Question
Identify a pentagon from the following shapes.
Hint:
General synopsis of Polygon.
The correct answer is: ![](data:image/png;base64,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)
*In mathematics, a polygon is a closed two-dimensional figure made up of line segments.
* Poly means many gon means angle. Hence, polygon is a closed figure that is made of many angles.
*In General there are 4 types of polygons. They are:
Regular Polygon
Irregular Polygon
Convex Polygon
Concave polygon
>>>Pentagon is a polygon that consists of five sides and a closed figure.
>>>Since, we were asked to find the the figure that is pentagon. We can check the figure that has five sides and that too closed figure.
>>>Hence, we can say that the required figure is:
![](data:image/png;base64,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)
A polygon that has five sides and five angles is called a pentagon.
>>>Hence, we can say that the required figure is:
Related Questions to study
The maximum number of sides that a polygon can have is ________
The definition of a polygon states that ‘A simple closed curve made up of only line segments is called a polygon.’ Here the basic condition for a polygon is that the figure should be a closed figure and there can be ‘n’ numbers for sides.
>>>Hence, we can say that a polygon can have infinite number of sides.
The maximum number of sides that a polygon can have is ________
The definition of a polygon states that ‘A simple closed curve made up of only line segments is called a polygon.’ Here the basic condition for a polygon is that the figure should be a closed figure and there can be ‘n’ numbers for sides.
>>>Hence, we can say that a polygon can have infinite number of sides.
This polygon is classified as:
![](data:image/png;base64,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)
*A polygon with 8 sides is called an octagon.
>>>Hence, the given figure is an octagon.
This polygon is classified as:
![](data:image/png;base64,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)
*A polygon with 8 sides is called an octagon.
>>>Hence, the given figure is an octagon.
If a polygon is REGULAR, it means?
* If a polygon is REGULAR, it means all of the sides are the same length and all of the measures of the angles are equal.
If a polygon is REGULAR, it means?
* If a polygon is REGULAR, it means all of the sides are the same length and all of the measures of the angles are equal.
Identify the non-polygon from the following.
* It cannot be considered as a polygon as all the sides aren’t connected. Polygons form a closed figure and hence this figure won’t be considered a polygon.
Identify the non-polygon from the following.
* It cannot be considered as a polygon as all the sides aren’t connected. Polygons form a closed figure and hence this figure won’t be considered a polygon.
When a square is pushed from one corner keeping the base as it is, which polygon is formed?
If we select the upper corner of a square and push it, the square will bend in the direction of the force. So, the vertical edges would tilt in the direction of the force, leading to the formation of a new polygon named rhombus.
>>Hence, the Polygon obtained from a square modification is RHOMBUS.
When a square is pushed from one corner keeping the base as it is, which polygon is formed?
If we select the upper corner of a square and push it, the square will bend in the direction of the force. So, the vertical edges would tilt in the direction of the force, leading to the formation of a new polygon named rhombus.
>>Hence, the Polygon obtained from a square modification is RHOMBUS.
Identify the correct statement for the following figure.
![](data:image/png;base64,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)
Concave is when a side can be turned into a line that goes on the inside of a shape.
>>>Hence, the given figure comes under concave polygon.
Identify the correct statement for the following figure.
![](data:image/png;base64,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)
Concave is when a side can be turned into a line that goes on the inside of a shape.
>>>Hence, the given figure comes under concave polygon.
Any triangle is a ______ sided polygon.
>>>Triangle is the polygon that has 3 sides.
>>>It is one of the regular polygon.
Any triangle is a ______ sided polygon.
>>>Triangle is the polygon that has 3 sides.
>>>It is one of the regular polygon.
How many of the following polygons are CONCAVE?
![](data:image/png;base64,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)
>>Concave polygon is the polygon that has one of it's interior angle is greater than 180 degrees.
>>>Hence, from the given figure only one object is concave.
How many of the following polygons are CONCAVE?
![](data:image/png;base64,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)
>>Concave polygon is the polygon that has one of it's interior angle is greater than 180 degrees.
>>>Hence, from the given figure only one object is concave.
A nonagon has ________ sides.
>>>The polygon with nine sides is called as nonagon.
A nonagon has ________ sides.
>>>The polygon with nine sides is called as nonagon.
Is the figure a polygon? Is it convex or concave?
![](data:image/png;base64,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)
>>>The Convex polygon is called as the polygon that has sum of interior angles greater than 180 degrees.
>>>Therefore, the given figure is a convex polygon.
Is the figure a polygon? Is it convex or concave?
