Answer:
Part 1) [tex]E(-2,-1)[/tex], [tex]G(1,0)[/tex]
Part 2) slope EG is equal to slope BC (EG is parallel to BC)
Part 3) [tex]EG=(1/2)BC[/tex]
Step-by-step explanation:
we have
[tex]B(-3,1), C(3,3),D(-1,-3)[/tex]
Step 1
Find the midsegment (EG) ̅ that is parallel to side (BC)
Find the x-coordinate of point E
[tex]Ex=\frac{Bx+Dx}{2}[/tex]
substitute
[tex]Ex=\frac{-3-1}{2}=-2[/tex]
Find the y-coordinate of point E
[tex]Ey=\frac{By+Dy}{2}[/tex]
substitute
[tex]Ey=\frac{1-3}{2}=-1[/tex]
the coordinates of point E are [tex]E(-2,-1)[/tex]
Find the x-coordinate of point G
[tex]Gx=\frac{Cx+Dx}{2}[/tex]
substitute
[tex]Gx=\frac{3-1}{2}=1[/tex]
Find the y-coordinate of point G
[tex]Gy=\frac{Cy+Dy}{2}[/tex]
substitute
[tex]Gy=\frac{3-3}{2}=0[/tex]
the coordinates of point G are [tex]G(1,0)[/tex]
Step 2
Verifying EG is parallel to BC
we know that
If two lines are parallel, then their slopes are the same
The formula to calculate the slope between two points is equal to
[tex]m=\frac{y2-y1}{x2-x1}[/tex]
Find the slope EG
we have
[tex]E(-2,-1),G(1,0)[/tex]
Substitute the values
[tex]mEG=\frac{0+1}{1+2}[/tex]
[tex]mEG=\frac{1}{3}[/tex]
Find the slope BC
we have
[tex]B(-3,1), C(3,3)[/tex]
Substitute the values
[tex]mBC=\frac{3-1}{3+3}[/tex]
[tex]mBC=\frac{2}{6}=\frac{1}{3}[/tex]
therefore
[tex]mEG=mBC[/tex] -------> EG is parallel to BC
Step 3
Verifying [tex]EG=(1/2)BC[/tex]
we know that
the formula to calculate the distance between two points is equal to
[tex]d=\sqrt{(y2-y1)^{2}+(x2-x1)^{2}}[/tex]
Find the distance EG
[tex]E(-2,-1),G(1,0)[/tex]
Substitute the values
[tex]dEG=\sqrt{(0+1)^{2}+(1+2)^{2}}[/tex]
[tex]dEG=\sqrt{(1)^{2}+(3)^{2}}[/tex]
[tex]dEG=\sqrt{10}\ units[/tex]
Find the distance BC
[tex]B(-3,1), C(3,3)[/tex]
Substitute the values
[tex]dBC=\sqrt{(3-1)^{2}+(3+3)^{2}}[/tex]
[tex]dBC=\sqrt{(2)^{2}+(6)^{2}}[/tex]
[tex]dBC=\sqrt{40}=2\sqrt{10}\ units[/tex]
Verifying
[tex]EG=(1/2)BC[/tex]
substitute the values
[tex]\sqrt{10}=(1/2)2\sqrt{10}[/tex]
[tex]\sqrt{10}=\sqrt{10}[/tex] -------> is true
therefore
[tex]EG=(1/2)BC[/tex]
