Can You Factor This Wonderful Expression? | Factorise x^13+x^11+1 | Aman Malik Sir
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- čas přidán 30. 03. 2023
- In today's video, we are going to factorize a very amazing expression.
We have to factorize the following expression - x^13+x^11+1
If you want to excel in Algebra, you should learn the skill to factorize algebraic expressions.
This expression x^13+x^11+1 is a wonderful expression to make you understand the skill of factorization.
This will help you in your basic mathematics exams, olympiads, and JEE Mains and Advanced examinations.
Let's see how we can factorise this expression and learn a lot of core mathematics skills.
Stay tuned with @BHANNATMATHS
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The only man in CZcams who teaches us to explore maths
Rather than tell us to prepare for JEE
This difference makes me love you sir 💝💝💝
👍👍 Yes
You didn't explore CZcams yet
@@gyaneshpathak6709 You maybe correct and that's ok
😂😂😂
Bhai use yt properly
@@focus_on_what_you_want. He is using it properly itself. I go to coaching and that's enough for me. I explore the things which I'm interested on YT.
Here's the one using the cube roots of unity, for the equation x³=1, we've by the x³-y³=(x-y)(x²+xy+y²), it as (x-1)(x²+x+1)=0. Now, for the polynomial x¹³+x¹¹+1, manipulating can be rewritten as:
→ x¹¹(x²+1)+1
Add and subtract 'x' to produce the factor of the cube root of unity equation as
→ x¹¹{(x²+x+1)-x}+1
Expand:
→ x¹¹(x²+x+1)+(1-x¹²)
Use a²-b²=(a+b)(a-b)
→ x¹¹(x²+x+1)+(1-x⁶)(1+x⁶)
Again expand as:
→ x¹¹(x²+x+1)+(1-x³)(1+x³)(1+x⁶)
Take a minus sign common out of the second term to make one of the factors of the term, x³-1 as;
→ x¹¹(x²+x+1)-(x³-1)(1+x³)(1+x⁶)
Rewrite as:
→ x¹¹(x²+x+1)-(x-1)(x²+x+1)(1+x³)(1+x⁶)
Take (x²+x+1) common;
→ (x²+x+1)[x¹¹-{(x-1)(x³+1)(x⁶+1)}]
Simplifying;
→ (x²+x+1){x¹¹-(x¹⁰-x⁹+x⁷-x⁶+x⁴-x³+x-1)}
Finally we've:
→→→ (x²+x+1)(x¹¹-x¹⁰+x⁹-x⁷+x⁶-x⁴+x³-x+1)
Really great way of thinking, thnx dude ❤
Thank you
Good job brother 👍
Very good process❤
Same bhai
Are sir aap itna padhate ho ki m kuch saal me expert ban jaunga 😅😅😅😅
Edit: i am so famous
😂😂😂😂😂😂😂😂
Galat fehmi ☕☕☕☕☕
Women 😂😂😂
Really 😂😂
I've another elegant solution using COMPLEX NUMBERS..
It can be seen that the function contains the roots only in (-1,0).
So we can consider a root of this equation as z=cosӨ + isinӨ.
By de Moivre's :- cos13Ө+isin13Ө+cos11Ө+isin11Ө+1=0
This yields two equations as cos11Ө+cos13Ө+1=0 & sin11Ө+ sin 13Ө=0
2nd equation gives cos11Ө=cos13Ө
Putting this into (1) we get cosӨ=-1/2 ..thus sinӨ=sqrt(3)/2 or -sqrt(3)/2
Thus the roots are (-1±i√3)/2 which are the roots of x^2+x+1!!!!!!! We've got a factor of this monster equation.
Now long division method proceeds---
Thank u🤘👍
Maine to equation dekhne par notice kiya ki ye cube roots of unity hain , to omega aur omega² factors aa gaye waise.
@@BruhGamer05 yaa
nice brother
बहोत ही बडा solution दे दिया मेरे भाई.
