Answer:
The graph in the attached figure
Step-by-step explanation:
we have
[tex]x^{2} -7x+12=0[/tex]
This is a vertical parabola open upward (because the leading coefficient is positive)
The vertex is a minimum
step 1
Find the vertex of the quadratic equation
Convert the equation in vertex form
Complete the squares
[tex](x^{2} -7x+3.5^2)+12-3.5^2=0[/tex]
[tex](x^{2} -7x+12.25)+12-12.25=0[/tex]
[tex](x^{2} -7x+12.25)-0.25=0[/tex]
Rewrite as perfect squares
[tex](x-3.5)^{2}-0.25=0[/tex]
The vertex is the point (3.5,0.25)
step 2
Find the x-intercepts
The x-intercepts are the values of x when the value of the function is equal to zero
we have
[tex](x-3.5)^{2}-0.25=0[/tex]
solve for x
[tex](x-3.5)^{2}=0.25[/tex]
square root both sides
[tex](x-3.5)=\pm0.50[/tex]
[tex]x=3.5\pm0.50[/tex]
[tex]x=3.5+0.50=4[/tex]
[tex]x=3.5-0.50=3[/tex]
therefore
The x-intercepts are the points (3,0) and (4,0)
step 3
Find the y-intercept
The y-intercept is the value of y when the value of x is equal to zero
we have
[tex]y=x^{2} -7x+12[/tex]
For x=0
[tex]y=(0)^{2} -7(0)+12[/tex]
[tex]y=12[/tex]
The y-intercept is the point (0,12)
step 4
Graph the quadratic equation
we have
The vertex (3.5,0.25)
The x-intercepts (3,0) and (4,0)
The y-intercept (0,12)
using a graphing tool
Plot the points and draw the figure
The graph in the attached figure
