Respuesta :
Answer:
[tex] g(x) = (x-2)^2 -2[/tex]
If we compare this function with the vertex form we see that:
[tex] a = 1, h =2, k =-2[/tex]
So then the vertex would be [tex](h,k)=(2,-2)[/tex]
And since the value for a is positive we know that the parabola open upward. We don't have a maximum defined since open upwards and the minimum point correspond to the vertex on this case (2,-2).
[tex]f(x)= -(x+4)^2 +2[/tex]
If we compare this function with the vertex form we see that:
[tex]a=-1, h =-4, k = 2[/tex]
And since the value for a is negative we know that the parabola open downward. We don't have a minimum defined since open downwards and the maximum point correspond to the vertex on this case (-4,2).
Step-by-step explanation:
We need to remember that the standard form for a parabola is given by the following equation:
[tex] y = ax^2 + bx +c[/tex]
And the vertex form is given by this formula:
[tex] y = a(x-h)^2 +k[/tex]
And we want to find the vertex and if we have a maximum or minimum for each function. Let's begin with g(x)
[tex] g(x) = (x-2)^2 -2[/tex]
If we compare this function with the vertex form we see that:
[tex] a = 1, h =2, k =-2[/tex]
So then the vertex would be [tex](h,k)=(2,-2)[/tex]
And since the value for a is positive we know that the parabola open upward. We don't have a maximum defined since open upwards and the minimum point correspond to the vertex on this case (2,-2).
For the function f(x) we assume that we have the following equation:
[tex]f(x)= -(x+4)^2 +2[/tex]
If we compare this function with the vertex form we see that:
[tex]a=-1, h =-4, k = 2[/tex]
And since the value for a is negative we know that the parabola open downward. We don't have a minimum defined since open downwards and the maximum point correspond to the vertex on this case (-4,2).