Slick
gajab explanation sir ji❤❤❤
Sir aise question videos kaafi acche lagte hai. Keep making these types of videos. 😊😊😊
Bohut pyara Sawal tha sir. Hats off
Love the question ❤
Bohot mzedaar ques tha sir.....thanks
other method
add and subtract x^12
we get x^11(x^2+x+1)+(1+X^6)(1+x^3)(1-x^3)
now take x^2+x+1 common from 1-X^3 and other term that its one line answer no need complex number and other methods
Jabardast guruvar
Sir ek baar reimman hypothesis ko samjao plz sir
Ye reimer aur teimann ko combine krke bna h kya
@@shiwoshiwoismyactualname 😅🤣
@@shiwoshiwoismyactualname ye Reimann Hypothesis ek elegant problem hai jiska mazak banana matlab isse solve karne ki ability rakhna kya tere paas wo ability hai to bol varna kai mathematicians ne apni life di hai is hypothesis pe to mazak mat uda.
@@quantumphilosopher1729 i didn't demean it by joking on it. I appreciated the hypothesis while making a light joke on it.
Positive attitude is the best part about sirji
অসাধারণ
Sir In this question this same factorization can be take place by only adding X^9 and subtraction x^9 in between of x^11 and 1
Agar aspke jaisa mhan guru mil jaye to Kisi ki bhi Jeet pakka ho sakti 🙏 love you guru ji 😘
Love you sir 🔥
amazing
Sir since w and w² are roots then x²+x+1 must divide the expression so I divided it by x²+x+1 and got the ans
Dear sir, one video on FERMAT'S LAST THEOREM ❤
complex number se hue yeh question
x^13 + x^11 + 1 = 0 ...(1)
as we know from complex numbers
w^2 + w + 1 = 0.... (2)
the second equation can be written as
w^2.(1) + w.(1) + 1 = 0
w^2.((1)^9) + w.((1)^12) + 1 = 0 ( because 1 to the power any number is 1 itself )
w^2.((w^3)^9) + w.((w^3)^12) + 1= 0 ( since w is the cube root of unity )
w^11 + w^13 + 1 = 0 .... (3)
comparing equatins (1) and (3) :-
we get x = w
and similarly we can get x = w^2 too as the answer
Great!
👍👍👍
Sir ji ajj maja agaya
Sir please batado is type ki factorisation problems kaha se karu practice ke liye??
Sir make a video on how to factorise it using cube root of unity.... Please 🙏
How did you cancel out x square against -1
Please explain me
Sir Aap Bsc ki maths prasandhaiye please
Let x^13+x^11+1=0. Then x^13+x^11=-1. If x0 is root of 1, then x^13 and x^11 are equal to -1/2+/-i*sqrt(3). So x^2+x+1 factorizes x^13+x^11+1
Sir samjh nhi aya jab apna x⁹ common liya uska baad aya kaisa baki ka ???
Good .
Sir aap isko complex no ka use krke bhi factor Krna sikha do
1:41 Sir thank you hamare bare me sochne ke liye .
Amazing question sir.❤
Simpler method :- Notice that omega and omega² (complex cube roots of 1) are roots of x¹³+x¹¹+1. Thus x²+x+1 must be a factor, and the other factor can be found by simple polynomial long division.
bhai long division se iske factors nahi aate ...
Try again, I was able to get the second factor when I divided x¹³+x¹¹+1 by x²+x+1.
@@avyakthaachar2.718 I got (x¹¹+x⁹+x⁸-x⁶-x⁴-x²-x+1)
2:36 start
Sir aur agar x⁴+x²+1 expression achha lagta hai to isse given expression se bhag de dete sidha next factors mil jata
Sir please complex number se bhi samjha dijiye.
X and x^2 are not needed. Because we can divide in factor -(x^3-1) and then so on.....
can you please factor 4xto the power 4+8x+15
Sir please request hai aapse jee ki series continue krdo vector3d ka baad
Sir isse aise kar sakta hai
X¹³+x¹¹+1=0 , then multiply both side by x .
