0.1ml
2.3 g to 9.8g
1.9mL to 8.7mL
The range is: 8.7 minus 1.9 = 6.8 ml
11 Degrees C to 31 Degrees C The range is 20.
It is 6.8ml, the difference between the lowest and highest numbers.
a through z
2.3 g to 9.8g
1.9mL to 8.7mL
The range is: 8.7 minus 1.9 = 6.8 ml
To find the range of the set of measurements, first identify the maximum and minimum values. The maximum value is 8.7 ml and the minimum value is 1.9 ml. The range is calculated by subtracting the minimum from the maximum: 8.7 ml - 1.9 ml = 6.8 ml. Therefore, the range of the set is 6.8 ml.
11 Degrees C to 31 Degrees C The range is 20.
The narrowness of range of measurements refers to the degree of variation or dispersion within a set of data points. A narrow range indicates that the measurements are closely clustered together, suggesting consistency and reliability in the data. Conversely, a wider range indicates greater variability and less predictability. In statistical analysis, a narrow range can imply higher precision in measurements.
2.3 g to 9.8g
It is 6.8ml, the difference between the lowest and highest numbers.
There cannot be an answer since 1.9 m is a linear measure while the rest are measures of volume. They cannot be combined or compared in any way so a range is not possible.
To find the range of the given set of measurements (3.1 ml, 2.7 ml, 4.6 ml, 1.9 ml, 8.7 ml), subtract the smallest measurement from the largest measurement. The smallest value is 1.9 ml and the largest is 8.7 ml. Thus, the range is 8.7 ml - 1.9 ml = 6.8 ml.
For a set of measurements, the range is the biggest measurement minus the smallest measurement.