analyzing the symmetry of trapezoids\nwhich statements are true regarding the symmetry of the isosceles…

analyzing the symmetry of trapezoids\nwhich statements are true regarding the symmetry of the isosceles trapezoid? check all that apply.\nthe trapezoid has 1 line of reflectional symmetry.\nthe trapezoid has 2 lines of reflectional symmetry.\nthe trapezoid has rotational symmetry of order 1.\nthe trapezoid has rotational symmetry of order 2.\nthe line of symmetry is a vertical line.
Answer
Explanation:
Step1: Recall isosceles trapezoid symmetry
An isosceles trapezoid has 1 line of reflectional symmetry.
Step2: Analyze rotational symmetry
Any non - circular shape has rotational symmetry of order 1 (rotation by 360°). An isosceles trapezoid does not have rotational symmetry of order 2.
Step3: Determine line of symmetry
The line of symmetry of an isosceles trapezoid is a vertical line that passes through the mid - points of the bases.
Answer:
The trapezoid has 1 line of reflectional symmetry. The trapezoid has rotational symmetry of order 1. The line of symmetry is a vertical line.