Answer:
Explanation:
Let's call the lengths of DW and EY as x and y, respectively.
Since W is the circumcenter of ADEF, we know that WY is the perpendicular bisector of DE, so WY = x/2.
Similarly, WZ is the perpendicular bisector of DF, so WZ = (104 - x) / 2.
Using the Pythagorean theorem, we can find the length of YE:
YE^2 = YW^2 + WZ^2
YE^2 = 32^2 + (104 - x)^2 / 4
YE^2 = 1024 + (104 - x)^2 / 4
Also, using the Pythagorean theorem, we can find the length of ZE:
ZE^2 = ZW^2 + WY^2
ZE^2 = 68^2 + x^2 / 4
ZE^2 = 4624 + x^2 / 4
Now, we have two equations with two unknowns, x and y.
Solving for y, we get:
y^2 = 1024 + (104 - x)^2 / 4
y^2 = 1024 + (104^2 - 208x + x^2) / 4
y^2 = 1024 + (104^2 - 208x + x^2) / 4
y^2 = 1024 + 26112 - 5216x + x^2 / 4
4y^2 = 26112 + x^2 - 208x + 4096
4y^2 = 26112 + x^2 - 208x + 4096
and
ZE^2 = 4624 + x^2 / 4
4ZE^2 = 18496 + x^2
Equating the two equations, we get:
4y^2 = 26112 + x^2 - 208x + 4096
= 18496 + x^2
7456 = 7616 - 208x
x = 104.
Finally,
DW = x = 104
EY = y = sqrt(1024 + (104^2 - 208x + x^2) / 4) = sqrt(1024 + (104^2 - 208 * 104 + 104^2) / 4) = sqrt(26112) = 162
ZE = ZW = 68.