Pooling multiple demands by either geography or product type allows a statistica

Question

Pooling multiple demands by either geography or product type allows a statistical reduction in variance. For the following five products with:

the combined product has the probability distribution with mean = (sum of other means) and variance = (sum of variances). What is the coefficient of variation of the combined product to two decimal places? How does it compare to the individual products?

Name Average Std. Dev. CV = (sigma/mu) Variance… A123 100 25 0.25 625 B345 100 50 0.50 2500 C345 200 70 0.35 4900 D235 150 30 0.20 900 E324 80 20 0.25 400

Explanation / Answer

Product            Mean              Variance

A123              100                       625

B345              100                       2500

C345             200               4900

D235 150 900

E324 80 400

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Total 630 9325

Combined product mean = 630

Combined product variance = 9325

So, combined product SD = 96.5660

The coefficient of variation of the combined product = (96.5660/630) = 0.1533

It is noted that the coefficient of variation of the combined product is less than the five products.

The combined product is more precise than the five products.

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