Assuming you meant 'internal' angles - a hexagon.
Alternate interior angles are equal on a transversal that passes through parallel lines.
If you meant decagon, A polygon with ten angles and ten sides.
Assuming that a traingle is meant to be a triangle, then the answer is none.
The common leg of two angles.
soliloquy
Assuming you meant 'internal' angles - a hexagon.
You meant to say "no right angles".That's a rhombus.
Alternate interior angles are equal on a transversal that passes through parallel lines.
If you meant decagon, A polygon with ten angles and ten sides.
whenever you have a supplementary angle, you know that both of the angles in the supplementary angles will add up to 180 degrees. if that's what you meant
Adjective angles? Maybe you meant adjacent angles. Adjacent angles are angles that share a side and a vortex (corner point).| /| /|/____________Pretty bad text drawin up there, but you see 2 angles sharing one side, and they also share a vortex.
One key difference is that dramatic literature is meant to be performed on stage with actors, while fiction is meant to be read. Dramatic literature often relies on dialogue and stage directions to convey the story, whereas fiction can use narrative prose to develop plot and character. Additionally, dramatic literature typically focuses on conflict and tension between characters, while fiction can explore a wider range of storytelling techniques and structures.
in geometry...it means that the measure of the angles adds up to 90 degrees
Assuming that a traingle is meant to be a triangle, then the answer is none.
The common leg of two angles.
The question, as it stands makes no sense at all. Perhaps it is meant to be what has one or more right angles. But even that makes little practical sense. Any polygon can have one or more right angles, so how does the answer help?The question, as it stands makes no sense at all. Perhaps it is meant to be what has one or more right angles. But even that makes little practical sense. Any polygon can have one or more right angles, so how does the answer help?The question, as it stands makes no sense at all. Perhaps it is meant to be what has one or more right angles. But even that makes little practical sense. Any polygon can have one or more right angles, so how does the answer help?The question, as it stands makes no sense at all. Perhaps it is meant to be what has one or more right angles. But even that makes little practical sense. Any polygon can have one or more right angles, so how does the answer help?