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H. V. R. Iyengar died in 1978.
The total surface area is 2*pi*r*(r + h) where r is the radius and h the height.= 2*pi*2.5*8.5 = 133.52 sq yards.The total surface area is 2*pi*r*(r + h) where r is the radius and h the height.= 2*pi*2.5*8.5 = 133.52 sq yards.The total surface area is 2*pi*r*(r + h) where r is the radius and h the height.= 2*pi*2.5*8.5 = 133.52 sq yards.The total surface area is 2*pi*r*(r + h) where r is the radius and h the height.= 2*pi*2.5*8.5 = 133.52 sq yards.
V = ⅓•π•r²•h Where: - V: Volume of Cone - π: Constant (Ratio of Circumference to Diameter for any Circle) - r: Radius of Base - h: Vertical Height Tsa = π•r(r+√(r²+h²)) = π•r(r+l) Where: - Tsa: Total Surface Area (i.e. Base inclusive) - π: Constant (Ratio of Circumference to Diameter for any Circle) - r: Radius of Base - h: Vertical Height - l: Slant Height = √(r²+h²) (Using Pythagorean Theorem) SA = π•r(√(r²+h²)) = π•r•l Where: - SA: Lateral Surface Area - π: Constant (Ratio of Circumference to Diameter for any Circle) - r: Radius of Base - h: Vertical Height - l: Slant Height = √(r²+h²) (Using Pythagorean Theorem)
If r is the radius of the can and h is the height thenSurface area = pi*r*(r+h) square units Volume = pi*r^2*h.
Surface Area = 2*pi*(r^2) + 2*pi*r*hVolume = pi*(r^2)*hFor a cylinder with a radius of r and a height of h.The ratio then is:[ 2*pi*(r^2) + 2*pi*r*h ] / [ pi*(r^2)*h ] =(2/h) + (2/r) =2*{ (1/h) + (1/r) }