Fermat’s Theorem in Number Theory L-6 | Beyond Textbooks | Maths Olympiad | Vedantu Olympiad School
Want to score 100% in the Olympiad Exam? Fermat’s Theorem is one of the scoring topics in Number Theory to crack the Olympiad Exam easily. 🥇 Here in this Beyond Textbooks series, we will cover a lot of Fermat’s Theorem | Number Theory | Fermat’s Theorem Example | Fermat’s Theorem in Number Theory | Fermat's Little Theorem Formula |Number Theory Olympiad 2020 | Fermat's Theorem Example | Maths Olympiad | Number Theory Olympiad by Abhay Sir. This session meets the needs of every student by building a deep, solid understanding of the Fermat’s Theorem in Number Theory and, covering all the Fermat’s Theorem Equations to get the outstanding top score in the Olympiad.
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➡️ Math Olympiad:
The Math Olympiad provides an absolute assessment of students’ knowledge and motivates them towards academic improvement. One aspiring to excel in Olympiads should not take Math tests lightly, the questions are more conceptual and trickier. Mastering Math requires lots of practice.
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➡️ Number theory in Math Olympiad 2020:
Number theory, a branch of mathematics concerned with properties of the positive integers (1, 2, 3, …). Sometimes called “higher arithmetic,” it is among the oldest and most natural of mathematical pursuits.
🎯Fermat’s Theorem:🎯
✔ Fermat’s theorem, also known as Fermat’s little theorem and Fermat’s primality test, in number theory, the statement, first given in 1640 by French mathematician Pierre de Fermat, that for any prime number p and an integer a such that p does not divide a, p divides exactly into ap − a. Although a number n that does not divide exactly into an − a for some a must be a composite number, the converse is not necessarily true.
Let’s watch this Math Olympiad - Number theory Lectures to know more about the Fermat’s Theorem.
Students having the following questions while preparing the Mathematics in Olympiad Exam:
✦ how to solve Fermat’s Theorem Equations
✦ Fermat’s Theorem Olympiad 2020
✦ Number Theory in Maths Olympiad
✦ Fermat’s Theorem Example
✦ Fermat’s Theorem in number theory
🎯 Let's crack the Math Olympiad with your favorite Abhay sir, who came up with the concept that our subject will come alive in your life and your classroom. This helps to engage students with Fermat's Theorem Session, through an interactive and high-energy presentation chock full of questions, tips, formulas, and tricks.
Vedantu Olympiad School is here for you with online classes | Online Tutorial | Online Math Olympiad ✔📚 to cover the entire syllabus of the Math Olympiad Exam. Let’s watch, how this Fermat’s Theorem | Number Theory | Beyond Textbooks | Fermat’s Theorem in number theory | number theory olympiad sessions will give you concept transparency.
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@sunchess5950
4 жыл бұрын
Sir I have given a different solution of last question please read it and like if like
@sunchess5950
4 жыл бұрын
It is given in COMMENT section
@trickymath9597
3 жыл бұрын
First time esa math channel dekha... ..very gud sir...
@rogeliovalentino3826
3 жыл бұрын
i guess it is kinda off topic but does anybody know of a good website to stream newly released movies online?
@jamesonmatthew2654
3 жыл бұрын
@Rogelio Valentino i use FlixZone. Just google for it :)
Sir you are the GOAT of KZread Olympiad mentorship
Answer of the HW Question is 1... If 7¹²⁰-1 is divisible by 11 and 13... then it will be divisible by 11*13 which is 143 and if 7¹²⁰-1 ≡ 0 (mod 143), then 7¹²⁰ ≡ 1 (mod 143) ... (adding 1 on both the sides)... Thanks a lot for this class sir🙏🙏
Super initiative Amazing video
Thank you so much sir💖💖
thankyou so much sir , it is not only helpful for prmo but also kvpy , very helpful
Thanks Sir for giving such great lectures !
Sir answer to last question is 1. You made it too easy sir :P
1 is the remainder for last question
Sir thank you for your valuable effort 😊
Awesome 👍👍👍👍😊😊😊 lecture
I think ABHAY SIR IS BEST OLYMPIAD MENTOR
@dadanyadav4681
2 жыл бұрын
He is best ever
The answer to last question is 1 *Sol*. *I used the Euler's toteint theorem to find the Euler number of ∅(143)→120 then according to Euler theorem 7¹²° will give remainder 1* Thank you
@anubhavroy_anr
4 жыл бұрын
Hey man what's that
@chhabisarkar9057
4 жыл бұрын
@@anubhavroy_anr it's a function
@anubhavroy_anr
4 жыл бұрын
@@chhabisarkar9057 I actually don't know what it is Let's ask sir to teach this topic also in quite detail.....
@asishbauri7433
3 жыл бұрын
@@anubhavroy_anr it's a function for coprimes given by euler
Sir the answer for the question is B . 1
Oh man that prove by i don't have paper theorem
Ans to the last question is 1.
@shafitanvir1840
3 жыл бұрын
i also answar it
Answer is 1
Sir please recommend us a book from where we can learn these theorems thoroughly ..
@vishweshajitkumar101
4 жыл бұрын
Pathfinder for Olympiad mathematics
@SuryabhBhattacharya
4 жыл бұрын
Challenge and thrill of pre college level mathematics.
@ramanujancollegeofmathemat6087
3 жыл бұрын
USE NUBER THEORY BY DAVID M BURTON BOOK
@arpit9134
3 жыл бұрын
👍
Ans find to be 1 sir
1
B) 1
sir which book shall we follow from where we can learn these miscellaneous theorems and concepts
@asishbauri7433
3 жыл бұрын
From any olympiad book
Which book should Class 8 students for Olympiad 😶
@sakshi1080
3 жыл бұрын
Pathfinder by pj sir
B hoga aapne to kar hi diya lol
Option a 0
b
18
sir but 7 =_2(Mod 5.isn't it so 7 ^n=_2^n(mod 5) so how it can be 7^n=_1(mod 5)
.
@SoumyadityaDas-xz3op
4 жыл бұрын
Balcher
1