As the mean is greater than the median it will be positively skewed (skewed to the right),
and if the median is larger than the mean it will be negatively skewed (skewed to the left)
The frequency distribution is likely to be symmetrical and bell-shaped, resembling a normal distribution. Given that the mean, median, and mode are all equal at 12,000 pounds, it suggests that the data is centered around this value with a balanced spread on either side. This indicates that the distribution has a single peak at the center, with a consistent frequency of values around the mean.
Median = 52 pounds Range = 26 pounds
Median 30 pounds. Range = 52 - 6 = 46 pounds.
If x ≤ 3 then median = 3 pounds, range = 52 - x pounds. If 3 ≤ x ≤ 52 then median = x pounds, range = 52-3 = 49 pounds. If 52 ≤ x then median = 52 pounds, range = x - 3 pounds.
The median is the middle value when the numbers are arranged in order. In this case, when arranged in ascending order, the middle value is 30 pounds. Therefore, 30 pounds is the median of the given values.
93
30 pounds.
The median is the middle number when the numbers are arranged in numerical order. In this instance, the numbers are 30, 48, and 52, therefore the median is 48 pounds, the second number along.The range is the difference between the lowest and highest number. In this instance, the range is equal to 52 - 30 = 22 pounds.
The median is the middle number when the numbers are arranged in numerical order. In this instance, the numbers are 30, 48, and 52, therefore the median is 48 pounds, the second number along.The range is the difference between the lowest and highest number. In this instance, the range is equal to 52 - 30 = 22 pounds.
The median number is the one situated in the middle when all the values are in order. In this instance, the median of 30, 49, and 52 is 49.The range of the values is equal to the difference between the highest and the lowest value. In this instance, the difference between the highest and lowest value is 52 - 30 = 22 lbs.
The answer will depend on the distribution of the weights. There is no basis for assuming that the distribution is normal, or even symmetrical.
The median dog weight varies depending on the breed. In general, small breeds like Chihuahuas may have a median weight around 5-10 pounds, medium breeds like Beagles around 20-30 pounds, and large breeds like Golden Retrievers around 55-75 pounds. It's important to consult with a veterinarian for guidance on your specific dog's weight.