A beautiful math problem for advanced students | Equation Solving

A trivially simple problem for beginners. a=3 by inspection

Writting 36 as 27+9 presupposes you know the answer.

a³+a² =36
a²(a+1)=36
a²(a+1)=9×4
a²>(a+1)
By way of comparison,
a²=9 and a+1=4
a=√9 and a=4-1
a=3 and a=3
Finally, a=3.
It's just a different perspective.

a=1? No... a=2? No... a=3? Yes!!! Let's divide a³+a²-36 ÷ a-3 = a²+4a+12. So the other two solutions: 2a=-4±√-32, two more complex roots a=-2+i√8 and -2-i√8.

This method of solving the equation begins by guessing the correct answer! Why would anyone even continue once you got 27 & 9? That's your answer right there.

To really solve this just write a^2(a + 1) and notice that if a were to be an integer, it’s square must divide 36, and the only squares that divide 36 are 4, 9, and 36, so a must be 2, 3, or 6, from there, check

Your channel is very helpful

If you are given that the solution is in integers, then a^2(a+1) = 36 means a is in {1,2,3,6} - and process of elimination gives an answer. If you do not know that a is an integer, then you can try to identify where there are roots to a^3 + a^2 - 36 = 0 and you quickly get (a - 3)(a^2 + 4a + 12) = 0, or a = 3, -2 +/- 4✓(-2)

It took me all of 3 seconds to know a = 3.

Re-write the problem as a^3=(6-a)(6+a) right hand side should be factorable by a therefore 6-a = 3 => a = 3.

Just replace 'a' by '1/b' to cast the equation in standard form then use Cardano (Tartaglia) equation to find one root and then divide by (b-root) to find the other two!

Like they said, your solution presupposes to know the answer. Let’s do in another way.
a^3 = 36 -a^2 = (6-a)*(6+a)
Now, a^3 equals to a product of two factors; to get a product of two factors for a^3, you can decompose it this way only: a^2*a. Therefore
a^2= 6+a and a = 6-a.
From the second you get that a=3.

by faktoring , a^3+a^2 |+/-| n*a-36=0 , / 3*12=36 , trial n=3 / , a^3-3a^2+4a^2-12a+12a-36=0 , (a-3)(a^2+4a+12)=0 , a-3=0 , a=3 ,
/// for complex , a^2+4a+12=0 , /// , test , 3^2+3^2=27+9 , 27+9=36 , OK ,
a^2+4a+12=0 , a=(-4 |+/-| sqrt(16--48)/2 , a=(-4 |+/-| sqrt(-32))/2 , a=(-4 |+/-| sqrt(32)i)/2 , a=(-4 |+/-| 2*sqrt(8)i)/2 ,
a= -2+sqrt(8)i , -2-sqrt(8)i , solu. , a= 3 , -2+sqrt(8)i , -2-sqrt(8)i ,

V interesting and knowledgeable

Awesome explanation. If you went with just the obvious answer you wouldn’t have found the imaginary numbers. What I want to know is why hasn’t anyone commented about the most obvious part of the video. Your crazy good hand writing. I’d love to be that legible.

Thanks ❤

a = 3 is one answer . I will use remainder and factor theorem to find the other 2. Your method is also an excellent method. Thanks

a^3--27+a^2--9=0
(a--3)[a^2+3a+9+a+3] =0
a =3//

a^3 + a^2 = (a^2)×(a + 1) = (3^2)×(3 + 1) = 9×4 = 36

Ok. La idea es pensar. Usar los productos notables. Como tarea debe ser direccionada y contestar con explicaciones en cada proceso . Así un estudiante mejora su capacidad cognitiva.

Muy interesante video sobre ecuaciones con exponentes cuadrados y cubos, muchas gracias por compartir.😊❤😊.

This is not a mathematical way. If the answer was 1.23142765, then this method would not help.

I just looked at it, didn't even watch the video, and immediately saw that a = 3. It's so obvious.

You can just look at it, and know that it isnt 2, and isnt 4. So convoluted..

Can you do it again with the rhs =35

a = 3

Why not just that solution?
a³ + a² = 36
a³ + a² = 27 + 9
a³ + a² = 3³ + 3²
a = 3

Answer is a=3

I used substitution and found this answer in seconds

The moment you decide "out of the blue" to split the 36 into 27 and 9... Hmmm why not 3 and 33 ? . Just solve it by trying integer values for a starting at 2 . Job done and going home...

a^3+a^2 =36 ; 3^3+3^2=36 ; a=3

Haec a= 3 est.

Value of of 'a' will be :- 3

3

a equalitu 3

3, as a real root.

answer is a=3

Всё было ясно со второй строчки, но мы не ищем лёгких путей 🤣

a³+a²=36
(x-3) (x²+4x+12)=0
(x-3) =0
x= 3 #
(x²+4x+12)=0
(x+2)²+8=0
(x+2)²=-8
(x+2)=±i√8
x= 2±i2√2 #

I would like to see a rigourous démonstration. This is not the case here

You already solved it at 0:46

27+9=36

The value of a=3

a=3 trivial solution

Can't we say a = 3 , is that wrong?

When using equations over (^2) of itself, we are using (i and even a ^i) somehow ?
No need to laught at me, i am trying to understand how we can handles in 2d maths over ^2 equations without divisions of itself (singularities)

Pô!! Essa eu fiz de cabeça 😂

a=3......I solve these in my brain!

3 cubed plus 3 squared = 36

Bagi yg pegusaha kecil dpt pinjaman tanpa bungga nabatas 10 juta.

Are these "Olympiad" problems intended for 7 year olds?

Для чего дальнейшие рассуждения когда D

Так это будет 3

Please reform your writing method

You have solved this by long way, I could not understand. Bogus, go through simple way.

Sofism

Bla bla bla bla bla. Don’t need nine minutes.

For sure not beautiful and by no means for advanced students…

?

🤢🤮
a³+a²= 36
a²(a+1)= 9•4
a= ±3
a+1= 4 -> a= 3
(a³+a²-36)/a-3= a²+4a+12, a ∉ ℝ, a= 2(-1±𝒊√2)

"3" did it my head in like 10 seconds

a=3

3

a=3

a = 3