Learn about what makes a curve normal or abnormal. youstudynursing.com/ Research eBook: amzn.to/1hB2eBd SUBSCRIBE for more youtube.com/user/NurseKillam Related Videos: www.youtube.com/playlist?list=PLs4oKIDq23AdTCF0xKCiARJaBaSrwP5P2 Connect with me on Facebook Page: www.facebook.com/NursesDeservePraise Twitter: @NurseKillam twitter.com/NurseKillam Facebook: www.facebook.com/laura.killam Normal distributions, Modality, Skewness and Kurtosis: Understanding the concepts The normal distribution is a theoretical concept of how large samples of ratio or interval level data will look once plotted. Since many variables tend to have approximately normal distributions it is one of the most important concepts in statistics. The normal curve allows for probabilities to be calculated. In addition, many inferential statistics require that data are distributed normally. If your data is not normal be careful what statistical tests you use with it. In a normal distribution, measures of central tendency including the mean, median and mode all fall at the same midline point. The mean, median and mode are all equal. The calculation of these measures of central tendency are covered in another video. Normal distributions share several key features. They are unimodal, meaning that there is only one peak in the distribution. When divided at the mean a normal distribution takes the form of a symmetrical bell-shaped curve. Standard deviations are used to measure how much variation exists in a distribution. Low standard deviations mean values are close to the mean whereas high standard deviations mean that values are spread out over a large range. In a normal distribution approximately 34% of scores fall between the mean and 1 standard deviation above the mean. Therefore, based on it's symmetry, approximately 68% of scores fall between 1 standard deviation above and 1 standard deviation below the mean; approximately 95% of scores fall between 2 standard deviations above and 2 standard deviations below the mean; approximately 99.7% of scores fall between 3 standard deviations above and below the mean. Z scores are used to measure how many standard deviations above or below the mean a particular score is. These scores allow for comparison and probability calculations. Not all samples approximate a normal curve. To understand more about distributions it is important to understand modality, symmetry and peakedness. A distribution can have more than one peak. The number of peaks contained in a distribution determines the modality of the distribution. Most distributions are normally distributed and have only one main peak, meaning they are unimodal. However, it is possible to have distributions with two or more peaks. Distributions with two peaks are bimodal. Distributions with more than two peaks are multimodal. Symmetry and modality are independent concepts. If two halves of a distribution can be superimposed on each other where each half is a mirror image of the other, the distribution is said to be symmetrical. Sometimes data are not symmetrical. If the peak is off centre one tail of the distribution will be longer than the other, meaning it is skewed. Skewness is a measure of the symmetry of distributions. Pearson's skewness coefficient provides a non-algebraic, quick estimation of symmetry. Recall that Normal distributions are symmetrical and bell shaped. In a perfect distribution the skewness coefficient will be equal 0 because the mean equals the median. Positive skewness means there is a pileup of data to the left leaving the tail pointing to the right side of the distribution. The tail has been pulled in the positive direction. The data is skewed to the right. In this case the Mean is to the right of the median. Interestingly, positive skews are more common than negative ones. Negative skewness means there is a pileup of data to the right with a long tail on the left side. The tail has been pulled in a negative direction. In this case the Mean is to the left of the median. To remember the meaning of a positive and negative skew think of pulling on tails. Remember that the tail points towards the direction of the skew. The mean is also pulled in the direction of the long tail of the skew. Kurtosis is a measure of the shape of the curve. It measures if the bell of the curve is normal, flat, or peaked. Since it's calculation is tedious it is typically done by a computer. Using Fisher's measure of kurtosis a normal distribution would receive a coefficient of 0 and be called mesokurtic. If the calculation of excess Kurtosis results in a large positive number the distribution is too peaked to be considered normal. This type of data is called leptokurtic. The curve is taller and skinnier than a normal distribution. The beginning of the word kind of sounds like leapt so think of a skinny guy who leapt high in the air....

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