Answer to Question #116118 in Statistics and Probability for Vincent zokah

Question #116118

3. The lifetime of a machine is continuous on the interval (0, 40) with probability density
function f, where f(t) is proportional to (t + 10)) 2
, and t is the lifetime in years.
Calculate the probability that the lifetime of the machine part is less than 10 years.
Hint: Show that f(t) is legitimate and find the proportionality constant

Expert's answer

Let "c=const," then

"f(t) = \\begin{cases}\n c(t+10)^{-2} & 0\\leq t\\leq 40 \\\\\n 0 &otherwise\n\\end{cases}"

"1=\\displaystyle\\int_{-\\infin}^{\\infin}f(t)dt=\\displaystyle\\int_{0}^{40}{c\\over (t+10)^2}dt="

"=-c\\bigg[{1\\over t+10}\\bigg]\\begin{matrix}\n 40 \\\\\n 0\n\\end{matrix}=-c\\bigg({1\\over 40+10}-{1\\over 0+10}\\bigg)=0.08c"

"c=12.5"

"f(t) = \\begin{cases}\n 12.5(t+10)^{-2} & 0\\leq t\\leq 40 \\\\\n 0 &otherwise\n\\end{cases}"

Calculate the probability that the lifetime of the machine part is less than 10 years.

"P(T<10)=\\displaystyle\\int_{-\\infin}^{10}f(t)dt=\\displaystyle\\int_{0}^{10}{12.5\\over (t+10)^2}dt="

"=-12.5\\bigg[{1\\over t+10}\\bigg]\\begin{matrix}\n 10 \\\\\n 0\n\\end{matrix}=-12.5\\bigg({1\\over 10+10}-{1\\over 0+10}\\bigg)=0.625"

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Answer to Question #116118 in Statistics and Probability for Vincent zokah

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