Question

find the number of sides of a regular polygon in each interior angel is. 60dgree ​

Answer 1

Answer❀✿°᭄

Let Z be the number

Z = 13x + 11 where x is the quotient when Z is divided by 13

Z = 17y + 9 where y is the quotient when Z is divided by 17

13x + 11 = 17y + 9

13x + 2 = 17y since x and y are quotients they should be whole numbers . Since y has to be a whole number the left hand side should be multiple of 17

The least possible value of x satisfying the condition is 9 and y will be 7

The answer is 13*9 + 11 = 128 or it is 17*7 + 9 = 128

This is the least number possible. There will be multiple answers and will increase in multiples 17*13 = 221 like 349 , 570, etc

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Answer 2

Answer :

• Number of sides is 6

Given :

• The number of sides of a regular polygon in each interior angle is 60⁰

To find :

• Numbers of sides of a regular polygon

Solution :

As we know that:

• sum of all interior angle is 360⁰

Then,

● 360/60

● 6

Hence The number of sides is 6

More Explanation :

• Regular polygon has all sides equal
• Regular polygon has all angles equal
• it have Two dimensions
• Interior and exterior angles
• Interior angles is 360⁰
• regular polygon has equal interior and exterior angles
• Example of regular polygon are pentagon,triangle, Quadrilateral, hexagon etc..
• polygon comes from Greek words which means many angles