Bro i am from Nepal 🇳🇵 reading grade 11 can i give entrance of iit madras online bsc in computer science as i am from Nepal?? And will i be Able to read from iit ???
Bhai tumhare bolne se kuch nhi hota abhi samajh aata h fir dheere dheere sab gayab or bhai ye fact hai har human ke sath hota hi hai isliye ye sab video dekhne se koi faida nhi h uski journey hi usko sikhati hai ... ha bas ek problem hai jab tak der ho jati hai 😀
@@Warish.. bhai apne aas pass jo aspirants hote hai unki suno teacher ki suno or main cheez uska ek unique combination bnao apne hisab se Bro mehnat sab kar rahe hai but strategy se koi nhi krta uska faida udhao . Hope tum kuch samjha warna silent raho yt chodo akele hoke baitho socho tumhare liye kya acha hai Bhai tu hi sochega apne liye or koi nhi aayega jitna jaldi samjhega utna faida ^
Hey , I found another interesting thing here, actually for all values of n in h(x) = f(f(..n times...f(x)) , the graph intersects the original line at point p(2,2) and (0,2). Now see, if there is any function f(x), where f(0) = a and f(a) = a, then for any h(x) = f(f(f........f(x)) , all h(a) = a ,and will intersect at at same points. Also for f '(x), if f '(0) = b and f '(b) = b, then for any n in h(x) , h'(0) = b^(n+1) , { ! use n accordingly, mine is different by above convention }, Since our question has b = 1 so b^(n+1) = 1=b and satisfying another above symmetrical conditions . Hence we are obtaining such symmetrical results. Thank you !! ❤❤ ( If you find more by my answer, please let me know in my comment's reply )
Hello bhaiya ,I am in my 1sem. Of btech and now I am realising that problem solving is not just a part of jee preparation but it is for our next so many years of engg. Life
Here's the analysis i made from this video (might be wrong ) For any onto function f:[a,b) ---> [a,b),y=f(x) where x Belongs to [a,b) if at x=a, f'(x) =0 and f''(x)>0 (minima); then range of f(f(f(f(f(f(f(........f(x)......)))))) = range of y; where a,b are any positive real number
do you know pj sir (unacademy ) he solve jee advanced questions using very unique thinking manipulations ,,,so everytime i get reminded of you whenever i saw him solving questions by very unique and deep thinking method,,,,,,,both have same mindset and its just improving my prospective too for jee maths
Hello Dear, Pratham Bhaiya👏, I am a student of class 12th. I will give my 12th exam in the year 2024 but there is a problem in this that I had given my first 12th exam for the first time in the year 2023 in which due to my ill health issues my exam got spoiled due to my bad madical condition as a result my 12th percentage is very low, so I am repeating 12th class again in the year 2024 as a private candidate, so I request you to tell me how many chances do I have to give JEE Advanced, that is, in the year 2024 or 2025, or this year 2024 only. PLEASE guide me it will be very kind of you. Thanking you
Bro i am from Nepal 🇳🇵 reading grade 11 can i give entrance of iit madras online bsc in computer science as i am from Nepal?? And will i be Able to read from iit ???
I got so inspired by your idea and made one question myself here it is and it's a open challenge to everyone F(x)=ax²+bx+c and Range(F(x))=[69, infinity) and 69b+2c=138, 138a+b=0 h(x)=F(F(...2024 times...F(x)) Find range of g(h(x)) where g(x)=x²+2x+2
@@vineetgoyal6095 FoFoF.........F ki toh range F waali hi aa jayegi, aur maine jo conditions di hai b and c ke beech me vo ye bata rahi hai ki vertex ke x and y coordinates same hai aur fir g(x) ke andar 69 rakh ke range 4901 aa jayegi
@@jeesimplifiedcan't appreciate more man you just showed me the path to live from your videos I learnt to live a better life, the best thing I learnt is to be happy while doing the work, it's the best thing. Can't believe you replied ❤
Bhai ek advice chaiye thi apse mera 11 th ka 45 percentage syllabus cover h aur ab coaching mein optic start hone vala jo aram se 2.5 month le rha jisse mere max to max 3 question bnege mains 1st attemt m kya mai. Is time optic chodke 11th le topics krlu avhe se hight weightage vale?😢
hello bhaiya we can generalise it , as a quadratic = ax^2 + bx + c has a range from [q,infinty ) {q is a random point } and it's minima is at x = q , then we use f(f(f......ntimes(x)))) it's range will be [q,inifnity) , as quadratic x^2 - 2x + 2 is following the same fashion , Hope you get this comment
I observed that If there is a function: f(x)= ax^2+bx+c and at the minima of it's graph x=y or , {both conditions f(-b/2a)=(-b/2a) are same as x=(-b/2a)and y=f(x)=f(-b/2a)} Then RANGE OF f(x)=RANGE OF f(f(f...ntimes(x)))...n+1 times,where n belongs to N
Sir ne kaha- if range of f(x) is [1,oo]. (oo is infinite😁😁) And minima of f(x) is at x=1 Then range of f(f(f...n times(x)= range of f(x). AUR Maine kaha if f(x) ke minima par x=y Tab range of f(f(f...n times(x)=range of f(x). You can say , it's general form of what sir said.
This type of problems are a bit easy in the quadratics where the function in monotonous about the minima point It would be very difficult when we consider functions which have multiple non periodic minimas
Another extended version question Q:- let the functions f(x) = x²-2x+2 g(x) = x²+2x Then find the range of function fogofogofogofogo........2024 times....fog(x) for all real values of x
Recently i came across your channel and i loved the professional and practical vibe of it im just wondering whether u are nitian or iitian(IM not one of those kids whos asking for clarification i have loved your videos and smartness so just asking) anyways bro keep uploading have a good year!
@@sahilbatt tu hai hi kon ki teko wo batyega nai dekhna to mat dekh just absorb this channel and you wont regret and remember to thank him at result day
Bhaiya I had enrolled in Set of 60 in the month of July. In the description of Set of 60, it was written that Set of 60 is a chapter-wise problem-solving course where 60 questions from each chapter (Calculus + 3D + 2D Geometry + Matrices and Set) are discussed in detail by Pratham Pengoria. In calculus, we have 10 chapters; 2D geometry has 5, and then 3D and matrices. In total, we have 10+5+1+1 = 17 chapters, and right now we are on Day 6 of the 2nd chapter of Calculus, which is Limits. Bhaiya, if we continue with this rate, then we will be completing the course by the end of 2024, and most probably we will have our JEE Main in January 2024. By the end of 2023, we would have only completed half of the calculus. Bhaiya, you know how tensed JEE aspirants are when their syllabus completion is not on time. Bhaiya, can you please tell me what the expected time of completion of the problem-solving course will be?
The way you have classified chapters is different, I’ll correct it. Chapters in calculus 1.Functions. 2.Limit, continuity and differentiability. 3.AOD and maxima minima 4.Definite Integration and AUC 6.Indefinite Integration 7.Differential eq Under Vector 1.Vector 2D 2.Vector 3D Algebra Mat and det In total it sums up to 11 chapters not 17. Additionally, It preferred to complete calc before mains as it an adv level program your goal should be completing it after 1 month of jee mains 1 or jee mains 2. depending on whichever goes well At the time of advanced, We will also TRY to provide some additional resources to boost your prep.
