Convex Polygon in a sentence
Synonym: regular polygon. Antonym: concave polygon
Meaning: A polygon with all interior angles less than 180 degrees; no indentations.
(1) A hendecagon is a convex polygon.
(2) A convex polygon can have parallel sides.
(3) A convex polygon can have congruent sides.
(4) A convex polygon is always a closed figure.
(5) A convex polygon cannot have any concave angles.
(6) A convex polygon can have equal interior angles.
(7) A convex polygon can have equal exterior angles.
(8) A regular hexagon is an example of a convex polygon.
(9) A convex polygon can be either regular or irregular.
(10) A convex polygon can have both acute and obtuse angles.
Convex Polygon sentence
(11) The convex polygon is a fundamental concept in geometry.
(12) A convex polygon has all its vertices pointing outwards.
(13) The convex hull of a concave polygon is a convex polygon.
(14) The convex polygon has all of its vertices pointing outward.
(15) The convex hull of a non-convex polygon is a convex polygon.
(16) A convex polygon has all its interior angles pointing outward.
(17) A convex polygon has all its diagonals lying inside the shape.
(18) A convex polygon has all of its interior angles pointing inward.
(19) The convex polygon is a simple shape with no self-intersections.
(20) The convex hull of a concave polygon is always a convex polygon.
Convex Polygon make sentence
(21) A convex polygon can have any number of sides greater than three.
(22) The convex polygon has no interior angles greater than 180 degrees.
(23) A convex polygon has all its interior angles less than 180 degrees.
(24) A convex polygon has all its interior angles less than 360 degrees.
(25) A convex polygon has all its interior angles greater than 0 degrees.
(26) The brachydiagonals of a convex polygon do not necessarily intersect.
(27) The bisectrices of a convex polygon divide the angles into equal parts.
(28) The interior angle of a convex polygon is always less than 180 degrees.
(29) A convex polygon can have a combination of regular and irregular sides.
(30) A convex polygon can have a combination of regular and irregular areas.
Sentence of convex polygon
(31) A convex polygon can have a combination of regular and irregular angles.
(32) The convex polygon is often used in mathematical proofs and calculations.
(33) A convex polygon can have a combination of regular and irregular centers.
(34) A convex polygon can have a combination of regular and irregular vertices.
(35) A convex polygon can have a combination of regular and irregular apothems.
(36) The bisectrices of a non-convex polygon may not intersect inside the shape.
(37) The bisectors of the angles in a convex polygon intersect inside the shape.
(38) A convex polygon can have a combination of acute, right, and obtuse angles.
(39) A convex polygon can have a combination of parallel and non-parallel sides.
(40) A convex polygon can have a combination of regular and irregular diagonals.
Convex Polygon meaningful sentence
(41) The bisectors of the angles in a convex polygon intersect outside the shape.
(42) A convex polygon can have a combination of regular and irregular perimeters.
(43) A convex polygon can have a combination of regular and irregular symmetries.
(44) The perimeter of a convex polygon is the sum of the lengths of all its sides.
(45) A convex polygon can have a combination of congruent and non-congruent sides.
(46) A convex polygon can have a combination of equal and non-equal interior angles.
(47) A convex polygon can have a combination of equal and non-equal exterior angles.
(48) The concave polygon's interior angles are larger than those of a convex polygon.
(49) A convex polygon can have a combination of regular and irregular circumferences.
(50) The convex polygon is often used in computer graphics to represent simple shapes.
Convex Polygon sentence examples
(51) The convex polygon is a fundamental concept in computational geometry algorithms.
(52) A convex polygon is a closed shape with all interior angles less than 180 degrees.
(53) The convex hull of a set of coplanar points is a convex polygon in the same plane.
(54) The convex polygon is a fundamental concept in the field of computational geometry.
(55) The convex polygon is a fundamental building block in the construction of polyhedra.
(56) The convex polygon is a popular shape for architectural designs and building structures.
(57) The cosines of the angles in a convex polygon can be used to determine if it is regular.
(58) The convex hull of a non-convex polygon may have more vertices than the original polygon.
(59) A convex polygon can be decomposed into triangles by drawing diagonals between its vertices.
(60) The convex polygon is often used as a building block for more complex shapes and structures.
Sentence with convex polygon
(61) A convex polygon can have an infinite number of possible orientations and positions in space.
(62) The convex polygon is a visually pleasing shape that is often used in graphic design and art.
(63) The convex hull of a set of points is the smallest convex polygon that contains all the points.
(64) The convex hull of a set of points is the smallest convex polygon that encloses all the points.
(65) The convex polygon is a versatile shape that can be found in various natural and man-made objects.
(66) The convex polygon is a key component in the study of convex hulls and convex optimization problems.
Convex Polygon meaning
Convex polygon is a term used in geometry to describe a polygon where all its interior angles are less than 180 degrees, and all its vertices point outwards. It is a fundamental concept in mathematics and has various applications in fields such as computer graphics, architecture, and physics. To effectively use the term "convex polygon" in a sentence, consider the following tips:
1. Define the term: When introducing the term "convex polygon" in a sentence, it is essential to provide a clear definition.
For example, "A convex polygon is a closed figure with straight sides, where all interior angles are less than 180 degrees."
2. Provide examples: To enhance understanding, include examples of convex polygons in your sentence. For instance, "A square, triangle, and pentagon are all examples of convex polygons."
3. Describe properties: Elaborate on the properties of convex polygons to provide a comprehensive understanding. For instance, "Convex polygons have no interior angles greater than 180 degrees, and all their vertices point outwards."
4. Discuss applications: To showcase the relevance of convex polygons, mention their applications in various fields.
For example, "Computer graphics extensively use convex polygons to render three-dimensional objects, creating realistic visuals."
5. Compare with other polygons: Highlight the differences between convex polygons and other types of polygons. For instance, "Unlike concave polygons, convex polygons do not have any interior angles greater than 180 degrees."
6. Use in a mathematical context: Incorporate the term "convex polygon" in a mathematical context to demonstrate its usage.
For example, "To prove that a shape is a convex polygon, one must show that all its interior angles are less than 180 degrees."
7. Relate to real-world scenarios: Connect the concept of convex polygons to real-world scenarios to make it relatable. For instance, "The layout of a football field can be represented by a convex polygon, ensuring fair play and equal distances for all players."
8. Explain the significance: Discuss why understanding convex polygons is important in mathematics or other relevant fields.
For example, "Understanding convex polygons is crucial in architectural design to ensure structural stability and aesthetic appeal."
9. Use in problem-solving: Incorporate the term "convex polygon" in problem-solving scenarios to demonstrate its practical application. For instance, "To calculate the area of a convex polygon, one can divide it into triangles and sum their areas."
10. Emphasize key points: Summarize the main characteristics or properties of convex polygons in your sentence.
For example, "Convex polygons have straight sides, all interior angles less than 180 degrees, and outward-pointing vertices." By following these tips, you can effectively use the term "convex polygon" in a sentence while providing a clear understanding of its meaning and significance in various contexts.
The word usage examples above have been gathered from various sources to reflect current and historical usage of the word Convex Polygon. They do not represent the opinions of TranslateEN.com.