Answer :
[tex]Area\ of\ base:A_B=169\pi\ ft^2\\\\A_B=\pi r^2\ \ \ (r-radius)\\\\\pi r^2=169\pi\ \ \ /:\pi\\\\r^2=169\\\\r=\sqrt{169}\\\\r=13\ (ft)\\\\H=2r\to H=2\cdot13=26\ (ft)[/tex]
[tex] lateral\ area:A_L=2\pi rH\\\\A_L=2\pi\cdot13\cdot26=676\pi\ (ft^2)\\\\Surface\ area:A_S=2A_B+A_L\\\\A_S=2\cdot169\pi+676\pi=338\pi+676\pi=1014\pi\ (ft^2)[/tex]
[tex] lateral\ area:A_L=2\pi rH\\\\A_L=2\pi\cdot13\cdot26=676\pi\ (ft^2)\\\\Surface\ area:A_S=2A_B+A_L\\\\A_S=2\cdot169\pi+676\pi=338\pi+676\pi=1014\pi\ (ft^2)[/tex]
Area of base = 169 π
r = √Area = 13 ft
Given, height = 2 x 13 = 26 ft.
Lateral surface area of cylinder = 2πrh = 2 x π x 13 x 26 = 676 π ft²
Total surface area = 2πr(r + h) = 2 x π x 13 x 39 = 1014 π ft²
Thus, lateral surface area is 676 ft² and total surface area is 1014 ft²
r = √Area = 13 ft
Given, height = 2 x 13 = 26 ft.
Lateral surface area of cylinder = 2πrh = 2 x π x 13 x 26 = 676 π ft²
Total surface area = 2πr(r + h) = 2 x π x 13 x 39 = 1014 π ft²
Thus, lateral surface area is 676 ft² and total surface area is 1014 ft²