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प्रश्न
If a polygon has 44 diagonals, find the number of its sides.
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उत्तर
A polygon of n sides has n vertices. By joining any two vertices of a polygon, we obtain either a side or a diagonal of the polygon.
A number of line segments obtained by joining the vertices of a n sided polygon taken two at a time = Number of ways of selecting 2 out of n.
= nC2
= `("n"("n" - 1))/2`
Out of these lines, n lines are the sides of the polygon, Sides can’t be diagonals.
∴ Number of diagonals of the polygon
= `("n"("n" - 1))/2 - "n" = ("n"("n" - 3))/2`
Given that a polygon has 44 diagonals.
Let n be the number of sides of the polygon.
`("n"("n" - 3))/2 = 44`
⇒ n(n – 3) = 88
⇒ n2 – 3n – 88 = 0
⇒ (n + 8) (n – 11)
⇒ n = -8 (or) n = 11
n cannot be negative.
∴ n = 11 is number of sides of polygon is 11.
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