Nine sided polygon: What is Nonagon? [Definition Facts & Example]
Posted onWhat is Nonagon ⭐ Definition, Facts, Formulas, Examples
- Home
- >
- Knowledge Base
- >
- Nonagon – Definition with Examples
Welcome to Brighterly! Today, we are venturing into the captivating realm of geometry, with a particular emphasis on the intriguing nine-sided polygon known as the Nonagon. At Brighterly, our goal is to ignite your curiosity and inspire a love for learning. Together, let’s explore the remarkable features, angles, and real-world applications of nonagons, and discover how they can spark our creativity and enhance our understanding of the world around us!
What is a Nonagon?
A Nonagon is a captivating polygon that consists of exactly nine sides and nine vertices. These intriguing nine-sided figures can manifest in various forms, such as regular and irregular shapes, as well as both convex and concave configurations. Nonagons are prominent in a wide range of areas, spanning from the realms of art and design to the fields of mathematics and engineering. Their unique structure and fascinating properties make them an essential shape to explore when learning about geometry.
Nonagon Sides
The sides of a nonagon can exhibit different lengths, which is dependent on whether it is a regular or an irregular nonagon. In a regular nonagon, all of the sides maintain equal lengths, creating a harmonious and balanced shape. In contrast, an irregular nonagon displays sides with varying lengths, leading to a more asymmetrical and unique form.
These diverse characteristics allow nonagons to be used in a multitude of ways and applications, from creative designs to problem-solving in mathematics.
Regular Nonagon
A regular nonagon is a distinctive type of nonagon in which all sides are congruent in length, and all angles are equal in measure. This symmetrical shape exhibits an interior angle sum of 1,260°, with each individual interior angle measuring 140°. The regular nonagon’s consistency in both its angles and side lengths results in a visually appealing and mathematically significant polygon that can be applied to various disciplines.
Properties of a Regular Nonagon
A regular nonagon possesses several unique properties that set it apart from other polygons:
- Equilateral and equiangular: All of the sides and angles are equal, making the nonagon both equilateral and equiangular.
- Symmetry: The nonagon has 9 lines of symmetry, which contributes to its balanced and harmonious appearance.
- Interior angle sum: The sum of the interior angles in a regular nonagon is 1,260°, which is a key characteristic that helps distinguish it from other polygons.
Convex Nonagon and Concave Nonagon
When it comes to nonagons, there are two primary classifications based on their shape: convex and concave. Each type exhibits its own unique characteristics and aesthetic appeal.
A convex nonagon is a nine-sided polygon in which all of its interior angles measure less than 180°, and all its vertices point outwards. The result is a shape that appears to “bulge” outwards, providing a sense of fullness and stability.
On the other hand, a concave nonagon has at least one interior angle measuring more than 180°, which creates an indentation in the shape. This “caved-in” appearance gives concave nonagons a more dynamic and complex visual presence, making them an intriguing choice for various artistic and mathematical applications.
Nonagon Angles
Nonagons feature nine angles formed by the intersection of their sides, which contribute to their unique geometric structure.
The sum of these angles relies on whether the nonagon is regular or irregular, as each category exhibits its own specific characteristics and properties.
Nonagon Interior Angles
The interior angles of a nonagon are the angles formed between the sides within the shape itself. In a regular nonagon, all interior angles are equal, measuring a consistent 140°. This uniformity contributes to the regular nonagon’s harmonious and symmetrical appearance, while irregular nonagons display varying interior angle measurements.
Sum of Interior Angles of a Nonagon
To calculate the sum of the interior angles of a nonagon, use the following formula:
Sum of Interior Angles = (n - 2) × 180°
In this equation, n represents the number of sides in the polygon. For a nonagon, n = 9:
Sum of Interior Angles = (9 - 2) × 180° = 7 × 180° = 1,260°
Regardless of whether the nonagon is regular or irregular, the sum of its interior angles always equates to 1,260°.
Nonagon Exterior Angles
The exterior angles of a nonagon are the angles formed outside the shape between a side and an adjacent side extended. In a regular nonagon, all exterior angles are equal, measuring a consistent 40°. These angles play a crucial role in determining the overall appearance and properties of the nonagon.
Properties of Nonagon
Nonagons boast several unique properties that set them apart from other polygons:
- A nonagon has nine sides and nine vertices.
- It can be regular or irregular, convex, or concave.
- The sum of the interior angles of a nonagon always amounts to 1,260°.
