# In the following figure, by applying ASA congruence rule, state is these 2 triangles are congruent. PLS ANS FAST...

Dear Lekisha,
Sorry, there was a little error in the first answer, here is the correct ones,

Here is the solution, In the triangle BAC, ​∠A = 180° - (30 + 30)° = 180° - 60° = 120
In the triangle QPR, ∠P = 180° - (30° + 30°) = 180° - 60° = 120.

So, now in triangle BAC and QPR,
∠A = ∠P  ( 120°​) --(Proved above)
AC = PR  (=4cm)--  (Included side)
∠C = ∠R (=30°) ---(Given)

According to all the aspects given above, both the triangle BAC and QPR are congruent under A.S.A Congruency Criterion.
Remember to maintain the order of the correspondence.
Hope this helps!
Thumbs up if it is very fine.

Regards!

• 3
as we can see in this figure angle A = 180 - 60
= 120
also    Angle P = 120

so <A = <P  PR=AC  <C=<R

ay SAS this triangle is congruent

• 1
Dear Lekisha,
Here is the solution, In the triangle BAC, ​∠A = 180° - (30 + 30)° = 180° - 60° = 120
In the triangle QPR, ∠P = 180° - (30° + 30°) = 180° - 60° = 120.

So, now in triangle BAC and QPR,
∠A = ∠P  ( = 60°) (Proved above)
AC = PR  (=4cm)  (Included side)
∠C = ∠R (=30°).

According to all the aspects given above, both the triangle BAC and QPR are congruent under A.S.A Congruency Criterion.
Remember to mantain the order of the correspondence.
Hope this helps!
Thums up if it is very fine.

• 0
Yes these triangles are congruent
• -2
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