Nice Exponent Math Simplification

(1+sqrt(5))/2 is the golden ratio (phi). It satisfies that x²=x+1, thus x³ = x(x+1) = x² + x = 2x+1.
x⁴ = x(2x+1)
= 2x² + x
= 2(x+1) +x
= 3x +2
x^5 = x(3x+2)
= 3x² +2x
= 3(x+1) +2x
= 5x + 3
It's easy to see the fibonacci series in there. Following the series, we will have that:
x^12 will be 144x + 89.
In fact, if we use this notation (ax+b), the result of phi^n will have a=n and b=(n-1).
Please, note that 89 is the 11th and 144 is the 12th terms in the fibonacci series. Now all you have to do is turn x into phi.
144x + 89 = 144(1+sqrt (5)/2) + 89
= 72 + 72sqrt(5) + 89
= 161 + 72 sqrt (5)
You can also see a pattern here.
In the form (q + z*sqrt(5)), q (the rational part) will be (n/2 + (n-1)) = 3/2*n - 1, and the z (the irrational part) will be n/2.
With this info, and as demonstration, we can easily calculate
Phi^15, knowing that the 15th term of the fibonacci series is 610 and the 14th term is 377.
solution: 682 + 305sqrt(5) ≈ 1364.00

There's quite a simple solution if we note that x = φ, where φ is golden ratio, the fundamental of which is φ²=φ+1
So we may subsequently substitute φ² while calculating φ¹² = (φ²)⁶=(φ+1)⁶=((φ+1)²)³=
= (φ²+2φ+1)³=(3φ+2)³=
(3φ+2)²(3φ+2)=
(9φ²+12φ+4)(3φ+2)=
(21φ+13)(3φ+2)=
63φ²+39φ+42φ+26=
144φ+89
Finally we substitute
φ=(1+√5)/2 and get the answer
161+72√5

Exploit x^2 = x + 1 each time to always keep simplifying the intermediate expressions as the form ax + b.
That keeps the numbers small and simple:
x^3 = x(x^2) = x(x+1) = x^2 + x = (x +1) + x = 2x + 1
x^6 = (x^3)^2 = (2x + 1)^2 = 4x^2 + 4x + 1 = 4(x+1) + 4x + 1 = 8x + 5
x^12 = (X^6)^2 = (8x + 5)^2 = 64 x^2 + 80 x + 25 = 64 (x+1) + 80 x + 25 = 144 x + 89

I think if x is cubed and then squared twice we get to the result faster.

Gostei muito professor! Realmente parece difícil, mas o senhor descomplicou. 👏🏻👏🏻👏🏻👏🏻👏🏻👏🏻

Every solution in the comments is better than the one in the video 😊

Let φ=(1+sqrt(5))/2 which is the golden ratio, n is an integer and F(n) is the n-th term of the Fibonacci series, then
φ^n=F(n-1)+φ*F(n).
For example, φ^(-3)=F(-4)+φ*F(-3)=-3+2φ.

It's a good demo for students to learn solution

Good solution

Por que não usou binômio Newton / triângulo de Pascal ??

Bravo!!! 👏👏👏

Brilliant, the easiest solution.

This is actually not hard if you know the property that powers of phi have a connection to Fibonacci numbers. phi^n = F(n) + F(n-1)*phi. So in this case 144+89phi.

Totally magnificent an optimum at finest😂❤

Even faster. Recognize that the value being raised to the twelfth power is the value of the Golden Ratio, R, that satisfies the equation R^2 = 1+ R. Each successive power, R^n, is equal to (can be reduced) to a +b*R, where a is the (n-1)th integer in the Fibbonacci sequence, and be is the nth one. So for R^2, a = 1, b=1. For R^3, a=1, b=2. For R^4, a = 2, b =3. For R^5, a=3, b=5.......For R^12, a=89, b=144. So the answer is 89 + 144*R. R=(1 +sqrt(5))/2. So 89+144*R = 89 + 72 +72*sqrt(5) = 161 + 72*sqrt(5)/

Hermosa resolución!

first cube it, then take 8 common and cancel it withdenominator . you get (2+sqrt(5))^4
square two times. first time, get 9+4sqrt(5) , squaring this gives 161+72sqrt(5)
simple way. isn't it?

