The failure density function of a random variable T is given by
$f(t) = left{egin{matrix} 0.011e^{-0.01t}, & tgeq 0 \ 0, & otherwise end{matrix}ight.$
Calculate, the
i) reliability of the component.
ii) reliability of the component for a 100 hour mission time.
iii) mean time to failure (MTTF).
iv) median of the random variable T.
v) life of the component, if the reliability of 0.96 is desired.

Posted on : 2023-02-14 13:12:41 | Author : IGNOU Academy | View : 102

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The failure density function of a random variable T is given by:

f(t) = { 0.011e^(-0.01t), t >= 0
{ 0, otherwise

i) The reliability of the component is given by the survival function:

R(t) = P(T > t) = ∫f(t)dt from t to infinity
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_________ ___ __________ __ _____ __ _____ ____ _______ ___ __________ __________ ________.
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_____________ __ __ _____________ _________ ____ __________ ____________ _____ ________.
___________ _____ ___ _________ ________ _____ ___ ________ ____________ _____ ___.
________ ___________ _______ __________ _______ _______ _____ _____.
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________ ________ __ ____ _____________ _________ ____ ___________ ____________.
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___ _______ _______ ________ ______ ________ ________ _____________ ___ ____ _____________ ____________ ________ _____.
____ ___________ _____________ _____________ _____________ ______ ____________ __________ ___ _______ _________ _____________ ____ __________.
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Degree : PG DIPLOMA PROGRAMMES
Course Name : Post Graduate Diploma in Applied Statistics
Course Code : PGDAST
Subject Name : Industrial Statistics-I
Subject Code : MSTE 1
Year : 2023

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Related Question

State whether the following statements are True or False. Give reason in support of your answer.
a) If the average number of defects in an item is 4, the upper control limit of the c-chart will be 12.
b) The specification limits and natural tolerance limits are same in statistical quality control.
c) If the probability of making a decision about acceptance or rejection of a lot on the first sample is 0.80 and the sizes of the first and second samples are 10 and 15, respectively, then
the average sample number for the double sampling plan will be 25.
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To monitor the manufacturing process of mobile phones, a quality controller randomly selected 100 mobile phones from the production line, each day over 15 days. The mobile phones were inspected for defectives and the number of defective mobile phones found each day was recorded. The data are given below:

Subgroup Number	Number of Mobile Phones Inspected	Number of Defective Mobile Phones
1	100	3
2	100	6
3	100	4
4	100	6
5	100	20
6	100	2
7	100	6
8	100	7
9	100	3
10	100	0
11	100	6
12	100	15
13	100	5
14	100	7
15	100	6

i) Determine the trial centre line and control limits for the fraction defective using the above data.

ii) Contract the control chart on graph paper and determine that the process is stable or not. If there is any out-of-control point, determine the revised centre line and control limits.

Solve the two-person zero-sum game having the following payoff matrix for player A

		Player B
		B₁	B₂	B₃	B₄	B₅
Player A	A₁	3	4	5	–2	3
Player A	A₂	1	6	–3	3	7

The system shown below is made up of ten components. Components 3, 4 and 5 are not identical and at least one component of this group must be available for system success. Components 8, 9 and 10 are identical and for this particular group it is necessary that two out of the three components functions

What is the system reliability if R₁= R ₃= R ₅= R ₇= R ₉= 0.85 and
R ₂= R ₄= R ₆= R ₈= R₁₀= 0.95

The failure density function of a random variable T is given by
$f(t) = left{egin{matrix} 0.011e^{-0.01t}, & tgeq 0 \ 0, & otherwise end{matrix}ight.$
Calculate, the
i) reliability of the component.
ii) reliability of the component for a 100 hour mission time.
iii) mean time to failure (MTTF).
iv) median of the random variable T.
v) life of the component, if the reliability of 0.96 is desired.

The failure data of 10 electronic components are shown in the table given below:

Failure Number			1	2	3	4	5		6	7		8	9	10
Operating Time (in hours)			3	5	31	51	76		116	140		182	250	302

Estimate, the
i) reliability.
ii) cumulative failure distribution.
iii) failure density.
iv) failure rate functions.

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