Now eq is x¹⁴+x¹²+x =0
Now take x common.
X(x¹³+x¹¹+1) =0
Aise kuch kar ka answer a sakta hai kya
Main abhi 10th paper Diya hai.
Uss hisab se
If you multiply x both side then in this particular question should not be equal to zero
Because jab x ko RHS me transfer kroge then it is 0/x and x means denominator can not be zero, so basically your question again becomes same
Multiply karke common lia 😭
@@ssf4915 😂😂, bro he is in 10th class , don't cry 😂😂
@@ssf4915 acha samjhe gaya question wahi ho gya Jo tha
Sir apki paid class kaise milegi
Sir Riemann hypothesis samjha dan.
Yes, let's factor x^13 + x^11 + 1.
To factor this expression, we can first notice that it does not appear to be easily factorable using traditional methods. However, we can rewrite it using a substitution to make factoring easier.
Let's substitute y = x^11:
x^13 + x^11 + 1 = (x^11)^1 * x^2 + (x^11) + 1
Substituting y into the equation:
y(x^2 + 1) + 1 = y(x^2 + 1) + 1(x^2 + 1)
Now, we can see that it has a common binomial factor of (x^2 + 1), so we can factor it out:
(x^2 + 1)(y + 1) = (x^2 + 1)(x^11 + 1)
Therefore, we have factored x^13 + x^11 + 1 as (x^2 + 1)(x^11 + 1).
Where did you get y(x2+1) + 1 = y(x2+1) + 1(x2+1)
When the answer is expanded, you get x13 + x11 + x2 + 1
integral of f(x) = f(x) then f(x)=? f(x) is not e power x. please tell sir
e^cx is the only solution
Itna add or subtract karne ke bajiye Khali x⁹ add or subtract Karo
X¹³+x¹¹+1+x⁹-x⁹ = x⁹(x⁴+x²+1) -(x⁹-1)
Then factorizing
x⁹(x²+x+1)(x²-x+1)-(x-1)(x²+x+1)(x⁶+x³+1)
I multiples the brackets also = (x²+x+1)[x¹¹-x¹⁰+x⁹-x⁷+x⁶-x⁴+x³-x²+1]
Btw I am in 9th 😊
Awesome! 👏
Your solution is awesome
I am a iit teacher have u heard about formula for a^3+.. j^3 when a+ .. +j=o
@@raghvendrasingh1289 thanks , but no I haven't heard about that formula, i ve even learned a lot of non routine maths for exams like nmtc and ioqm but i haven't heard about that formula. I have seen the formula for a³+b³+c³ when a+b+c is zero but not for more than three terms
I’m also in 9th. Do you mind explaining this sum in just a bit more detail please?
@@rooikriti6466 sure
x¹³ +x¹¹+1 =0
Now you have to add x⁹ both sides as we can see that x⁹ can be taken common from first two terms and with 1 it can be factorized to x³-1 which has the common factor same as the first three terms (x¹³+x¹¹+x⁹)
Regrouping the terms:
(x¹³+x¹¹+x⁹) -(x⁹-1)= x⁹(x⁴+x²+1) -(x³-1)(x⁶+x³+1)
Now you gotta know that x⁴+x²+1 can be factorized to x²+x+1 and x²-x+1
=x⁹(x²+x+1)(x²-x+1) - (x-1)(x²+x+1)(x⁶+x³+1)
Here we see that there is a common factor so we finally factorize it by taking it common
=(x²+x+1)[x⁹(x²-x+1)-(x-1)(x⁶+x³+1)]
Then multiply the brackets
= (x²+x+1)(x¹¹-x¹⁰+x⁹-x⁷+x⁶-x⁴+x³-x²+1)
Sir yar aap mast ho
Can anyone explain how to factorise using Complex numbers??
somehow using polar form, but then there will be 2 variables theta and radius, idk.
