This system has one solution. What is the y-coordinate of the solution?

y = –2x + 4
y = x2 + 4x + 13

[tex]\left \{ {{y=-2x+4} \atop {y= x^{2} +4x+13}} \right. \\ x^{2} +4x+13=-2x+4 \\ x^{2} +6x+9=0 \\ з=6^2-4(9)=36-36=0 \\ x= \frac{-6}{2} =-3 \\ y=-2x+4 \\ y=-2(-3)+4=6+4=10[/tex]

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Panoyin Panoyin · Answer 2 · 2015-07-04T19:25:21+02:00

y = -2x + 4
y = x² + 4x + 13

-2x + 4 = x² + 4x + 13
+ 2x    + 2x
   4 = x² + 6x + 13
       - 4    - 4
   0 = x² + 6x + 9
   x = -(6) ± √((6)² - 4(1)(9))
   2(1)
   x = -6 ± √(36 - 36)
2
   x = -6 ± √(0)
   2
   x = -6 ± 0
   2
   x = -6
2
   x = -3
   y = -2x + 4
   y = -2(-3) + 4
   y = 6 + 4
   y = 10
   (x, y) = (-3, 10)

The y - coordinate of the solution is 10.

This system has one solution. What is the y-coordinate of the solution? y = –2x + 4 y = x2 + 4x + 13

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This system has one solution. What is the y-coordinate of the solution?

y = –2x + 4
y = x2 + 4x + 13