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problem 24: given: $overline{cd}perpoverline{ad}$; $overline{bc}perpoverline{ab}$; $overline{ac}$ bisects $angle dcb$; $angle1congangle3$; $angle2congangle4$. prove: $angle5congangle6$
Step1: Use angle - bisector property
Since $\overline{AC}$ bisects $\angle DCB$, we have $\angle 1=\angle 2$.
Step2: Consider right - angled triangles
In right - triangle $ADC$, $\angle 1+\angle 5 = 90^{\circ}$ (because $\overline{CD}\perp\overline{AD}$). In right - triangle $ABC$, $\angle 2+\angle 6=90^{\circ}$ (because $\overline{BC}\perp\overline{AB}$).
Step3: Substitute equal angles
Since $\angle 1 = \angle 2$, we can substitute $\angle 1$ for $\angle 2$ in the equations. So, $\angle 1+\angle 5=\angle 2+\angle 6$. Subtracting $\angle 1$ (which is equal to $\angle 2$) from both sides of the equation, we get $\angle 5=\angle 6$, or $\angle 5\cong\angle 6$.
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$\angle5\cong\angle6$ is proved.