1 Answer

Dejan Toteff · Answer 1 · 2023-07-09T03:48:55+0000

To answer this question, we will use the following diagram as reference:

From the above diagram, we want to determine the length of HI and L. Now, we know that:

$HB=9mm\text{.}$

Since triangle HIB is a right triangle and α=360/7 degrees, then:

$\begin{gathered} \sin (\alpha)/(2)=((L)/(2))/(HB)\text{.} \\ \sin ((360)/(14))=\frac{L}{18\operatorname{mm}}\text{.} \end{gathered}$

Therefore:

$L=\sin ((360)/(14)^(\circ))18\operatorname{mm}.$

To determine HI we use the cosine function:

$\begin{gathered} \cos ((\alpha)/(2))=(HI)/(HB)=\frac{HI}{9\operatorname{mm}}, \\ HI=\cos ((360)/(14)^(\circ))9\operatorname{mm}. \end{gathered}$

Finally, recall that the area of a heptagon is given by the following formula

$\text{Area}=(apothem\cdot perimeter)/(2).$

Substituting the values we found we get:

$A=\frac{\cos ((360)/(14)^(\circ))9\operatorname{mm}(\sin ((360)/(14)^(\circ))18\operatorname{mm}*7)}{2}\approx221.649mm^2.$

Answer:

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