Question

Each side of a regular polygon is 5.2 m and its perimeter is 36.4 m. Find the number of sides of the polygon.

Answer 1

Answer:

7 sides are there. hence it is a septagon

Step-by-step explanation:

let no. of sides be x

side=5.2 m

perimeter=36.4 m

now, perimeter of a regular polygon= side*no. of sides

= 36.4=5.2 x

=$\frac{36.4}{5.2}=x$

=7 =x

hope its clear

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Answer 2

Question :-

Each side of a regular polygon is 5.2 m and its perimeter is 36.4 m. Find the number of sides of the polygon.

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Solution :-

➲ Given Information :-

• Measure of each side of polygon ➢ 5.2 m
• Perimeter of the polygon ➢ 36.4 m

➲ To Find :-

• Number of sides of the polygon

➲ Concept :-

• Area And Perimeter of Plane Figures

➲ Explanation :-

• In order to find the number of sides of the polygon, We have to divide the ' perimeter of the polygon ' with the ' measure of each side of polygon '. The resulting values will be the total number of sides present in the polygon.

➲ Formula Used :-

• $\underline{ \underline{ \boxed{ \boxed{ \bf \red{number \: of \: sides \: of \: polygon = \dfrac{perimeter \: of \: polygon}{measure \: of \: each \: side \: of \: polygon} }}}}}$

➲ Calculation :-

Simply, substituting the values in the formula, We get,

⇒ $\sf {number \: of \: sides \: of \: polygon = \dfrac{perimeter \: of \: polygon}{measure \: of \: each \: side \: of \: polygon} }$

Substituting the values given, We get,

⇒ $\sf {number \: of \: sides \: of \: polygon = \dfrac{36.4 m}{5.2 m} }$

Cancelling & Calculating further, We get,

⇒ $\sf{number \: of \: sides \: of \: polygon = \red 7}$

∴ Number of sides of the polygon = 7

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Final Answer :-

The number of sides of this polygon is 7. This means that this figure is a Regular Heptagon.

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Note :-

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