Density Curves and the Normal Distribution

1. Chapter 2 DENSITY CURVES AND THE NORMAL DISTRIBUTION

2. Density Curve • A graph that represents the relative frequency distribution for a set of data • It can be used to describe the overall pattern of a distribution. • Often an idealized version – “Mathematical Model” • ALWAYS above or on the horizontal axis • ALWAYS bounds AREA = 1 • AREA bounded is used to tell the proportion of observations within a range of values.

3. 1 1/6 AREA = 1 1 1 2 3 4 5 6 1/2 AREA = 1 1 2 3 4 6 5 Examples

4. FROM HISTOGRAM … TO … A DESITY CURVE TOTAL AREA OF ALL BARS = 1 A Mathematical Model – an idealized representation of reality

5. ACTUAL % OF SCORES LESS THAN 6 .. IS THE AREA OF THE HISTOGRAM BARS AREA = 0.303

6. AREA OF THE APPROXIMATED DENSITY CURVE IS NOT EXACT! AREA OF SHADED REGION = 0.293 … (i.e. 0.01 lower than the actual area)

7. Total Area = 1.00 Area = .12 7 8

8. Let’s ROLL A DISTRIBUTION • P.84 # 2.5 • Simulate the act of “Rolling a single die” • {1, 2, 3, 4, 5, 6} • Clear L1 • MATH >>> PRB 5:RandInt(1, 6, 100) • STO  L1 • WINDOW: X [1, 7]; Y [-5, 25] YScl = 5 • STAT PLOT: Histogram for L1 • Repeat … Are we all the same? Skip for now …

9. Mean and Median • MEAN: If the distribution were to be made out of solid material … the MEAN would be the balancing point. • MEDAIN: The point where the area under the curve is divided into to equal halves. • Same ideas from last chapter … regarding the impact of skewing. • Skewed Data

14. The “NORMAL” Distribution • Normal Distribution

15. Points of Inflection …. ONE Standard Deviation from the MEAN