Nonagon Diagonals
In geometry, a diagonal is a line segment that connects two non-adjacent vertices within a polygon. In a nonagon, each vertex can connect to six other vertices, resulting in a total of 9 × 6 / 2 = 27 diagonals. These diagonals provide additional structural and visual complexity to the nonagon shape, further enhancing its mathematical and artistic appeal.
Perimeter of Nonagon
Calculating the perimeter of a nonagon involves summing up the lengths of its nine sides. For a regular nonagon, where all side lengths are equal (s), the calculation becomes even simpler by utilizing the following formula:
Perimeter = 9 × s
In this way, you can easily determine the perimeter of any regular nonagon by simply multiplying its side length by 9.
Examples on Nonagon
Let’s explore some examples to better understand the various properties of nonagons:
-
A regular nonagon with a side length of 5 cm:
- Perimeter:
9 × 5 = 45 cm - Sum of interior angles:
1,260° - Each interior angle:
140° - Each exterior angle:
40° - Number of diagonals:
27
- Perimeter:
-
An irregular convex nonagon with varying side lengths:
- The perimeter will vary depending on the side lengths.
- The sum of the interior angles remains constant at
1,260°. - The individual interior angles will vary depending on the shape, leading to a more diverse and visually complex figure.
- The perimeter will vary depending on the side lengths.
Practice Questions on Nonagon
Enhance your understanding of nonagons by answering the following practice questions:
- What is the perimeter of a regular nonagon with a side length of 8 cm?
- How many diagonals does a nonagon have?
- What is the measure of an exterior angle of a regular nonagon?
By engaging with these questions, you’ll gain a deeper appreciation for the unique properties and characteristics of nonagons, solidifying your knowledge of this fascinating polygon.
Conclusion
We hope you enjoyed this enriching journey into the world of nonagons with Brighterly! By grasping the properties, angles, and various applications of nonagons, you will not only deepen your appreciation for the elegance of geometry, but also gain valuable insights into its significance in our daily lives.
At Brighterly, we believe that unlocking the secrets of mathematical shapes like the nonagon can empower you to see the beauty and patterns hidden within the world around you. So, keep exploring, stay curious, and let the wonders of geometry light up your path to knowledge!
Frequently Asked Questions on Nonagon
What is the difference between a regular and an irregular nonagon?
A regular nonagon is a nine-sided polygon with all sides and angles equal. This results in a symmetrical, balanced shape with a harmonious appearance. In contrast, an irregular nonagon has varying side lengths and angle measures, leading to a more diverse and visually complex figure. Irregular nonagons can be either convex or concave, depending on the arrangement of their angles and sides.
How many lines of symmetry does a regular nonagon have?
A regular nonagon has 9 lines of symmetry. These lines of symmetry contribute to the shape’s balanced and harmonious appearance, which is a key characteristic of regular polygons.
In general, a regular polygon with n sides will have n lines of symmetry.
What are some real-life examples of nonagons?
Nonagons can be found in a variety of real-life contexts, showcasing their versatility and unique properties. Some examples include:
- Art and design: Nonagons may appear in tiling patterns, mosaics, and decorative elements. Their unique shape and symmetrical properties make them an attractive choice for artists and designers.
- Architecture: Nonagonal structures or architectural features can be found in some buildings, such as churches or monuments. These elements can add visual interest and structural complexity to the design.
- Mathematics: Nonagons serve as a fundamental shape in the study of geometry and polygonal mathematics. They are used to explore concepts such as perimeter, area, angles, and diagonals.
- Games and puzzles: Nonagons can be found in various puzzles and games, like geometric dissection puzzles or pattern-matching games, where players need to arrange or manipulate shapes to achieve a specific goal.
By understanding the various real-life applications of nonagons, you can better appreciate the importance and versatility of this intriguing nine-sided polygon.
Information Sources
- Wikipedia: Nonagon
- Wolfram MathWorld: Nonagon
- National Council of Teachers of Mathematics (NCTM): Geometry – Polygons
The figure above shows a regular 9-sided polygon. What is the value • PrepScholar GRE
Skip to content
So, you were trying to be a good test taker and practice for the GRE with PowerPrep online. Buuuut then you had some questions about the quant section—specifically question 13 of the second Quantitative section of Practice Test 1. Those questions testing our knowledge of Polygons can be kind of tricky, but never fear, PrepScholar has got your back!
Survey the Question
Let’s search the problem for clues as to what it will be testing, as this will help shift our minds to think about what type of math knowledge we’ll use to solve this question.
Pay attention to any words that sound math-specific and anything special about what the numbers look like, and mark them on our paper.
Let’s keep what we’ve learned about this skill at the tip of our minds as we approach this question.
What Do We Know?
