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Section 5.1 Discrete Probability Probability Distributions β’ A probability distribution is a table that consists of outcomes and their probabilities. β’ To be a probability distribution it must have the following properties: β Each probability must be 0 β€ π₯ β€ 1 β The probabilities must have a sum of 1. x 1 P(x) 0.4 2 3 4 5 x 4 6 8 0.3 0.1 0.3 1.4 P(x) 1/4 1/4 0 10 12 1/8 3/8 Discrete vs. Continuous β’ Discrete β can be counted, whole numbers β’ Continuous β cannot be counted, fractions, decimals Expected Value β’ Expected value is the same as a weighted mean. β’ Formula: (π₯ β π π₯ ) x 4 5 6 7 8 P(x) 0.2 0.2 0.1 0.05 0.45 β’ Expected Value = 4 0.2 + 5 0.2 + 6 0.1 + 7 0.05 + 8(0.45)= 6.35 Variance and Standard Deviation β’ Variance: [(π₯ β π)2 β π(π₯)] where mean is the expected value. β’ Standard Deviation: square root of the x 2 3 4 5 6 variance P(x) 0.5 0.05 0.05 0.1 x P(x) π β π. ππ (π β π. ππ)π (π β π. ππ)π β π·(π) 2 0.5 -1.65 2.7225 1.36125 3 0.05 -0.65 0.4225 0.021125 4 0.05 .35 0.1225 0.006125 5 0.1 1.35 1.8225 0.18225 6 0.3 2.35 5.5225 1.65675 0.3 Sum = 3.2275 = Variance π£πππππππ = 3.2275 = 1.80 Profit and Loss w/ Probability β’ To determine the profit or loss using probability you will use the expected value for each event. β’ Formula: Profit minus loss: [π₯π β π π₯π ] β [π₯πΏ β π π₯πΏ ] β’ π₯π is the value of the profit or what you receive β’ π₯πΏ is the value of the loss or what you pay. Example β’ If you draw a card with a value of 2 or less from a standard deck of cards, I will pay you $303. If not, you pay me $23. (Aces are the highest card in the deck) β’ Find the expected value of the proposition. Solution 1. Find the probability of drawing a card with a value of 2 or less. 2. Find the value of drawing a card greater than 2. 3. Determine π₯π and π₯πΏ . 4. Fill in formula. 5. πΈπ₯ππππ‘ππ πππ π ππ ππππ = 303 4 52 β 23 48 52 = 23.31 β 21.23 = 2.08 6. So for each round that is played the is an expected gain of $2.08. 7. If there is a loss, the value would be negative. Example (part 2) β’ If you played the same game 948 times, how much would you expect to win or lose? Solution (part 2) β’ Take the profit or loss from one round and multiply by the number of times played. β’ $2.08 948 = $1971.84 Creating Probability Distribution w/ Tree Diagram β’ The number of tails in 4 tosses of a coin. x 0 1 2 3 4 P(x) 1 16 4 1 = 16 4 6 3 = 16 8 4 1 = 16 4 1 16 Section 6-1 Introduction to Normal Curve Normal Curve Example Section 6-2 Finding area under the Normal Curve Area Under a Normal Curve β’ Using z-scores (standard scores) we can find the area under the curve or the probability that a score falls below, above, or between two values. β’ The area under the curve is 1. β’ The mean (or z=0) is the halfway point, or has an area of .5000. β’ Values are listed to four decimal places. To How the Area under the Curve β’ If asked for the area to the left, find the value in the chart. β’ If asked for the area to the right, find the value and subtract from 1. Alternate Method: Find the opposite z-score and use that value. β’ If asked for the area between two z-scores, find the values and subtract. β’ If asked for the area to the right and to the left of two numbers, find the values and add. 1 - z-score Alternate Method Examples β’ Find the area: β To the left of z=2.45 β To the right of z=2.45 β Between z=-1.5 and z=1.65 β To the left of z=1.55 and to the right of z=2.65 β To the left of z=-2.13 and to the right of z=2.13 Solutions β’ β’ β’ β’ β’ .9929 .0071 .9960-.0668=.9292 .0606+.0013=.0619 .0166+.0166=.0332 Problems with greater than and less than β’ Some problems will have greater than or less than symbols. β’ P(z<1.5) is the same as to the left of z=1.5 β’ P(z>-2.3) is the same as to the right of z=-2.3 β’ P(-1.24<z<1.05) is the same as between z=1.24 and z=1.05 β’ P(z<1.02 and z>.02) is the same as to the left of z=1.02 and to the right of z=.02 Section 6-3 Finding area after finding the z-score How to solve β’ Find the z-score with the given information β’ Determine if the value is to the left, right, between, or to the left and right. β’ Look up values in the chart and use directions from 6-2. Examples Solutions β’ β’ β’ β’ P(0<z<1.5) = .4332 P(z<0) = .5000 P(z>2) = .0228 P(-.75<z<0.5) = .4649 Section 6-4 Finding Z and X Finding Z β’ If the value is to the left: β Find the probability in the chart and the z-score that corresponds with it. β’ If the value is to the right: β Subtract the value from one, find the probability and the z-score that corresponds with it. OR β Find the value and the corresponding z-score and change the sign. Finding Z β’ If the value is between: β Divide the area by 2, then add .5, then find the corresponding z-score. OR β Subtract the area from 1, divide by two, then find the corresponding z-score. β’ If the value is to the right and left: β Divide the area by 2, then find the corresponding z-score. Examples β’ Find the z-score that corresponds with: β Area of .1292 to the left β Area of .3594 to the right β Area of .7154 between β Area of .8180 to the left and the right Solutions β’ β’ β’ β’ -1.13 .36 -1.07 and 1.07 -.23 and .23 Word Problems β’ Determine if the problem is looking for less than, greater than, between, or less than and greater than. β’ Find the z-score(s). β’ Use the formula π§ = π₯βπ π to solve for x. β’ Some problems you will have two solutions. Word Problems
