when the solutions to each of the two equations below are graphed in the xy-coordinate plane, the graphs intersect at two places. Write the y-coordinates of the points of intersection in the boxes below in order from smallest to largest
y=2x
y+x^2 - 3
Answer:
Intersection points (1,2) and (-3,-6)
The y-coordinates of the points of intersection from smallest to largest is -6 to 2.
Step-by-step explanation:
Given : A system of equations [tex]y=2x[/tex] and [tex]y+x^2 - 3=0[/tex]
To find : Write the y-coordinates of the points of intersection?
Solution :
Let, [tex]y_1=2x[/tex]
and [tex]y_2=3-x^2[/tex]
Now, we plot these two equations.
The graph of [tex]y_1=2x[/tex] is shown with red line.
The graph of [tex]y_2=3-x^2[/tex] is shown with blue line.
The solution to this system will be their intersection point.
The intersection points of these graph are (1,2) and (-3,-6).
Refer the attached graph below.
Therefore, The y-coordinates of the points of intersection from smallest to largest is -6 to 2.
