The question is incomplete as it does not specify what 216 is being compared to. A ratio is a comparison of two quantities. For example, the ratio of 216 to 72 would be 3:1, as 216 divided by 72 equals 3. Please provide more context or specifics to accurately determine the ratio of 216.
It is 10 to 3 as a simplified ratio
The first six positive integer multiples of 216 are: 1 x 216 = 216 2 x 216 = 432 3 x 216 = 648 4 x 216 = 864 5 x 216 = 1080 6 x 216 = 1296
216
fraction equivalent to 216 = 216/1
63 = 216; 6 raised to the 3rd power is 216.
It is 10 to 3 as a simplified ratio
The ratio is sqrt(125/216) = sqrt(0.578704) = 0.7607 (to 4 dp) The question is more likely to have been about volumes being 125 and 216. In that case, the ratio of the solids' dimensions would have been the cuberoot of (125/216) which is 5/6.
No it is not.
To find the reduced ratio of 216 and 294, we first determine the greatest common divisor (GCD) of the two numbers, which is 6. Dividing both numbers by 6 gives us 36 and 49. Therefore, the reduced ratio of 216 to 294 is 36:49.
To find the reduced ratio of 216 to 294, we first determine the greatest common divisor (GCD) of the two numbers, which is 6. Dividing both numbers by 6 gives us 36 and 49. Therefore, the reduced ratio of 216 to 294 is 36:49.
216 to 1
216 inches / 11 feet = 18 feet/11 feet = 18/11
125:216
6 to 1
Side = 6 mm Area = 216 mm2 Volume = 216 mm3 Area/Volume = 1 per mm
The surface area to volume ratio is 1:1 Surface area = (6*6) * 6 = 216 Volume = 6*6*6 = 216
To find the surface area and volume of a cube with a side length of 6 mm, we first calculate the surface area (SA) as (SA = 6 \times (6 , \text{mm})^2 = 216 , \text{mm}^2) and the volume (V) as (V = (6 , \text{mm})^3 = 216 , \text{mm}^3). The ratio of surface area to volume is then ( \frac{SA}{V} = \frac{216 , \text{mm}^2}{216 , \text{mm}^3} = 1 , \text{mm}^{-1}). Thus, the ratio of surface area to volume is 1 mm(^{-1}).