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Al P
Lv 7
Al P asked in Science & MathematicsPhysics · 8 years ago

REPOST: There are two isolated points?

There are two isolated points where

f(x,y)=5y^2 + 15x^2 - 60x^3y + 15xy - 30xy^3 - 30x^4 - 60x^2y^2 - 6y^4=k

where k=25/24 indeed. What are the coordinates of these two points.

Happy Halloween weekend.

Update 2:

Hi Fred,

Actually, what you have was my second attempt at Rita's

question. This was my second attempt:

Ok, maybe we're thinking to deep. How about this: let x=0

f(x,y)=5y^2 + 15x^2 - 60x^3y + 15xy - 30xy^3 - 30x^4 - 60x^2y^2 - 6y^4=25/24

= 5y^2-6y^4 = 25/24

f(y) = 120y^2-144y^4-25=0

f(y)' = 240 y-576 y^3 = 0

y^2 = 240/576

y = +/- sqrt(240/576)

My first attempt may have been closer to what Rita

had in mind although I've had no communication

with Rita.

By the way, my modus operandi is usually visualize,

write some math, and write the code if necessary.

Yes, I do my share of plotting!

Update 3:

You're on the right track Fred.

Update 4:

Sorry, guys. I really took a hike yesterday.

During which, this whole thing brought to vision the

unsuccessful attempt of even a 3D nano-ant navigating

this place; maybe not so for the Drat. This question is

in Physics for good reason. I'm still busy, but I'll be

back ASAP.

Feynman: Mathematicians versus Physicists

Meanwhile, words from a great man.

http://www.youtube.com/watch?v=obCjODeoLVw

Update 5:

The Drat is constrained to xy space by a scalar constant

k=25/24. He can exist only on the green curves or one of

the two red dots. Feynman is correct, I'm interested only in

the special case, or better yet: a collection of physical-

special cases that yield a verifiable empirical model.

My refined original plot:

f(x,y)=w=25/24 in the xy plane. I ended up with more exact

curves as I reduced my delta factor. Finally the artifacts

became "points": (x1,y1)≈-0.646,+1.292 (x2,y2)≈+0.646,-1.292.

note |y|/|x|≈2. I used code I wrote. No cheating here and

none for you Fred in any event :)

I like getting into the nuts and bolts of things even to the

point of using assembly language for real time applications.

So like you, I guessed part of the way. Thanks to Scythian for

throwing all of us a softball I believe=>without Prejudice.

The two red dots:

f(x,y)=25/24

f(x,0) = 15 x^2-30 x^4 = 25/24

x = +/-sqrt(5/3)/2

|x|=|y|*2

y = +/-sqrt(5/3)

(x1,y1) = -sqrt(5/3)/2 , +sqrt(5/3

Update 6:

YA! messed up:

(x1,y1) = -sqrt(5/3)/2 , +sqrt(5/3)

(x2,y2) = sqrt(5/3)/2 , -sqrt(5/3)

I agree with Scythian. Fred there is no way in "bleep" you're

not getting BA. Like Scythian, you're always out there

helping others. These are solutions that satisfy:

f(x,y)=25/24, Logical AND fx = -60x^3-120x^2y-90xy^2+15x-24y^3+10y = 0

Logical AND fy = -120x^3-180x^2y-120xy^2+30x-30y^3+15y = 0

http://i985.photobucket.com/albums/ae336/sdopqwe82...

2 Answers

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  • ?
    Lv 7
    8 years ago
    Favorite Answer

    Is this some kind of mathematical riddle?

    If you organize the terms a bit, you see:

    f(x,y) = 5(3x² + 3xy + y²) - 6(5x⁴ + 10x³y + 10x²y² + 5xy³ + y⁴)

    and those coefficients are pretty familiar:

    = ( 5[(x + y)³ - x³] - 6[(x + y)⁵ - x⁵] )/y

    **cheating**

    I plotted:

    z = g(x,y) = f(x,y) - 25/24

    in 3D on Grapher (MacOS X), and it looks like the zeros occur along the y-axis, so setting x=0:

    f(0,y) = 25/24

    144y⁴ - 120y² + 25 = 0

    (12y² - 5)² = 0

    y = ±√[5/12] = ±½√[5/3] = ±0.64549722436790...

    (x,y) = (0, ±√[5/12])

    EDIT:

    @ Scythian: You're right; they're not isolated.

    On the 3D plot, the y-axis is tangent to the surface at those two points, but they are not isolated when you slice the surface with the xy-plane.

    A wider look at that plot shows a pair of points (symmetrically-placed, because the whole thing is symmetric under (x,y)↔(-x,-y)) somewhere around

    ±(0.6, -1.3)

    which appear to be local maxima with z=0, which will make them isolated as points in the xy-plane.

    OK, set these to 0 (to find where ∇g = ∇f = 0) and solve:

    ∂f/∂x = 15(2x + y) - 30(4x³ + 6x²y + 4xy² + y³) = (15/y)((x + y)² - x² - 2(x + y)⁴ + 2x⁴) = 0

    ∂f/∂y = 5(3x + 2y) - 6(10x³ + 20x²y + 15xy² + 4y³) = 0

    Among local maxima, besides the target pair of points, there is another pair of symmetrically-placed points

    (±½,0,⅚)

    and the single point (0,0,-25/24) . . [ these are for z = g = f - 25/24, not f ]

    But of course, we're looking for (x,y,g(x,y)) = (a,b,0) at which ∇g = ∇f = 0

    Yeah, I'm on the right track, but there's this huge boulder on it, bigger than my whole locomotive...

    More later . . .

    EDIT2:

    @ Al: Not so fast. I didn't say what Scythian says I said. But I think he's right, so I need some time to check it.

    @ Scythian: I hadn't arrived at that, but it looks like you're right:

    Define α = √[5/12]; so that α² = 5/12

    Then you're saying that the isolated points are

    (x, y, g(x,y)) = ±(-α, 2α, 0) . . [these aren't among the points I had yet identified!]

    Check:

    x+y = α, so if n=2m+1 is odd, [(x+y)^n - x^n]/y = 2α^n / 2α = α^(n-1) = ([5/12]^m)

    And if n=2m is even, [(x+y)^n - x^n]/y = [(α²)^m - (α²)^m]/2α = 0

    f(-α,2α) = ( 5[(x + y)³ - x³] - 6[(x + y)⁵ - x⁵] )/y = 5(5/12) - 6(5/12)² = (5/12)(5 - 5/2) = 25/24

    g(-α,2α) = f(-α,2α) - 25/24 = 0

    ∂f/∂x = 15[(x + y)² - x² - 2(x + y)⁴ + 2x⁴]/y = 0

    ∂f/∂y = 5(3x + 2y) - 6(10x³ + 20x²y + 15xy² + 4y³)

    = 5α - 6α³(-10 + 20•2 - 15•4 + 4•8)

    = 5α - 12α³ = α(5 - 12(5/12)) = 0

    EDIT3:

    @ Al: Scythian's answer is right; all I did was check it. It would have taken me forever to derive that solution on my own.

    Give him the BA!

  • 8 years ago

    Fred, I don't think those points are isolated.

    Edit: Fred, those were the isolated points after all. My bad! AI P, better give the man the BA.

    { (1/2)√(5/3), -√(5/3) }

    { -(1/2)√(5/3), √(5/3) }

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