Exercise 84 Page 461

Practice makes perfect

a The exterior angle and its corresponding interior angle of a polygon are supplementary angles. This means they sum to 180^(∘). With this information we can determine the polygon's interior angle, θ. θ+18^(∘) =180^(∘) ⇔ θ =162^(∘) In a polygon, the sum of the interior angles is 180^(∘)(n-2), where n is the number of sides. Since this is a regular polygon where all interior angles are congruent we can equate this with 162^(∘) n and solve for n.

180^(∘)(n-2)=162^(∘) n

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Solve for n

Distr

Distribute 180^(∘)

180^(∘) n-360^(∘)=162^(∘) n

SubEqn

LHS-162^(∘)=RHS-162^(∘)

18^(∘) n-360^(∘)=0

AddEqn

LHS+360^(∘)=RHS+360^(∘)

18^(∘) n=360^(∘)

DivEqn

.LHS /18^(∘).=.RHS /18^(∘).

n=20

The number of sides is 20.

b To find the area of the 20-gon, we will first draw it including the diagonals between opposite vertices which creates 20 congruent and isosceles triangles. We know they are congruent by the SSS (Side-Side-Side) Congruence Theorem.

If we find one triangle's area we can calculate the area of the polygon. Since we have 20 congruent isosceles triangles, their vertex angle will be 360^(∘)20=18^(∘). We also know that the base of this triangle is 2 units. Let's draw one of these triangles, including its height.