Let’s carefully read through the question and make a list of the things that we know.
- We have a regular $9$-sided polygon
- We want to know the value of an external angle to that polygon shown in the figure
Develop a Plan
We know that the sum of angles on one side of a straight line is $180°$ from the figure, we can see that if we can find the value of the interior angle at one vertex of the polygon, then we can subtract that value from $180°$ to get the value of $x$.
To find the interior angle of any polygon, we can divide it into triangles, knowing that all triangles have internal angles that sum up to $180°$. Then multiply the number of triangles by $180°$ and finally divide by the number of vertices of the polygon to get the value of its interior angle.
This won’t be as difficult as it sounds, particularly once we start drawing the triangles on our figure.
Solve the Question
First, let’s draw triangles starting at one vertex in our figure, like this:
| $\Interior \Angle \of \a \Polygon$ | $=$ | ${180°·\Number \of \Triangles}/{\Number \of \Vertices}$ |
| $ $ | $ $ | |
| $\Interior \Angle \of \a \Polygon$ | $=$ | ${180°·7}/9$ |
| $ $ | $ $ | |
| $\Interior \Angle \of \a \Polygon$ | $=$ | ${9·20°·7}/9$ |
| $ $ | $ $ | |
| $\Interior \Angle \of \a \Polygon$ | $=$ | $20°·7$ |
| $ $ | $ $ | |
| $\Interior \Angle \of \a \Polygon$ | $=$ | $140°$ |
Excellent! So the interior angle of a $9$-sided polygon is $140°$.
We can see that $x$ and one interior angle lie on the same side of a straight line, so their sum must be $180°$. So $x=180°-140°$, or $x=40°$.
The correct answer is $40°$.
What Did We Learn
Now we know exactly how to find the interior angle for any regular polygon. We can just divide it into triangles, get the total sum of the interior angles of the polygon by multiplying the number of triangles by $180°$, then dividing this sum by the number of vertices of the polygon (which is also equal to the number of sides of the polygon).
Want more expert GRE prep? Sign up for the five-day free trial of our PrepScholar GRE Online Prep Program to access your personalized study plan with 90 interactive lessons and over 1600 GRE questions.
Have questions? Leave a comment or send us an email at [email protected].
→ %ce%b5%ce%be%ce%ac%ce%b3%cf%89%ce%bd%ce%bf, Russian translation
Example translated sentence: 89:37) (5) ή; ↔ 89:37).
5) What has Jehovah provided for people to enjoy life?
-
Glosbe Translate
-
Google Translate
+
Add translation
Add
We currently have no translations for %ce%b5%ce%be%ce%ac%ce%b3%cf%89%ce%bd%ce%bf in the dictionary, maybe you can add it? Be sure to check out automatic translations, translation memories, or indirect translations.
Add example
Add
declination
Base
89 :37) (5) υν τη ζωή;
89 :37). 5) What has Jehovah provided for people to enjoy life?
jw2019
Φιλίπ Μετρ, 89 , Γάλλος πολιτικός, βουλευτής (1981–1993), υμάτων Πολέμου (1993–1995).
Mestre, Philippe ( 89 ) — French statesman, Minister for Veterans and Victims of War (1993-1995).
WikiMatrix
Η ίδια η μηχανή έχει 89 διαφορετικούς τρόπους αλληλεπίδρασης.
The machine consists of 89 separate interactions.
Χαρακτηριστικό Ομιλίας: Βελτίωση του Τονισμού Νοημάτων ( be σ. 102 παρ. 4–σ.104 παρ.
Lesson: How to learn how to use logical stress correctly ητές, οι νεραγκούλες τείνουν να έχουν 5 πέταλα, οι σαγκουινάριες 8, τα σενέκια 13; ή 89 .
Many observed that the buttercup, as a rule, has 5 petals, the Canadian wolf foot has 8, the Madagascar ragwort has 13, aster — 21, common field daisy — 34, and wild aster — 55 or 89 .
jw2019
Είναι σε ένα εκδρομικό ια στον 89 .
They are on the nursing bus, moving on 89 th highway .
OpenSubtitles2018.v3 0 .
And only at the end of the Cold War, somewhere in the 88th or in 89 — m , when the Berlin Wall collapsed, collapsed and all the system of communism.
OpenSubtitles2018.v3
Χαρακτηριστικό Ομιλίας: Καθαρή Άρθρωση ( be σ. 86, παρ.
Lesson: Good diction ο Ακροατήριο ( be σ.107 παρ.1–σ.108 παρ.
Lesson: The volume of the voice appropriate for this audience από πότε ακούς AC / DC,
Since when do you listen AC / DC?
