If angle A is congruent to itself by the Reflexive Property, which transformation could be used to prove ΔABC ~ ΔADE by AA simil
arity postulate? triangles ABC and ADE, in which point B is between points A and D and point C is between points A and E Translate triangle ABC so that point C lies on point D to confirm ∠C ≅ ∠D. Dilate ΔABC from point A by the ratio segment AD over segment AB to confirm segment AD ~ segment AB. Translate triangle ABC so that point B lies on point D to confirm ∠B ≅ ∠D. Dilate ΔABC from point A by the ratio segment AE over segment AC to confirm segment AE ~ segment AC.
hello your question poorly written attached below is the complete question
answer : Translate triangle ADE so that point D lies on point B to confirm < D ≅ ∠B ( option 1 )
Step-by-step explanation:
An angle ( A ) been congruent to itself by its reflexive property the transformation that could be used to prove ΔABC ~ ΔADE by AA similarity postulate is :
Translate triangle ADE so that point D lies on point B to confirm < D ≅ ∠B
The sum of two adjacent side lengths is half the perimeter, so is 14 meters. Two numbers differing by 2 that have a sum of 14 are half that total plus or minus have the difference: 7 ±1 = 6 and 8.
