Unbiased estimator for The exponential

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Looking at obtaining the unbiased estimator of σ^2, i know how to do it for σ, to obtain
1/x(bar), was wondering how to obtain for σ^2, i guess you just don't square bot sides. It should tale the form of kƩ(x_i)^2.
many thanks any help would be much appreciated.
 
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srhjnmrg said:
Looking at obtaining the unbiased estimator of σ^2, i know how to do it for σ, to obtain
1/x(bar), was wondering how to obtain for σ^2, i guess you just don't square bot sides. It should tale the form of kƩ(x_i)^2.
many thanks any help would be much appreciated.

Note, the rate parameter estimate is [itex]\hat \lambda = 1/\bar x[/itex]. The mean is therefore [itex]1/\lambda[/itex] and the variance is [itex]1/\lambda^2[/itex]. The standard deviation is not really defined for the exponential distribution because it is not symmetrical around the mean. The usual maximum likelihood estimate of the mean [itex]\bar x = (\sum_{i=1}^{i=n} x_i)/n[/itex] is unbiased, and therefore so is the estimate of lambda.
 
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