Answer:
Step-by-step explanation:
Given are triangles WSX and TRS
The two lines namely RW and TX intersect at point S thus making two triangles
From the given information we find that
angle TSR = angleWSX(vertically opposite angles)
But this is not sufficient to prove that two triangles are similarl. Atleast two angles must be congruent
Hence we must have information as angle RST = angle SWX or angle TRS=angleWXS to prove these are similar
Or angle RST =angle SXW or two lines TR||WX to complete the proof
Answer:
By 'AAA Similarity Postulate', ΔSTR ≅ ΔSWX.
Step-by-step explanation:
We are given isosceles triangles ΔSTR and ΔSWX with ∠TSR=∠WSX.
Since, sides ST=SR and SW=SX, then their opposite angles will be equal.
So, we get,
∠STR=∠SRT and ∠SWX=∠SXW.
Now, as 'the sum of angles in a triangle is 180°'.
So, we get,
∠TSR + 2∠STR = 180°
2∠SWX + ∠WSX = 180°
As, ∠TSR=∠WSX, this gives, ∠STR = ∠SRT = ∠SWX = ∠SXW.
So, using 'AAA Similarity Postulate', we get that, ΔSTR ≅ ΔSWX.
