Answer :(c) = 4 m
Let the height of the building
= internal diameter of the dome = 2r m.
∴ Radius of the building = radius of dome = \(\frac{2r}{2}\) = r m.
Height of cylindrical portion = 2r – r = r m.
Volume of the cylinder = πr2(r) = πr3 m3
Volume of hemispherical dome = \(\frac{2}{3} \pi r^3 \, m^3\)
∴ Total volume of the building
= \(\pi r^3 +\frac{2}{3}\pi r^3 = \frac{5}{3} \pi r^3 \,m^3\)
Given,
\(\frac{5}{3}\pi r^3 = 41\frac{19}{21} = \frac{880}{21} \implies r^3 = \frac{880\times 7 \times 3}{5\times 22\times21} =8\)
∴ r = \(\sqrt[3]{8}\)
= 2 m
Hence, height of the building = 2r = 4 m.
