Survey
* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project
* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project
Probability Prof.Dr.Ramez bedwani Outcome • What is meant by a normal distribution & its uses Probability The probability of the occurrence of a particular event equals the proportion of times that the event does occur in a large number of similar repeated trials Magnitude of probability • It represents one’s degree of belief in the occurrence of an event • In statistics the investigator assigns a prior probability to the event (Hypothesis) study posterior probability (probability modified in the light of the results obtained ) Probability Calculations Multiplicative rule • Prob(A and B) = prob (A)x prob(B) with the condition that A and B are independent (Conditional probability) e.g. the sexes of children are independent events as the probability that the next child is a girl is not affected by the sexes of the previous children Probability Calculations Additive rule • Prob (A or B) = prob (A)+ prob (B)– prob (both A,B) e .g. In Abis area the prob . Of Schisto infection is 70% (0.7) and of Asceris 40%(0.4) ,whet is the probability Of having either Schisto OR Ascaris . • Prob (Schist or Ascaris)=0.7+0.4 – (0.7x0.4)= 1.1 - 0.28 = 0.82 • Provided that : the two events are independent » When the two events are mutually exclusive (can not occur together ) A X B = 0 Normal Distribution Characteristics of normal distribution • Symmetric, bell-shaped curve. • Shape of curve depends on population mean and standard deviation . • Center of distribution is . • Spread is determined by . • Most values fall around the mean, but some values are smaller and some are larger. Characteristics of Normal Distribution • It is Symmetric around the mean: Two halves of the curve are the same (mirror images) Examples of normal random variables • Blood Pressure level Definitions • Mean is located in center, or mode of normal curve • The standard deviation is the distance from the mean to the inflection point of the normal curve • the inflection point is the place where the curve changes from concave down to concave up. Construction • A normal curve is drawn by first drawing a Histogram and fitting the normal curve • Next, place the mean, mu on the curve. • Then place sigma on curve by placing the segment from the mean to the upper (or lower) inflection point on your curve. • From this information, the scale on the horizontal axis can be placed on the graph Example • For any normal curve with mean mu and standard deviation sigma: • 68 percent of the observations fall within one standard deviation sigma of the mean. • 95 percent of observation fall within 2 standard deviations. • 99.7 percent of observations fall within 3 standard deviations of the mean. Questions • Draw normal curve with mean=mu=100, and standard deviation = sigma = 10. • Draw normal curve with mean = 20, sigma=2. Assignment Topic Uses of t-test of significance Students Names باخوم سدراك نظير سدراك باسم خالد محمد بسمه مهدي رياض بسنت اشرف محمد بسنت حسن علي تغريد محمود ابراهيم حسام الدين حسين محمد حسام حسين منصور حماده محمد عشري حميد عبد االله دعاء السيد رشاد