OpenSubtitles2018.v3
Ψαλμός 89 :6-18 άτρεις του;
Psalm 88 :7-19. How does Jehovah’s power affect his servants?
jw2019
BE , απλή επίθεση…
break-ins, attacks…
OpenSubtitles2018.v3
Παίξε τ ο «This must be the place», των Arcade Fire.
«This Must Be The Piace» Arcade Fire.
OpenSubtitles2018.v3
ς γνώσεων, αυτούς τους κρυμμένους θησαυρούς» (Δ&Δ 89 :19).
The Lord promises us that we will find “wisdom and great treasures of knowledge, yea, hidden treasures” (D&C 89 :19).
σιών στη χώρα μειώθηκε από 108 σε 89 .
As many Witnesses had to flee for their lives, the number of congregations in the country dropped from 108 to 89 .
jw2019
Μια παλιά ομάδα ορνιθολόγων που λέγεται Flappers, μέση ηλικία 89 .
There is an old birdwatching group called «Ratchet», average age 89 years.
OpenSubtitles2018.v3 ετών πήγε σε μία συγκέντρωση.
The manifestation of such devotion was the case when one day, at the age of 89 years, he went to one of the meetings.
Χαρακτηριστικό Ομιλίας: Επιχειρηματολογία Τεκμηριωμένη από Συμπληρωματικές Αποδείξεις ( be σ. 256, παρ.
Lesson: Support your arguments with additional arguments ( be from . 256, par.
jw2019
Χαρακ τηριστικό Ομιλίας: Πώς να Κάνετε Σαφή Εφαρμογή Εδαφίων ( be σ. 154 παρ. 4–σ. 155 παρ.
Lesson: Show Clearly How a Bible Verse Is Applied ( be from .
154 sec. 4 to p. 155 ref.
jw2019 9000 2 Στο εδάφιο Ψαλμός 89 :11 διαβάζουμε: «Σου είναι οι ουρανοί και σου η γη».
We read in Psalm 88 :12: «Your heaven and your earth.»
jw2019
Ναι, εκτός από το φθινόπωρο του’88 μέχρι την άνοιξη του’ 89 .
Well, except for autumn 88 to spring 89 .
OpenSubtitles2018.v3
Έχεις έξι λεπτά για να φροντίσεις τον ασθενή B3 .
You have 6 minutes to treat a patient B-3 .
OpenSubtitles2018.v3
Ο συνδυασμός πλήκτρων ‘% # ‘ χρησιμοποιείται ήδη για την τυπική ενέργεια «% #» η οπ οία είναι σε χρήση από διάφορες εφαρμογές. Επιθυμείτε πραγματικά τη χρήση της ως καθολική συντόμευση επίσης; What the user inputs now will be taken as the new shortcut
The %# key combination is already associated with the standard «%#» action used in many programs. Do you really want to use this combination as a global one? What the user inputs now will be taken as the new shortcut
KDE40.
1
[Εβδομαδιαία ανάγνωση της Αγίας Γραφής· βλέπε ce σ. 212 pαρ.
(weekly Bible reading; see ce p. 212 par.
jw2019 η ροκ μπάντα.
AC / DC is the best rock band.
OpenSubtitles2018.v3
List of the most popular requests:
1k,
~2K,
~3K,
~4K,
~5K,
~5-10K,
~10-20K,
~20-50K,
~50-100K,
~100k-200K,
~200-500K,
~1M
Thick Dictionary | Czech | polygon
polygon
translation
polygon translation
How to translate from Czech polygon ?
polygon
Czech » Russian
polygonpolygonpolygon
Synonyms
polygon synonyms
What is another way to say polygon in Czech?
polygon
Czech » Czech
mnohoúhelnik
Declension
polygon Declension
How does polygon decline in Czech?
polygon · noun
Singular polygon masculine, inanimate
Nominative kdo? co? polygon masculine, inanimate
Genitive koho? Cheho? bez polygonu
Dative komu? cemu? k polygonu
accusative koho? co? pro polygon
Calling polygone!
Prepositional o kom? o what? o polygonu
Creative kým? Cim? s polygonem
Plural polygony masculine, inanimate
Nominative kdo? co? polygony masculine, inanimate
Genitive koho? Cheho? bez polygonů
Dative komu? cemu? k polygonům
Accusative koho? co? pro polygony
Polygony!
Prepositional o kom? o what? o polygonech
Creative kým? Cim? s polygony
examples
polygon examples
How do you use polygon in Czech?
Movie subtitles
Halo, Polygon?
Polygon? This is a division.
