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Statistics lesson SaRstats.lgfl.net Objectives: To identify normal distributions To use the standard normal distribution model to evaluate probabilities Job Requirements Maths required: • Probability scales • Standardising scores Search and Rescue – sar.lgfl.net Equipment required: • Ruler • Pencil • Pen • Calculator • Normal distribution table © 2016 London Grid for Learning Videos • Introduction to Coastguard rescue teams • Can you give an example of the Maths involved in your decisions? Search and Rescue – sar.lgfl.net © 2016 London Grid for Learning Standard normal distribution Normally distributed results can be compared to the standard normal distribution curve to find probabilities. 0 (sometimes represented by μ) is the mean of the data. σ is a standard deviation. Search and Rescue – sar.lgfl.net © 2016 London Grid for Learning Normal distribution table Once you find a standardised score (z), you can find the probability using the table. e.g. P(0.19) = 0.5753 This means that 0.5753 (57.53%) of the value are less than 0.19 deviations from the mean. Interpret the probabilities as meaning less than the standardised value. Search and Rescue – sar.lgfl.net © 2016 London Grid for Learning Survivability mean/deviation Water Temp (oC) Mean time until death Standard deviation of time until death < 0.3° 20 minutes 4 minutes 0.3–4.4° 50 minutes 10 minutes 4.4–10° 120 minutes 22 minutes 10–15.6° 230 minutes 43 minutes 15.6–21.1° 830 minutes 232 minutes Search and Rescue – sar.lgfl.net © 2016 London Grid for Learning Example We are told that a person has capsized a small boat in waters that are 3.2°. If we can reach them in 25 minutes, what is the probability that they will die before we reach them? 1. Identify how many deviations from the mean this is. 25 - 20 = 5 5 / 4 = 1.25 (divide by the standard deviation for a standardised score) 2. Look up this value in the distribution table. There is an 89.44% chance that they will die. Search and Rescue – sar.lgfl.net © 2016 London Grid for Learning