Bravo!!!

X^n represents just one real number, for every power of X. The X variable has been isolated from the number values. We need only complete the simplification of X^12.
I'm assuming that both exact and numerical approximation are requested. Exact include the radical 5, while approximations compute the answer according to your required precision.
Yeah, definitely, *after mastering* these you might want to turn to infinite sequences in whatever books you use. It's basically the way to examine number relationships and turn these into a single algorithm. Figuring them requires understanding the proofs used to construct them.
Infinite and geometric number sequences can be evaluated, if existing, to create a general formula. For example, the equation (N*(N+1))/2 computes the sum of all positive integers, from 1 to N, inclusive.
Ex1: N=4,
(4*(5))/2 = 10 = (1+2+3+4)
This problem is simple enough to walk the power ladder: 2,3,6,12.
Identity: (A+B)^2 = A^2+B^2+2AB
Identity: (A/B)^n = (A^n) / (B^n)
Using the power division rule, and if you've done much base 2 math, especially in computing, you'll almost hear the 2^12 denom scream 4096. That's the size of most computer architecture real and virtual page sizes. Anyway, we could just do the numerators and divide that solution by 4096. But I want you to watch the rolling iterations.
I haven't done all of the math steps but do list the procedures and intermediate and final answers.
Do one or two steps to see if the answers match.
X1= (1+sqrt(5)) / 2
X2= (X1 * X1)= 3+sqrt(5)) / 2
X3= (X1 * X2)= 2+sqrt(5)
X6= (X3 * X3) = 9+4*sqrt(5)
Note that the denominator cancels out nicely at X3, not to return in this set of values.
X12=(X6)^2
=161+72(sqrt(5))

When the expression assumed as x, solutions is there.

I did it in my mind. The trick is to calculate the cube first and the do the 4th power

Muito interessante !!

所以到最后还是硬算出来的，你不如直接拆为2*2*3次方，直接算得了，由于2次的规律一致，还能节约点算法。

Super

😮

No me extraña que las Matemáticas sean unas de las asignaturas más odiadas.

Por qué no usar Binomio de Newton? Saludos.

简单问题复杂化，没完没了兜圈子。印度思维方式。😂

a smart way NOT to use a calculator!

(1+√5):2=1,618 (Fibonacci)

Без замены и используя формулу куба сумы двух чисел решается быстрее.

I use a simple method,guickly get answer.

Great method. Well k own to some of us...but always good to see it on youtube for others.

Que de souvenirs

Nobody in their right mind would simplify that. It's the golden ratio to the 12th power. I'm positive that would result in bad karma.

Gold number ^22...😉

PERO HABLA, EXPLICA , DEDUCE!. RAZONAMIENTO, !!! PARA MUSICA SINTONIZO UNA RADIO FM.

Where is exponent 12 in the end?

Ф := (√5+1)/2
Ф^n = fn * Ф + fn-1, where fn is the n-th Fibonacci number.
Hence Ф^12 = 144Ф + 89, now you only need to expand it, 72√5 + 161

U make it longer

Without binomial theorem! nice

1.618 в 12 степени. 322 будет. Неужели сложно калькулятором посчитать?

Fibonnacci
Un+2=un+1 + un
Solution = a GN^n + b o(GN)^n
Hence GN^n matches fibonnacci with
u0=1
u1= GN
u2 = 1+ GN
u3 = 1 + 2GN
u4= 2 + 3 GN
…
u12 = 89 + 144 GN

A much simpler solution is to take the inverse proportion of delta 5 to the tertiary coherent function divided by the cotangent of {5 + 63} and predetect the log of the variable operator with a squared coefficient minus infinity. And there you have it.

Conjugate it to get
2 to power 12 as answer
That is 32x32x2=32×64=2048

Me, an intellectual: φ¹²

(72√5 + 161)

too lengthy procedure

323

Impressive, but too long, mathematician enjoy short elegant solutions not tedious ones and striving to find them.

懐かしい

Painful.

I calculated it in my mind faster

φ¹²=89+144φ,
φ¹²=161+72√5.

