The ratio of the sides is 1:1.
If two triangles share the following characteristics, they are comparable.
The ratio between each pair's equal angles and corresponding sides is the same.
Three methods exist to determine whether two triangles are similar: SAS, SSS, and AA
The letters AA, which stands for "angle, angle," denote that the triangles have two equal angles.
Two triangles are similar if they each have two equal angles.
We have two triangles where: SAS stands for "side, angle, side."
We also know that the included angles are equal and that the ratio of two sides is the same as the ratio of another pair of sides.
Two triangles are comparable if they have two pairs of sides that are in the same ratio and if the included angles are likewise equal.
SSS, which stands for "side, side, side," denotes that we have two triangles with the same number of sides on each pair of corresponding sides.
Two triangles are comparable if they have three pairs of sides that are in the same ratio.
In an isosceles right triangle, the equal sides make the right angle. They have a ratio of equality, 1: 1.
Therefore, The ratio of the sides is 1:1.
To know more about the similarity of triangles refer to :
https://brainly.com/question/8691470
#SPJ2
