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Question
Is it possible to have a polygon, whose sum of interior angles is 1030°.
Sum
Solution
Let no. of. sides be = n
Sum of interior angles of polygon = 1030°
∴ (2n - 4) × 90° = 1030°
⇒ 2(n - 2) = `(1030°)/(90°)`
⇒ (n - 2) = `(1030°)/(2 xx 90°)`
⇒ (n - 2) = `103/18`
⇒ n = `103/18 + 2`
⇒ n = `139/18`
Which is not a whole number. Hence it is not possible to have a polygon, the sum of whose interior angles is 1030°.
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