Question

the altitude, \\(\overline{bd}\\), of \\(\triangle abc\\) is shown in the diagram.
move angles and reasons to the table to complete the proof showing that the altitude of a right triangle creates two smaller triangles that are similar to the original triangle.
\\(\

$$\begin{array}{|c|c|}\\hline\\text{statement}&\\text{reason}\\\\\\hline\\angle c \\cong \\underline{\\quad\\quad}&\\text{reflexive property}\\\\\\hline m\\angle abc = m\\underline{\\quad\\quad} = 90^\\circ&\\text{definition of right angles}\\\\\\hline \\triangle abc \\sim \\triangle bdc&\\underline{\\quad\\quad}\\\\\\hline \\angle a \\cong \\underline{\\quad\\quad}&\\text{reflexive property}\\\\\\hline m\\angle abc = m\\underline{\\quad\\quad} = 90^\\circ&\\text{definition of right angles}\\\\\\hline \\triangle abc \\sim \\triangle adb&\\underline{\\quad\\quad}\\\\\\hline\\end{array}$$

\\)
\\(\angle adb\\) \\(\angle bac\\) \\(\angle bcd\\) \\(\angle bdc\\) \\(\angle dba\\) \\(\angle dbc\\)
aa similarity
sas similarity
sss similarity
question # 40

Explanation:

Step1: Fill reflexive angle for ∠C

$\angle C \cong \angle BCD$

Step2: Fill right angle for ∠ABC

$m\angle ABC = m\angle BDC = 90^\circ$

Step3: Choose similarity rule for △ABC~△BDC

AA Similarity

Step4: Fill reflexive angle for ∠A

$\angle A \cong \angle BAC$

Step5: Fill right angle for ∠ABC

$m\angle ABC = m\angle ADB = 90^\circ$

Step6: Choose similarity rule for △ABC~△ADB

AA Similarity

Answer:

Statement	Reason
$m\angle ABC = m\boldsymbol{\angle BDC} = 90^\circ$	Definition of right angles
$\triangle ABC \sim \triangle BDC$	$\boldsymbol{AA\ Similarity}$
$\angle A \cong \boldsymbol{\angle BAC}$	Reflexive property
$m\angle ABC = m\boldsymbol{\angle ADB} = 90^\circ$	Definition of right angles
$\triangle ABC \sim \triangle ADB$	$\boldsymbol{AA\ Similarity}$