1. Similar polygons have the same sides. Just like in the figure, triangle ABR is congruent to triangle CDR.
2. All squares are similar. All the square theory, square property, and formulas can be applied in any size of square.
3. Yes, triangle ABR is congruent to triangle CDR for following reasons: They have the same sides, same type of triangle ( right), and same formulas can be applied to the two
4. Question has a mistake.
5. Using 30 60 90 theory
First, divide the hypotenuse by 2 to find the smallest side
then multiply the smallest side by square root of 3
Answers & Comments
Answer:
Step-by-step explanation:
1. Similar polygons have the same sides. Just like in the figure, triangle ABR is congruent to triangle CDR.
2. All squares are similar. All the square theory, square property, and formulas can be applied in any size of square.
3. Yes, triangle ABR is congruent to triangle CDR for following reasons: They have the same sides, same type of triangle ( right), and same formulas can be applied to the two
4. Question has a mistake.
5. Using 30 60 90 theory
First, divide the hypotenuse by 2 to find the smallest side
then multiply the smallest side by square root of 3
tada and u r good to go