How do you solve x^2 + y^2 = 4 and y^2 = 3x?

2 Answers
Adrian D.
Aug 4, 2015

(x,y)=(1,-sqrt(3)),(1,sqrt(3)),(4,isqrt(12)),(4,-isqrt(12))

Explanation:

Substitute the second equation into the first to obtain a quadratic equation for x:

x^2+y^2=x^2+3x=4 => x^2+3x-4=(x+4)(x-1)=0

This has solutions x=-4,1, substituting this into the second equation we have y=+-sqrt(3),+-isqrt(12).

Therefore we have:

(x,y)=(1,-sqrt(3)),(1,sqrt(3)),(4,isqrt(12)),(4,-isqrt(12))

George C.
Aug 4, 2015

Substitute the second equation into the first to get a quadratic in x, the positive root of which gives two possible Real values for y in the second equation.

(x, y) = (1, +-sqrt(3))

Explanation:

Substitute y^2=3x into the first equation to get:

x^2+3x = 4

Subtract 4 from both sides to get:

0 = x^2+3x-4 = (x+4)(x-1)

So x = 1 or x = -4.

If x = -4 then the second equation becomes y^2 = -12, which has no Real valued solutions.

If x = 1 then the second equation becomes y^2 = 3, so y = +-sqrt(3)

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