Solving an Amazing System of Equations | Math Olympiad Prep!
Vložit
- čas přidán 28. 06. 2024
- Solving an Amazing System of Equations | Math Olympiad Prep!
Welcome to our Math Olympiad Prep series! In this video, we'll tackle an amazing system of equations that's sure to challenge and sharpen your problem-solving skills. Perfect for those preparing for the Math Olympiad or anyone looking to enhance their math prowess, this tutorial will guide you step-by-step through the solution process. Don't miss out on this exciting opportunity to master a complex system of equations and boost your confidence for the competition!
Stay tuned, and let’s solve this together! If you enjoy the video, please like, subscribe, and hit the bell icon for more Math Olympiad tips and tricks.
Topics covered:
System of equations
Algebra
Problem solving
Algebraic identities
Algebraic manipulations
Solving systems of equations
Factorization
Cubic equations
Synthetic division
Rational root theorem
Math enthusiast
Math tutorial
Math Olympiad
Math Olympiad Preparation
#mathtutorial #systemofequations #problemsolving #mathhelp #algebra #learnmath #mathtricks #studytips #education #solvingequations #mathskills #mathenthusiast #stem #math
Additional Resources:
• Easier Than You Think ...
• Two Victorious Ways to...
• Israeli Math Olympiad ...
👉 Don't forget to like, subscribe, and hit the notification bell to stay updated on more advanced math tutorials!
Thanks for watching!
@infyGyan
A wonderful introduction thanks for sharing (x,y)= (8,-1)(-1,8)
The given can be
a +b = 1 ...(eq1)
a^6 + b^6 = 65 ...(eq2)
with 3rd-root(x, y) = a, b.
Then, squaring (eq1)
a^2 +b^2 = 1 -2ab ...(eq3)
and cubing (eq3)
(a^2 +b^2)^3 = (1 -2ab)^3;
a^6 +b^6 +3(a^2+b^2)(ab)^2
= 1 - 6ab +12(ab)^2 -8(ab)^3
and with (eq2)
65 +3(a^2+b^2)(ab)^2
= 1 - 6ab +12(ab)^2 -8(ab)^3.
Rearranging with t = ab
2t^3 -9t^2 +6t +64 =0,
which can be by SDM,
(t +2)(2t^2 -13t +32) = 0
and thus
t +2 = 0; t = ab = -2;
while
2t^2 -13t +32 = 0
yields t = ab = cmplx.
Therefore,
a +b = 1; ab = -2
that is
a^2 -a -2 = 0;
a^2 -2a +a -2 = 0;
a(a -2) +(a -2) = 0;
(a+1)(a -2) = 0
a = -1, 2
and thus by (eq1)
b = 2, -1
That is,
(a,b) = (-1, 2), (2, -1)
since 3rd-root(x, y) = a, b
(x, y) = (-1, 8), (8, -1)
Shorts...
Let x= a^3; y=b^3 then eqn turns to
a^6+b^6=65= 2^6+ (-1)^6
And; a+b= 1
Hence ,(a;b)= (2; -1); (-1; 2 )
X; y=(8; -1);( -1; 8)
Another questions can be made by Putting a+b= -1 or -3
Возведем в куб первое уравнение
х+у+3(ху)^(1/3)=1
Второе уравнение
(х+у)^2=65+2ху
А дальше ху=k^3
И далее как на видео
Только на видео к этому моменту пришли на 6 минуте, вместо того чтобы потратить 2 минуты
(X, Y)=( 8; -1); (-1; 8)
❌ = 8 , -1. 🌱 = -1 , 8
(x,y)=(-1,8); (8,-1)
(χ,y) =(8,-1) , (-1,8)
Math Olympiad Prep: ³√x + ³√y = 1, x² + y² = 65, x, y ϵR; x, y = ?
(³√x + ³√y)³ = (³√x)³ + (³√y)³ + 3(³√xy)(³√x + ³√y) = x + y + 3(³√xy) = 1
(x + y)² = [1 - 3(³√xy)]², x² + y² + 2xy = 65 + 2xy = 1 + 9(³√x²y²) - 6(³√xy)
2xy - 9(³√x²y²) + 6(³√xy) + 64 = 0, Let: u = ³√xy, xy = u³, ³√x²y² = u²; u ϵR
2u³ - 9u² + 6u + 64 = 0, (2u³ + 4u²) - (13u² - 6u - 64) = 0
2u²(u + 2) - (13u - 32)(u + 2) = (u + 2)(2u² - 13u + 32) = 0
2u² - 13u + 32 = 0, Δ = 13² - 8(32) = - 87 < 0, u ϵR; Rejected
u + 2 = 0, u = - 2 = ³√xy; xy = (- 2)³ = - 8, x + y = 1 - 3(³√xy) = 1 + 6 = 7
y = 7 - x, xy = x(7 - x) = 7x - x² = - 8, x² - 7x - 8 = 0, (x + 1)(x - 8) = 0
x + 1 = 0, x = - 1, y = 7 - x = 8 or x - 8 = 0, x = 8, y = 7 - x = - 1
Answer check:
x = - 1, y = 8 or x = 8, y = - 1
³√x + ³√y = - 1 + 2 = 2 - 1 = 1, x² + y² = 1 + 8² = 8² + 1 = 65; Confirmed
Final answer:
x = - 1, y = 8 or x = 8, y = - 1
x⅓ + y⅓ = 1
x² + y² = 65
(x⅓ + y⅓)³ = 1
x + y + 3(xy)⅓(x⅓ + y⅓) = 1
x + y + 3(xy)⅓ = 1
x + y = a
3(xy)⅓ = 1 - a => xy = (1 - a)³/27
x² + y² + 2xy = a²
xy = (a² - 65)/2
(1 - a)³/27 = (a² - 65)/2
2(a - 1)³ + 27(a² - 65) = 0
a = 7 (by inspection)
x + y = 7
xy = (7² - 65)/2 => xy = -8
t² - 7t - 8 = 0
(t + 1)(t - 8) = 0
*(x,y) = { (-1, 8); (8, -1) }*
By observation. x,y = (8,-1), (-1,8)
1/5 marks for correct answer
@@ramunasstulga8264 Just look at the problem. Sum of squares = 65. Sum of cube roots =1. Smooth curves, so clearly there are at most two roots (one positive, one negative). Sum of perfect squares -> text 8 and 1 = 65. Try cube roots -> 2 and 1. Sum must be 1 so +8, and -1. Fits. X and Y are interchangeable. So two solutions. It takes longer to write this than to see the answer.
@@tunneloflight yes, but I mean you would only get one mark for this
@@ramunasstulga8264 Why would I care about marks? Marks are meaningless twaddle.
(x,y)=(-1,8),(1,-8),(-8,1),(8,-1)
(x^2+(y^2)) (1)*(1) =1 (y ➖1x+1) (x)+(y) (33)+(32)=65 (11^11^11) +(11^1110) (11^1^111^1^11^1) (11^1^11^12^5) (1^11^11^1)+(1^11^12^1) = 2^1 (y ➖ 2x+1)