Answer:
[tex]XY=36\ units[/tex]
Step-by-step explanation:
The correct question is
A, B, and C are midpoints of ∆XYZ. What is the length of XY
we know that
The Midpoint Theorem states that the segment joining two sides of a triangle at the midpoints of those sides is parallel to the third side and is half the length of the third side
step 1
Find the length of YZ
[tex]AB=\frac{1}{2}YZ[/tex]
we have
[tex]AB=24\ units[/tex]
substitute
[tex]24=\frac{1}{2}YZ[/tex]
solve for YZ
[tex]YZ=48\ units[/tex]
step 2
Find the length of XY
Applying Pythagoras Theorem in the right triangle XYZ
[tex]XZ^2=XY^2+YZ^2[/tex]
substitute the given values
[tex]60^2=XY^2+48^2[/tex]
solve for XY
[tex]3,600=XY^2+2,304[/tex]
[tex]XY^2=3,600-2,304[/tex]
[tex]XY^2=1,296[/tex]
[tex]XY=36\ units[/tex]
Applying the Midpoint Theorem
[tex]BC=\frac{1}{2}XY[/tex] -----> [tex]BC=\frac{1}{2}(36)=18\ units[/tex]
[tex]AC=\frac{1}{2}XZ[/tex] -----> [tex]AC=\frac{1}{2}(60)=30\ units[/tex]
