First

x = i, y = 1/i, z = 1 is a solution with a = 1 and b = i PS: don't know if it's the only solution, I got this by solving these equations simultaneously. I got the condition, a² - b² = 2