# Nakafa Framework: LLM URL: https://nakafa.com/en/exercises/high-school/snbt/quantitative-knowledge/try-out/set-6/9 Exercises: Try Out - Set 6: Real exam simulation to sharpen your skills and build confidence. - Question 9 --- ## Exercise 9 ### Question export const metadata = { title: "Question 9", authors: [{ name: "Nabil Akbarazzima Fatih" }], date: "12/23/2025", }; Consider the following plane figures: 1. Isosceles right triangle. 2. Right trapezoid (not a rectangle). 3. Rectangle (not a square). 4. Rhombus (not a square). How many figures have the number of rotational symmetries equal to the number of folding symmetries (lines of symmetry)? ### Choices - [ ] $$0$$ - [ ] $$1$$ - [ ] $$2$$ - [x] $$3$$ - [ ] $$4$$ ### Answer & Explanation export const metadata = { title: "Solution for Question 9", authors: [{ name: "Nabil Akbarazzima Fatih" }], date: "12/23/2025", }; Let's analyze the number of lines of symmetry (folding symmetry) and rotational symmetries for each given plane figure: 1. **Isosceles right triangle** - Lines of symmetry: (altitude from the right angle to the hypotenuse). - Rotational symmetries: (rotation of ). - **Conclusion**: The numbers are equal. 2. **Right trapezoid** - Lines of symmetry: . - Rotational symmetries: (rotation of ). - **Conclusion**: The numbers are not equal. 3. **Rectangle** (not a square) - Lines of symmetry: (vertical and horizontal axes). - Rotational symmetries: (rotation of and ). - **Conclusion**: The numbers are equal. 4. **Rhombus** (not a square) - Lines of symmetry: (both diagonals). - Rotational symmetries: (rotation of and ). - **Conclusion**: The numbers are equal. The figures that have the same number of rotational symmetries and lines of symmetry are: 1. Isosceles right triangle. 2. Rectangle. 3. Rhombus. So, there are figures that satisfy the condition. ---