To find the ratios of the base areas, surface areas, and volumes of the two similar cones, we can use the following formulas:
Ratio of base areas = (radius of cone A)^2 : (radius of cone B)^2
Ratio of surface areas = (surface area of cone A) : (surface area of cone B)
Ratio of volumes = (volume of cone A) : (volume of cone B)
Using the given dimensions, we can calculate the ratios as follows:
Ratio Calculation Simplified
Base areas (MN^2 : EF^2) 1 : 9
Surface areas (πMN(MN + ON) : πEF(EF + FG)) 1 : 3
Volumes (1/3 x πMN^2 x ON : 1/3 x πEF^2 x FG) 1 : 27
Therefore, the ratios of the base areas, surface areas, and volumes of the two cones are 1 : 9, 1 : 3, and 1 : 27, respectively.