[See Solution] The lifetime (hours) of an electronic device is a random variable with the exponential probability density function: f(x)=(1)/(50) e^-x /
Question: The lifetime (hours) of an electronic device is a random variable with the exponential probability density function:
\[f(x)=\frac{1}{50} e^{-x / 50} \quad \text { for } x \geq 0\]- What is the mean lifetime of the device?
- What is the probability the device fails in the first 25 hours of operation?
- What is the probability the device operates 100 or more hours before failure?
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