A rectangle is the only such shape. Not sure about the "little" right angles: all right angles are of the same measure.
Drawing two tiny parallel lines over the segment will indicate that it is a congruent segment. The little arc symbol can also be drawn over the segment or the angles.
Two things that are adjacent to each other are in contact with each other without overlapping. Examples are adjacent apartments, adjacent states, and adjacent sides of a polygon.The word adjacent as used in the definitions of the cosine and tangent trigonometric functions can be a little confusing because, obviously, it takes two sides to make an angle in a polygon, so, technically, you could say that each angle is adjacent to two sides. When trig functions refer to the side adjacent to one of the acute angles in a right triangle, they are referring to the one that's not the hypotenuse, or, in other words, the one that is also adjacent to the right angle.
No, trapezoids do not have right angles. A trapezoid is a quadrilateral with only one pair of parallel sides. The other two non-parallel sides can be of different lengths and angles.
No it does not. Hope this helped. A little :D
An acre is an area, and can be found from the shape and dimensions. If it is rectangular only two are required. Here, 4 are given, so it is probably an irregular quadrilateral. Some angles are needed. Plot these lengths out on graph paper (you will immediately see why angles are needed) and count up the little squares inside the area.
Drawing two tiny parallel lines over the segment will indicate that it is a congruent segment. The little arc symbol can also be drawn over the segment or the angles.
Two things that are adjacent to each other are in contact with each other without overlapping. Examples are adjacent apartments, adjacent states, and adjacent sides of a polygon.The word adjacent as used in the definitions of the cosine and tangent trigonometric functions can be a little confusing because, obviously, it takes two sides to make an angle in a polygon, so, technically, you could say that each angle is adjacent to two sides. When trig functions refer to the side adjacent to one of the acute angles in a right triangle, they are referring to the one that's not the hypotenuse, or, in other words, the one that is also adjacent to the right angle.
I'm a little rhombus, short and stout...
No, trapezoids do not have right angles. A trapezoid is a quadrilateral with only one pair of parallel sides. The other two non-parallel sides can be of different lengths and angles.
Two things that are adjacent to each other are in contact with each other without overlapping. Examples are adjacent apartments, adjacent states, and adjacent sides of a polygon.The word adjacent as used in the definitions of the cosine and tangent trigonometric functions can be a little confusing because, obviously, it takes two sides to make an angle in a polygon, so, technically, you could say that each angle is adjacent to two sides. When trig functions refer to the side adjacent to one of the acute angles in a right triangle, they are referring to the one that's not the hypotenuse, or, in other words, the one that is also adjacent to the right angle.
No it does not. Hope this helped. A little :D
No. There are big ones, medium ones, and little bitty ones.But all circles are similar.
An acre is an area, and can be found from the shape and dimensions. If it is rectangular only two are required. Here, 4 are given, so it is probably an irregular quadrilateral. Some angles are needed. Plot these lengths out on graph paper (you will immediately see why angles are needed) and count up the little squares inside the area.
I think you should be a little more specific on that.
Degres, a little o at the top of the line
Degrees You write it as a little circle like this: 180o
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?