……OR……plug it into a calculator. 🤔
You’re going to plug the final simplification into a calculator for a concise numerical answer anyway.
Therefore, just plug the initial problem into the calculator. And save a lot of time.
*cough*

Esto es demasiado facil...
Yo recrro a mis derivadas y difirenciales,a mis teoremas de exponentes, a raices explicadas como 1/?según la raiz..
Ponme algo mas diicil.como derivadas infinitas

Nice Exponents Math Simplification: [(1 + √5)/2]¹² = ?
Let: a = (1 + √5)/2; [(1 + √5)/2]¹² = a¹²
a² = [(1 + √5)/2]² = (6 + 2√5)/4 = (3 + √5)/2 = 1 + (1 + √5)/2 = 1 + a
a⁴ = (a²)² = (1 + a)² = 1 + 2a + a² = 1 + 2a + (1 + a) = 2 + 3a
a⁶ = (a²)(a⁴) = (1 + a)(2 + 3a) = 2 + 5a + 3a² = 2 + 5a + 3(1 + a) = 5 + 8a
a¹² = (a⁶)² = (5 + 8a)² = 25 + 80a + 64a²) = 25 + 80a + 64(1 + a) = 89 + 144a
= 89 + 144[(1 + √5)/2] = 89 + 72(1 + √5) = 161 + 72√5
Answer check:
[(1 + √5)/2]¹² = 322, 161 + 72√5 = 322; Confirmed
Math calculation was achieved on a smartphone with a standard calculator app
Final answer:
[(1 + √5)/2]¹² = 322 = 161 + 72√5

Uyku getirdiniz
Yorumlarda herkes çözdü size yetmez diye kağıt gönderiyorum

It's not Simplify coz you're using more time algebra formula. This is complex for beginners

Put it in a calculator

Ну и чо? Как было так и осталось, с небольшими изменениями...

Is it BECAUSE of the Golden Ratio that the surd part of the solution (=160.99689438) which is almost equal to the rational part of the solution (161).
Do I need to go back to studying the Golden Ratio?

On my watch you use a calculator. It’s 321.9969.

SPEAK LOUD, EXPLAIN, DEDUCE, REASONS, !!! DON'T NEED MUSICAL INSTRUMENTAL, I'D BRTTER SINTONIZE AN FM RADIO!.

вот извращение на потерю времени,

황금비율인걸 알아도 좋고
그냥 차수줄이기로 풀어도 되는
고1수학 중상난이도 문제로도 있는
평범한 문제

1. You're making it too complicated. x^2 ok, x^4 ok, x^8 ok, x^12=x^4*x^8.
2.The final equal sign (=) should not be written as =>, please!

Shake Mohamed bin thogaluk Mathematics burude mela, mamde mela, tharadu mela, thale mela, =

لماذا كل هذا التعب من البداية نعمل على التمرين بدون فرض x

321.99?

Faire une division euclidienne ou un Hörner aurait.ete plus simple

knp gk x^2^2^2. x^2^2

At 3:50, instead of setting x^12 = (x^2)^6, we could rather consider ((x^3)^2)^2. We therefore find x^3 and then we square two times.
It is very easy to find x^3:
x^3 = x^2.x = (x+1)x = x^2 + x = (x +1) + x = 2x + 1.
So we now square this two times. The first square: (2x + 1)^2 = 4x^2 + 4x +1 = 4(x+1) + 4x + 1 = 8x + 5 .
We square again: (8x + 5)^2 = 64x^2 + 80x + 25 = 64(x+1) + 80x + 25 = 144x + 89.

= ϕ¹²

First of all you need to learn not to complicate things...
Instead of uploading video on RUclips asking to simplify it!!!😅😆🤣😁😂

Music is not golden to any degree

Dhur chata ki6ui Boja jaini

Bro I got it in 20 seconds 😂

Дурачится. Сразу видно. что не советское образование получил

Too long and innecesary solution.

Que perdida de tiempo.
Mejor tomo mi calculadora y lo resuelvo en 1 minuto

Is this a simplification? Now count how many operations you performed to simplify? 🤣🤣🤣

Devide and conquer... ()^12=((()^2)^2))^3 is really easy to get the final answer.

~322

Y el triangulo de pascal????

😮