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Find all pairs of real numbers $(x,y)$ such that $x + y = 6$ and $x^2 + y^2 = 28$. if you find more than one pair, then list your pairs in order by increasing $x$ value, separated by commas. for example, to enter the solutions $(2,4)$ and $(-3,9)$, you would enter "(-3,9),(2,4)" (without the quotation marks).

Respuesta :

1. [tex]x^2+y^2=28[/tex] and x+y=6

2.  x^2+y^2 and x+y remind us of the formula: [tex](x+y)^{2}= x^2+y^2+2xy[/tex]

substituting we get: 

 [tex]6^{2}= 28+2xy[/tex]

2xy=36-28
xy=8/2=4

3 Let's solve the system of equations i)x+y=6 and ii)xy=4

substitute y=4/x in (i): 

[tex]x+ \frac{4}{x} =6[/tex]

multiply all sides by x:

[tex] x^{2} +4=6x[/tex]

[tex] x^{2} -6x+4=0[/tex]

complete the square:

[tex]x^{2} -6x+4=x^{2} -2*3x+9-9+4= (x-3)^{2}-5=0 [/tex]

[tex] x-3=\sqrt{5} [/tex] or [tex] x-3=-\sqrt{5} [/tex] 

[tex] x=3+\sqrt{5} [/tex] or [tex] x=3-\sqrt{5} [/tex]

so from x+y=6, y=6-x

case 1,  [tex] x=3+\sqrt{5} [/tex] gives [tex] y=3-\sqrt{5} [/tex]

case 2, [tex] x=3-\sqrt{5} [/tex] gives [tex] y=3+\sqrt{5} [/tex] 


Answer: 

[tex](3-\sqrt{5}, 3+\sqrt{5})[/tex], [tex](3+\sqrt{5}, 3-\sqrt{5})[/tex]

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