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The reflectional symmetry of a regular heptagon is order-7. B: The reflectional symmetry of a regular heptagon is mirror-image symmetry. C: The reflectional symmetry of a regular heptagon is rotational symmetry. D: The reflectional symmetry of a regular heptagon is spatial symmetry. Best Match Video Recommendation:
Solved by verified expert  Get the answer to your homework problem. Try Numerade free for 7 days We don’t have your requested question, but here is a suggested video that might help. Best Match Question:Which statements are true about the reflectional symmetry of a regular heptagon? Select two options. ( )A. It has only 1 line of reflectional symmetry.B. A line of symmetry will connect 2 vertices.C. A line of symmetry will connect a vertex and a midpoint of an opposite side.D. It has 7-fold symmetry.E. A line of symmetry will connect the midpoints of 2 opposite sides.
DiscussionYou must be signed in to discuss. Video TranscriptLet's talk about what is a regular heptagon first. A regular polygon is something with all equal sides and all equal angles, a heptagon as 7 sides, and all the interior angles are the same. Okay, let's get this over with. I don't know what I know about symmetries. I don't know what I could do to create lines of symmetry. It's a heptagona with an odd number of sides, so I can cut it in half. It will travel through the center of the opposite side. There's an odd number of sides in the middle of a line of symmetry, so it won't go through 2 mid points or 2 vertices, and I can do many other lines of symmetry there. What about reflectional symmetry. When do it reflect itself? It will reflect on itself a number of 123. If I have my center in the middle, it will reflect on itself seven times because it's all equal sides and on equal angles. It doesn't have 1 line of reflection. Since it's rotating about 51.43 degrees, every 51.43 degrees of it rotates on to itself, it has a multiple that has seven fold reflectional symmetry. Which statements are true about the reflectional symmetry of a regular heptagon? Select two options. It has only 1 line of reflectional symmetry. A line of symmetry will connect 2 vertices. A line of symmetry will connect a vertex and a midpoint of an opposite side. It has 7-fold symmetry. A line of symmetry will connect the midpoints of 2 opposite sides.Question Gauthmathier3365Grade 8 · 2021-06-11 YES! We solved the question! Check the full answer on App Gauthmath Which statements are true about the reflectional symmetry of a regular heptagon? Select two options. Thanks (196) Feedback from students Does the answer help you? Rate for it! Recommended textbook solutions
College Algebra: Real Mathematics, Real People7th EditionRon Larson 6,419 solutions College Algebra9th EditionMichael Sullivan 7,392 solutions College Algebra9th EditionMichael Sullivan 7,391 solutions College Algebra3rd EditionRobert F. Blitzer 7,674 solutions How many lines of reflectional symmetry does a heptagon have?Since, a heptgon has 7 sides. So, a regular heptagon has 7 lines of symmetry.
Does a regular heptagon have a 7 fold symmetry?Symmetries in regular polygons Look at the regular heptagon below. A heptagon is a shape with seven sides and this one has equal sides and equal angles. You can see that there are seven lines of symmetry, and the regular heptagon also has rotational symmetry order seven.
Does the regular heptagon have the following types of symmetry?Symmetry in a regular heptagon
A regular heptagon has 7 lines of symmetry and a rotational symmetry of order 7, meaning that it can be rotated in such a way that it will look the same as the original shape 7 times in 360°.
How can a regular hexagon be folded to show that it has reflectional symmetry?Answer: If we fold the regular hexagon along the line joining any vertex to the midpoint of the other side or any two midpoints of the adjacent side or a line that bisects two vertex angles, then the regular hexagon has the reflectional symmetry.
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Which statements are true about the reflectional symmetry of a regular heptagon? select two options.
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