Can someone help me with this question? I seem to be getting a negative answer every time :(

[tex] y=4 [/tex]
-[tex]3 x^{2} + y^{2} =52[/tex]

If (x,y) is a solution to the system of equations above and x>0, what is the value of x?

Divide both sides by -3, obtaining x^2 = -12. This last result makes no sense, as no square of a real number could be negative. Probably this is where you're ":getting a negative answer."

If imaginary answers were allowed, then x = i*√12 = i*2√3 or x = -i*2√3.

x =

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sqdancefan sqdancefan · Answer 2 · 2018-08-17T21:38:09+02:00

sqdancefan sqdancefan

17-08-2018

You get a negative value for x² because there are no real-number solutions to the set of equations. (The graphs do not intersect.)

Solve for x^2:

... x^2 = (y^2 -52)/3 = (16-52)/3) = -12

... x = 2√(-3) = ±i·2√3

Complex numbers cannot be compared to zero. (x > 0 has no meaning in this context.) It seems possible you want the complex solution with the positive imaginary part: x = i·2√3

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Can someone help me with this question? I seem to be getting a negative answer every time :( [tex] y=4 [/tex]-[tex]3 x^{2} + y^{2} =52[/tex] If (x,y) is a solution to the system of equations above and x>0, what is the value of x?

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Can someone help me with this question? I seem to be getting a negative answer every time :(

[tex] y=4 [/tex]
-[tex]3 x^{2} + y^{2} =52[/tex]

If (x,y) is a solution to the system of equations above and x>0, what is the value of x?