triangles ABC, ACD and BCD are right triangles, E is the midpoint of segment AB.
If AB = 20cm, find CE.
I'm having a hard time understanding these relationships between the sides of right triangles. Help again
triangles ABC, ACD and BCD are right triangles, E is the midpoint of segment AB.
If AB = 20cm, find CE.
I'm having a hard time understanding these relationships between the sides of right triangles. Help again
As a partial answer (since the situation is almost certainly underdetermined as written), if $\angle C$ in $\triangle ABC$ is a right angle, then $\overline{AB}$ is a diameter of the circle that circumscribes $\triangle ABC$, so $E$ is the center of the circle and $CE=\frac{1}{2}AB=\frac{1}{2}\cdot20\text{ cm}=10\text{ cm}$.