Take x=omega
Then equation becomes w2+w+1 which is a hint that x2+x+1 is a factor of the given polynomial
You can find the other factor by dividing the two equations
Factors of
x^11 - x^10 + x^9 - x^7 + x^6 - x^4
+ x^3 - x + 1 ???
Sir one shot lectures lao please jee ke liye
Iske factors (x⁹)(x⁴+x²+1) bhi to ho skte h shyd
1:49 correct sir
Sir please ek video remainder problem pr banaiye please 😢
Can we solve this by using the idea of Geometric Progression
Ya same doubt but i believe it will not help us ti facotorize it rather it would have been helpful to find sol
Dekhkar smjha aa gya tha imaginary cube roots of unity satisfy kr rhi to puri eqn ko x^2+x+1 se divide karke do min me a jayega ans
Sir ek bar comlex number s factroise Karen
Don't know why you missed simple method of factorisation and went for reverse construction
Sir physics ke bhi numerical ko bhi layi pls😅
Sir maine factorise to kar liya lekin roots bhi involve hai
Sb maths padhate h.. Aman sir maths feel krwa dete h 🙌
I don't know what type of questions comes in IIT, but factoring an equation like does not help me in anyway studying this equation, the equation does not have any postive factors and there is only one one negative factors and rest all factors are imaginary. After factoring equation like this what paper setter is trying to achieve. Can you give an example where this octic equation are use and how do you every time come up with random method of solving an equation.
Algebraic manipulation is definitely a tool in the JEE Advanced, and even mains. Will this exact question come, probably not but who knows. That is not to say it is not a good use of getting exposed to algebraic manipulation. Also others in the comments have alluded to an approach with Roots of Unity which is definitely an important topic.
First comment 🙂🙂 love you sir❤
Naman sir
Sir apka math ka tarikha alag hi hai
Root8 ka power root2 devided by root 2 ka power root8 plzz sir solve it
Answer kya h broo
X=omega
Sir aap samjhate ho to aajata h pr khud se nhi ho rha kya kru
w aur w^2 roots dikh rahe the toh polynomial ko x^2+x+1 se divide kar diya
Sir 1 bechare ko itna Durr kyu likh diya
x¹³+x¹¹+1
What is your Qualification sir?
x^3 = 1
Literally isne bande ne rap ga ke maths samjhaye
Bsc padao na app
video 2:30 se start hoti hai..
Sir apne wrong likha hai
Why you make fooooool other
Mai 11-1=10 me ane wala hu
Iske to only two factor bane
Sir isko x ki power 11 ko t mana lenge gaya aur phir 13 ko t2 lekin denge gya aur phir d nikala denga gya aur -b+√d/2a kar ka nikal denge gya
Can we try x^11 = y. Therefore x^13 = y^3. The equation becomes y^3 + y + 1. Perhaps we can proceed from there.
@Target IPhO sorry, my bad. Thanks for correcting.
😂
The factors are
(X^0) (X^13 + X^11 + 1) simple
😂😂😂😂
koi bdi baat nhi RH criterion se aaram se ho jayega kitne bhi degree ka polynomial ho😂
Lambi kahani hai
any polynomial with exponents of the form
3k , 3k-1, 3k+1 in equal qty
is always divisible by
x^2+x+1
example
x^23 +5 x^19 +4 x^11 + 2 x^3 + 3
now 23 and 11 are of the form 3k-1, and are in total 5in number
19 is of the form 3k+1
so we have exponents each of the form
3k-1,3k,3k+1
so need not check, it is divisible by
x^2 + x + 1
E sala ko math k bare mein kuchh nehin pata.....
Go for arvind kalia sir ....
See the difference....
Any 9 students here
Me
Yes
Yes
Yeah
Math is so simple 0 to 9 numbers and other different operations like stories
Math is so simple 0 to 9 numbers and other different operations like stories