What other information must be given in order to be able to prove the two triangles congruent by ASA? i.imgsafe(.)org/c64c59dad9.jpg
1. T=S
2. P=S
3. P=R<<<
4. PQ=QR
1.) B
2.) C
3.) A
4.) C
5.) B
6.) A,C,E
7.) A
8.) B,D
9.) A
10.) A,B,C
anonymous is correct 100%
Nope. SSA does not work.
that's 100% right
Okay, since we already have the side answer 4 should be out right?
To prove that two triangles are congruent using the ASA (Angle-Side-Angle) congruence criterion, you need to have the following information:
1. The measure of angle P in one triangle is equal to the measure of angle R in the other triangle.
2. The measure of angle S in one triangle is equal to the measure of angle S in the other triangle.
3. The length of side P in one triangle is equal to the length of side R in the other triangle.
4. You also need to know that the given figure represents two triangles.
Looking at the image you provided (i.imgsafe(.)org/c64c59dad9.jpg), it seems that the given information is that angles P and R are congruent (P = R). However, to fully prove the two triangles congruent by ASA, you would also need to know that angle S in one triangle is congruent to angle S in the other triangle (S = S). Additionally, you would need to have information about the respective side lengths PQ and QR to complete the congruence.
Therefore, based on the image alone, the only information available is P = R, but the congruence cannot be proven by ASA without more information about angle S and the side lengths PQ and QR.
IDK, IDC, WRC...
GL and GBY!