Answer:
The lateral area of the pyramid is 180 unit².
Step-by-step explanation:
We are given a hexagonal pyramid with dimensions,
Base (B)= 6 units and Height (H) = 8 units
Now, the lateral area of the pyramid = [tex]\frac{1}{2}PL[/tex], where P = perimeter of the base and L = slant height.
Since, the base of the pyramid is a hexagon.
So, the perimeter of an hexagon = [tex]6\times Side[/tex] = 6 × 6 = 36 units
Also, the slant height is given by,
[tex]L^{2}=\sqrt{B^{2}+H^{2}}\\\\L^{2}=\sqrt{6^{2}+8^{2}}\\\\L^{2}=\sqrt{36+64}\\\\L^{2}=\sqrt{100}\\\\L=\pm 10[/tex]
Since, the slant height cannot be negative. So, L = 10 units.
Substituting the values gives,
The lateral area of the pyramid = [tex]\frac{1}{2}\times 36\times 10=36\times 5=180[/tex]
Thus, the lateral area of the pyramid is 180 unit².
