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Question
If the difference between the exterior angle of a 'n' sided regular polygon and an (n + 1) sided regular polygon is 12°, find the value of n.
Solution 1
We know that sum of exterior angles of a polygon = 360°
Each exterior angle of a regular polygon of 360°
n sides = `360^circ/"n"`
and exterior angle of the regular polygon of
(n + 1) sides = `360^circ/("n" + 1)`
`therefore 360^circ/"n" - 360^circ/("n" + 1) = 12`
`=> 360 [1/"n" - 1/("n" + 1)] = 12`
`=> 360 [("n" + 1 - "n")/("n"("n" + 1))] = 12`
`=> (30 xx 1)/("n"^2 + "n") = 12`
`=> 12 ("n"^2 + "n") = 360^circ`
⇒ n2 + n = 36 (Dividing by 12)
⇒ n2 + n − 30 = 0
⇒ n2 + n − 30 = 0
⇒ n2 + 6n − 5n - 30 = 0 ...{∵ −30 = 6 × (−5), 1 = 6 − 5}
⇒ n(n + 6) − 5(n + 6) = 0
⇒ (n + 6)(n + 5) = 0
Either n + 6 = 0, then n = −6 which is not possible being negative
orn - 5 = 0 then n = 5
Hence n = 5.
Solution 2
Step 1: Exterior Angle of a Regular Polygon
The formula for the exterior angle of a regular polygon with n sides is:
Exterior angle = `(360°)/n`
For an n-sided polygon, the exterior angle is `(360°)/n`
For an (n + 1)-sided polygon, the exterior angle is `(360°)/(n+1)`
Step 2: Difference Between the Exterior Angles
According to the problem, the difference between the exterior angle of an n-sided polygon and an (n + 1)-sided polygon is 12∘. Therefore:
`360/n - 360/(n+1) = 12`
Step 3: Solve for n
Factor out 360 on the left-hand side: `360 (1/n - 1/(n+1)) =12`
Divide both sides by 360:
`1/n - 1/(n+1) = 12/360`
Simplify `12/360: 1/n - 1/(n+1) = 1/30`
Step 4: Combine the Terms on the Left
`1/n - 1/(n+1) = ((n+1) - n)/(n(n+1))`
`1/n - 1/(n+1) = 1/(n(n+1))`
`1/(n(n+1)) = 1/30`
Step 5: Solve for n
Cross-multiply to eliminate the denominators:
n(n + 1) = 30
n2 + n − 30 = 0
Step 6: Solve the Quadratic Equation
`n = (-b+- sqrt(b^2 - 4ac))/(2a)`
a = 1, b = 1, and c = −30
Substitute the values:
`n = (-1 +- sqrt(1^2 - 4(1)(-30)))/(2(1))`
`n = (-1 +- sqrt(1+120))/(2)`
`n = (-1 +- sqrt(121))/(2)`
`n = (-1 +- 11)/(2)`
Now, solve for the two possible values of n:
`n = (-1+11)/2 = 10/2 = 5`
`n = (-1-11)/2 = (-12)/2 = -6` (not valid as n must be positive).
The value of n is 5.
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