Answer:
The graph of the function is shown below.
Step-by-step explanation:
The given function is
[tex]f(x)=x^2+2x-6[/tex]
[tex]f(x)=(x^2+2x)-6[/tex]
If an expression is defined as [tex]x^2+bx[/tex], then we need to add [tex](\frac{b}{2})^2[/tex] to make it perfect square.
Here, b=2 so add and subtract 1 in the above parenthesis.
[tex]f(x)=(x^2+2x+1-1)-6[/tex]
[tex]f(x)=(x^2+2x+1)-1-6[/tex]
[tex]f(x)=(x+1)^2-7[/tex] .... (1)
The vertex form of a parabola is
[tex]f(x)=(x-h)^2+k[/tex] .... (2)
where, (h,k) is vertex.
On comparing (1) and (2) we get
[tex]h=-1,k=-7[/tex]
So, the vertex of the parabola is (-1,-7) and axis of symmetry is x=-1.
The x-intercepts of the equation is
[tex]0=(x+1)^2-7[/tex]
[tex]7=(x+1)^2[/tex]
[tex]\pm \sqrt{7}=x+1[/tex]
[tex]-1\pm \sqrt{7}=x[/tex]
[tex]x=-3.646,1.646[/tex]
Therefore, the x-intercepts are -3.646 and 1.646. The graph is shown below.
