I wish to memorize the cubic formula one day. That will be the day I reign supreme over the world

Third method: divide through by a and then write the polynomial as (x-b)^2(x-c)=0 Expand this polynomial and compare coefficients, you get some very interesting results.

My favourite part - Discriminant of a cubic polynomial (7:25).

@2:15 without calculus we could obtain both the Eqns as follows: as r is a double root; then (x-r)^2 = 0 from which we get x^2 = 2rx - r^2 Plug in this result in f(x) wherever x^2 appears; as f(x) is zero we obtain (3ar^2 - 2r - 1)x - (2ar^3 - r^2 - 2) = 0 from which we get 3ar^2 - 2r-1 = 0 and 2ar^3 - r^2 - 2 = 0

great job bro, thanks for sharing this solution

I used vieta's formulas. If ax^3-x^2-x+2=(ax-u)(x-r)(x-r)=ax^3-(u+2ar)x^2+(2ur+ar^2)x-ur^2=0 Then you can eliminate u and get the same equations as with using the derivative. I was actually worried because with how problems are made, I was expecting a to have integer values so I thought I might've made a mistake, but no.

The cubic formula isnt hard at all! U Just have to memorize it and use it using p and q: When u subsitute (x+b/3a) you eliminate the x^2 coefficient and the equation becomes f(x)=x^3 +px+q. The discriminant at this point it's just (q/2)^2 + (p/3)^3 wich is kinda nice

Nice my answer matched with yours

Thanks! I did it in a long way and it worked this time but I'm not sure it would always work out... I assumed (ax+b)(x+c)^2=0

Nice!

Cool problem and your methods are even cooler! Using derivative nice,i did not think of that

We can let x=1/y and get a new cubic equation 2y^3-y^2-y+a=0. Then solve with vieta.

Thanks for the video , but i didn t understand why the derivative of r is 0

Can you provide the proof for the Discriminant of Cubic equation?

2.denklemi r ile çarpmak bir şeyi değiştirmiyor mu? Bazen fazladan kök geliyor da.

U did not prove that if r is a double root as u call it, than f'(r)=O. Where do you get this from? It's not apparent.

Cool 😎

Why you can do tht system

Another great explanation, SyberMath!

👍👍👍

I didn't know about the discriminant for the cubic equation, this will be helpful for me, thank you ❤❤❤❤

Couldn't we use de vetta's formulas? We would end up with a system of 3 equations with 3 unknowns: a, x1, x2. What do you think?

What about using a third method, using Vieta's formulas. (Which I learned from watching this channel).

a = 0 ;)

1st

a=-.1578 and a=.53