Math, asked by khanjagseer02, 4 months ago

find the number of sides of a regular polygon whose each exterior angle has a measure of 45°

Answers

Answered by DGGKINGS

Answer is 8 sides

Step-by-step explanation:

The sum exterior angle is 360

The sum exterior angle is 360 let side be n

The sum exterior angle is 360 let side be neach exterior angle is 45

The sum exterior angle is 360 let side be neach exterior angle is 45NOTE multiplication sign is '*'

The sum exterior angle is 360 let side be neach exterior angle is 45NOTE multiplication sign is '*'45*n = 360

The sum exterior angle is 360 let side be neach exterior angle is 45NOTE multiplication sign is '*'45*n = 360n = 360/45

The sum exterior angle is 360 let side be neach exterior angle is 45NOTE multiplication sign is '*'45*n = 360n = 360/45n = 8

The sum exterior angle is 360 let side be neach exterior angle is 45NOTE multiplication sign is '*'45*n = 360n = 360/45n = 8so the number of sides is 8

Answered by EnaayaAfsarKhan

Answer:

Step-by-step explanation:

The sum exterior angle is 360

The sum exterior angle is 360 let side be n

The sum exterior angle is 360 let side be neach exterior angle is 45

The sum exterior angle is 360 let side be neach exterior angle is 45NOTE multiplication sign is '*'

The sum exterior angle is 360 let side be neach exterior angle is 45NOTE multiplication sign is '*'45*n = 360

The sum exterior angle is 360 let side be neach exterior angle is 45NOTE multiplication sign is '*'45*n = 360n = 360/45

The sum exterior angle is 360 let side be neach exterior angle is 45NOTE multiplication sign is '*'45*n = 360n = 360/45n = 8

The sum exterior angle is 360 let side be neach exterior angle is 45NOTE multiplication sign is '*'45*n = 360n = 360/45n = 8so the number of sides is 8

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find the number of sides of a regular polygon whose each exterior angle has a measure of 45°