Difference between poisson and normal distribution with comparison chart
Answers
Answer
One difference is that in the Poisson distribution the variance = the mean. In a normal distribution, these are two separate parameters. The value of one tells you nothing about the other. So a Poisson distributed variable may look normal, but it won't quite behave the same.
✓✓✓✓✓✓✓✓✓✓✓✓✓✓✓✓✓
Hope it helpful for you ✌️ ✌️
Answer:
hey here is ur answer.....
The normal distribution is so ubiquitous in statistics that those of us who use a lot of statistics tend to forget it’s not always so common in actual data.
And since the normal distribution is continuous, many people describe all numerical variables as continuous. I get it: I’m guilty of using those terms interchangeably, too, but they’re not exactly the same.
Numerical variables can be either continuous or discrete.
The difference? Continuous variables can take any number within a range. Discrete variables can only be whole numbers.
So 3.04873658 is a possible value of a continuous variable, but not discrete.
Count variables, as the name implies, are frequencies of some event or state. Number of arrests, fish in a trap, wetlands in a forest are all counts. They’re numerical and discrete, not continuous.
Not only are they discrete, they can’t be negative. You can have 0 or 4 fish in the trap, but not -8.
This point is extremely important for statistical modeling. Count variables have a lower bound at 0 but no upper bound.
A normal distribution, on the other hand, has no bounds. Theoretically, any value from -∞ to ∞ is possible in a normal distribution.
Count variables tend to follow distributions like the Poisson or negative binomial, which can be derived as an extension of the Poisson. Both are discrete and bounded at 0.
Unlike a normal distribution, which is always symmetric, the basic shape of a Poisson distribution changes.
poisson
For example, a Poisson distribution with a low mean is highly skewed, with 0 as the mode. All the data are “pushed” up against 0, with a tail extending to the right. You can see an example in the upper left quadrant above