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Multiple Linear Regression: Cloud Seeding

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Title: Multiple Linear Regression: Cloud Seeding


1
Multiple Linear Regression Cloud Seeding
  • By Laila
  • Rozie
  • Vimal

2
Introduction
  • What is Cloud Seeding?
  • Treatment of individual clouds or storm systems
    to achieve an increase in rainfall.
  • Treatment massive amount of Silver iodide
    (100-1000g per cloud)
  • The experiment took place in the Florida.
  • 24 days were considered suitable for seeding on
    the basis of measured suitability criterion S-Ne.
  • optimal days for seeding are those
  • When seedability is large
  • natural rainfall early in the day is small.

3
Objective of the Experiment
  • Analyze the data to see how rainfall is related
    to the explanatory variables and determine the
    effectiveness of seeding.

4
Multiple Linear Regression
  • It attempts to model the relationship between two
    or more explanatory variables, and a response
    variable by fitting a linear equation to observed
    data.
  • What are explanatory variable?
  • they are the independent variables in the
    experiment used to explain the response variable.
  • What is the response variable?
  • They are the dependent variables.

5
Explanatory variables
  • Seeding A factor indicating whether seeding
    action occurred So yes and no
  • Time number of days after the first day of
    experiment
  • Cloud cover percent cloud cover in that
    experimental area. Measure using a radar.
  • Prewetness total rainfall an hour before seeding
  • echo motion whether radar echo was moving or
    stationary
  • SNe Suitability criteria

6
Response Variable
  • The amount of rain measured in cubic meters
    107

7
Multiple Correlation Coefficient
  • The correlation between the rainfall and all the
    explanatory variables is given by the value of
    R².
  • the set of predictor variables X1, X2, ... is
    used to explain variability of the criterion
    variable Y

8
Assumptions
  • All data are drawn from populations following
    normal distribution
  • All data are homoskedastic meaning constant
    variance.
  • All explanatory variables are measured without
    error.
  • Avoidance of multicolinearily- so when the
    explanatory variable start to show some
    correlation among each other. So it is important
    to have the correlation between each pair of
    explanatory variables approximates to zero. co
    linearity is a problem because it can make the
    regression difficult or misleading to interpret.

9
Multiple Linear Regression Model
  • yi ?0 ?1xi1 ?2xi2 ... ?pxip ei for i
    1,2, ... n.

10
Analysis of variance
  • The ANOVA calculations for the multiple linear
    regression is identical except the degrees of
    freedom are adjusted to reflect the number of
    explanatory variables in the model.
  • There is also an F-test used, which does not
    indicate which of the parameters ?x is not equal
    to zero, but only that atleast one of them is
    linearly related to the response variable.

11
Homework
  • Define the explanatory variable and the response
    variable? (List what they in terms of this
    experiment)
  • Explain what each term (variable) means in the
    MLR model.
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