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)
>>>The Convex polygon is called as the polygon that has sum of interior angles greater than 180 degrees.
>>>Therefore, the given figure is a convex polygon.
What is the general form of naming a polygon?
One can find this with a small trick. The student should learn to break the word. For example, Hexagon: Hexa+Gon. Now, as we know that hexa is six. Similarly, if a polygon has ‘n’ sides, then the polygon would be named as n-gon.
What is the general form of naming a polygon?
One can find this with a small trick. The student should learn to break the word. For example, Hexagon: Hexa+Gon. Now, as we know that hexa is six. Similarly, if a polygon has ‘n’ sides, then the polygon would be named as n-gon.
Identify whether the angle is acute, obtuse, right or straight
![](data:image/png;base64,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)
Step 1:
Given angle is equal to 90.
Step 2:
So, the given angle is a right angle.
>>Hence, the angle of measurement is right angle.
Identify whether the angle is acute, obtuse, right or straight
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAKsAAABWCAYAAACw5GbeAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AAA5ASURBVHhe7Z15UFVlGMatZtqn+qOabPqjcmzGadKZxpkyE8UFWmy0Mk0t0cgKUsrMlWgjMdPJBRFEQXKhEFBEFFHJBVdEVGRfFERIVtnhsvjE83ovuZBY3Avn3Pv9mDuMnsPAvec53/fupwcUCp2gxKrQDUqsCt2gxKrQDUqsCt2gxKrQDUqsCt2gxKrQDWYV65UrV9Dc3CwvhcLcmFWsdXV1iIuLQ3h4OE6dOgWDwWA8olB0HrOKtby8HEuWLMHo0aPh5uaGjRs3IiEhAefOnUN1dbXxLIXi/2FWsVZUVOCXX37BCy+8gEcffRS9evXCsGHDMGfOHOzcuROFhYXGMxWK/45ZxVpfX4+IiAi88cYb6NGjR9vrmWeewahRozBz5kwsX74cO3bsQG5urti4CsXtYlaxtrS0iAi///57PP7449cJ9s4778Q999yDnj174rXXXsPChQvFvr18+bISreK2MKtYSWNjIwIDA0WU14r12tf999+P5557Dp999hkOHDggIlcoOsLsYiXbtm0TMbYnVL7uvfde9OnTB9988404YEqs3U9JSYlci99//x1//PEHEhMTNecUW0SsBw8elK2eomxPrC+99BJWrFghUYKmpibjT3U/LVda0NDUgGpDNWoMNWhsbjQeuRpDNjQbUNVQhYr6CtQ21qK5RZ/x5IaGBlRWVqK4uBh5eXk4cuQI1q9fLztd7969YWdnJ5EcClhLWESsaWlpmDVrFp599tl2xfr555/LB6UlKMbyunIcv3gcW1K3YHvGdmSXZRuPAoYmAzJLMxGWEoaAkwGIPReL4tp/3oMe7G4ma+hTxMTEiKPL6/Dee+/h9ddfx4ABA/DEE0/I9Xn11Vdx6NAhiZtrCYuItaysTO5MvmmTQPlB8K596KGH4OLigkuXLhnP7jq4MuZV5CEuLw7RWdFIKkpCY8vV1ZOrZE55DlYnrIbbTjd4HfRCfEG8HCN1jXU4ln8Mnvs94bLdBb7xvnK+Ca62FPqG0xuwOXkzUopT5Ge0QG1tLU6ePAkfHx/MnTsX77//Pvr164f77ruv7fqYXtwNp0+fLo6v1rCIWGmDHj9+vC2ExQ/F2dkZnp6eEsJ68803sXLlStmCupIqQxUi0yPhGuWK8aHjEZAYINs5MYnV/6Q/5u6dK9/TS9PlGGlobkBqcSrWn1qPxYcWIzQ5FBcqLhiPAgVVBVgZvxKD1w2Gw3oHrEtch+KaqyvvldYvmhT8XRQwbxD+X1fBXYyfN/2ERx55BA888ADuuuuum4TKiM2LL74If39/MRW0hkXESgoKCiST9fDDD+ODDz4QOzY7O1u2oIkTJ0qyYPXq1SgqKjL+hHmhuMpqy9pWTlLTWIOtaVtl5fSI9cD+8/tltSXcxisaKpBclIyj+UeRXpKOyoZKOUaarzTL6klB85zzl8+LXWuC5x66cAjLji7DorhFiMmOQXl9uRzj35JQmIDAxED4J/jjyIUj1/2spampqUF0dHTb9bhRpKbXY489hmnTpskqrEWn12Ji5dbz888/45NPPsH+/fuve/M0EUaOHCmrbFBQkGS+zEVZXZmI0CfeB5uSNqGw6p+sWVNLkwgtJitGVkk6U2andcGkE0b71+Sg1TfVi+kxb+88TN46Gb4nfJF3OU8cuq6Cnj2vw/jx4/Hggw+2K1b6GOvWrRPnS4tYTKwUJ435zMzMmwx12kMbNmyQ1ZV3OzNaVVVVxqOdI7EwEU5bnfD8qufhEuUi4jTBrZfCobdP4VoS/i7TVk9RcpWPyojCwriFssKmlaShqfnq38DzeI7pfEvBFZYLyNNPP92uWPv37499+/YZz9YeFhNrR9COokdKwY4dO1ZqB8xRWkiPfcnhJZi1exaCzwaLLakVSutKcebSGXHsimqK2kJf+ZX5CE8NF3uaDuC1pos5YW3GjBkzbjIFaKs++eST4lekp/9jp2uNbhMroWCZdn3llVfw8ccfS/qVGbCO4EXmhc8ozcDZorO4WHmxbUvl1sttmKEmvcDVf86eOXDe5iymy6Vq80ZKGMtOSUnBr7/+irfeekuiNA4ODujbty/uuOMOEeygQYMQHBwskRyt0q1iJbyTf/rpJ/kAp06dijNnzhiP/DvcxhkHnbFrBtyi3RCRFiHbu16hXR10KkjE6h7rjpSiFOMR85CUlAR3d3cR5KefforY2FicPn1aFoqnnnpKxEpbNisrS9OF890uVsIkwldffSWZE1ZmsXD7VtCJWpu4FhPCJsiKROfF5NXrEf7t5y6fk5suPCX8upBYZ2D4ibvVl19+CXt7e9nmd+3aZTzaajK1+hMU8ZAhQ+Dl5SVVc1pGE2Ll3UyB8kNlJoU1A+fPnzcevRmGiZhB+u30b2ID6jXteSM0ZfheTNkwmjS0ZxkuK6u/PgzXEXSm/vzzTwlFDRw4EK6uru3WYdAJDgkJkUiB1tuRNCFWQluVnihNAd7pP/74o8RqCWOcDKib7FBetNLaUvxV/ZfFnBEtwHTu8mPLMW3HNASdDkJuRa7xyK1hO1FkZCQ+/PBDDB48WLJWLEz5tzoMRme0Gq66Fs2IlTA2u2fPHowbNw4OwxywdPlShBwJQXB6MPbk7hFHypagueN3wg9jNo+RrBvNnY6g0xoWFiaJF2798+fPvy0/QA9oSqyEgg0NDYXTRCcMtB+I3pN6Y/ia4Vh2YhkyyzONZ9kGNAtKakoQkhwCzwOeOJh70HikfRirZsLl3XfflZAg7VCaU1rf3m8XzYmVsDRt44aNsBtmh7v73A37mfbYlboL1c222XRYUlsitvm12bgbYdraZ5WP1GOw9mLZstabu9WBsiY0KVZSUFgA71XeGDR0EEaOGomoyChUVZony6V3GD3IKMtAankqqhqrkJOdA+8V3lJDTLGy5qI7qtosjWbFSo+Yq8XixYvhOMIRzlOcEb0zWhd1o5am0lAJv0Q/eOzzQGR8JLwWeMF+iD3GjR0ngX22xFsjmhWriazMLLkYdoPsJE549OhRmx+eYWj9CkwKxOgVo+E42VEcKXr+YaFhKC0tNZ5lfWherIRZLs4e4EX54osvEB8fr6l2mK6m3lCPtVFrMWD8APTq1wuTJk2SKIrWg/qdRRdiNeW2WcHOAPd3330n/7ZF6NkzuD9l6hT07d8XrtNdJT7NJIC1owuxmmDq0JQ0oGC7utOgu2H6dPfu3fIZjBg6ArNnzkb8sXirCU11hK7ESthxwKTB0KFD4e3tbTOCZYE6q/0/+ugjqVJzn+8u5pEtOZy6EysLuVn7yqY3rrDsFzJnp4EW4fvjZEYG+2m3L1q0CKmpqTYXGdGdWAmjARzEwNpMtsewFcNcnQZa4+LFiwgICMCYMWMwYsQIKetj8YktokuxEhZfULAsIqZgo6KiJFVrLbA6ikJlgJ8ZKQrVz8/PqkNTHaFbsRImDdhizMwNVx72clkL7ATm+NDhw4e3NVZSvLaMrsVKWEbIAcasgp8yZYoMetNzDJZ2KMNy7J7grvH222/LaB9bCE11hO7FSthpsGDBAnG4mOVi7aYW+947giGos2fPSlkf61A5b2H79u1qargRqxArhZmcnCytMVxh+Z2Bc73BsBzH29PjZwMlW1Cs1XH8P1iFWE2wboDpWDYfzps3Dzk5OboI73CLp1A5A4x9aGxBYZuJ4nqsSqzM8PAiM3DO4mPafVpPGnBXYF6fWz53Bd5krH3Q2gQ/LWBVYiUMX3GeFpMG3E45B1arcUlTVwT/Vt5c7DTtqLPXlrE6sRJGA9ixydmjLEb29fXV3AhHdkOwV+qdd94Rx5BhKvbtK/4dqxQr4WSRTZs2SQyWcUqKVytFybxxmHXjEF++Vq1aJXFVPUYwuhKrFSthpydXVcYruYLxWQfdHQaiDU3ThFkpZt4oVGtsQbEEVi1WwtWUrTGmGCzt2e7oNGAMlds8hcqKMdY1bN682WpbUCyB1YuV8EEbHPXIkBYjBSdOnOjyLBcTF6zBZbB/woQJ2LJli6aHoGkRmxAroU3Ih3JQLIzFUrBdAVdxjqxnSIorKodPMCtlKwXT5sRmxMrkgGkA3MsvvyzztDIyMoxHLQOFevjwYZmJyoJpVvjzMT5anNevB2xGrCYoHj5Sh5kiDw8P5OfnG4+YF87uon1Ms8O0mvN323KjY2exObFy++XqRruRTtfSpUtx4YJ5RkyaYM0pB6OxCoxC/frrr6W4RtE5bE6shJkjtsYwxUnBMnxkroIRtkPTy+foeWbQ+NBljvG5nYneiltjk2IlLB5hooAJA2a52DrS2bGPjOsy2M+Hejg6OkoLiq22jFsCmxUrYcqT43aYRWKQnuGk/9t8SNt3zZo1EuinUNl5a+uV/ebGpsVK2BrDQD0Fy62bWa7/CjNQzO2zGIWZMj7CXmWlzI/Ni5UwacAsF50hJycnmXByu1kubvN8zCeFysIZPt+L5oDC/CixGmHM9YcffpDAPeOhHQ2Ao8NEodKBYmaM0QVzPnxOcTNKrEYY0rrxqTG3ynKx7pSztyhUVvgzpqqHufx6Ron1BvicfYqQgmXjHsNO17bGcLWlmcBeKZ7D50qxJUUF+y2PEusNcIWlYCdPniw9+xzVw14u1pqy1YTC5MOT+Qik2bNny8PPVAy1a1BibQeKcu/evfLUPTpOrInlE0849YWzUOmIffvtt2IK2Nq8qe5EifUWsO2EEwsZ5KdIGdpiDJVOFVdbRdeixHoLmOVi3JVTUXr27Ck2KlOznAKjVtSuR4m1A9gvFRERIc+U4rwpWxtgrCWUWBW6QYlVoRuUWBW6QYlVoRuUWBW6QYlVoRuUWBW6QYlVoRuUWBW6QYlVoRuUWBW6QYlVoRuUWBW6QYlVoRuUWBU6Afgb+msNr7rqUbIAAAAASUVORK5CYII=)
Step 1:
Given angle is equal to 90.
Step 2:
So, the given angle is a right angle.
>>Hence, the angle of measurement is right angle.
Give another name for ![angle H](data:image/png;base64,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)
![](data:image/png;base64,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)
Another name for is
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)
Another name for is
A polygon with six sides is called a _____.
>>>Polygon with sides meant that it has six angles totally.
>>>Hence, we can say that the Hexagon is the term used to interpret a polygon that has six sides.
A polygon with six sides is called a _____.
>>>Polygon with sides meant that it has six angles totally.
>>>Hence, we can say that the Hexagon is the term used to interpret a polygon that has six sides.
Identify the non-polygon from the following.
Non polygon is the figure that cannot be represented using angles and sides.
>>>Hence, the non-polygon is Circle.
Identify the non-polygon from the following.
Non polygon is the figure that cannot be represented using angles and sides.
>>>Hence, the non-polygon is Circle.