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Amity Semester 1st Solved Assignment for Quantitative Techniques in Management |
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| Service Type | Assignment |
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| Semester | |
| Short Name or Subject Code | Quantitative Techniques in Management |
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| Pattern | Section A,B,C Wise |
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Quantitative Techniques in Management
Assignment A
1. What do you understand by a Linear Programming Problem? What are its limitations? Discuss briefly the applications of linear programming in any functional area of management.
2. Solve the following transportation problem for optimal solution.
W1 W2 W3 W4 W5 quantity
P1 20 28 32 55 70 50
P2 48 36 40 44 25 100
P3 35 35 22 45 48 150
Demand 100 70 50 40 40
3. What is the Hungarian method for the assingnment problem?
4. What do you mean by correlation? Explain various type of correlation with the help of examples.
5. What is the probability of getting a sum 'FOUR' when two dice are thrown.
6. Discuss various components of time series with the help of examples.
7. For the given of a random variable x and associated probabilities ( given in rows 1 and 2 of the following table ) work out the variance and standard deviation
X 2 3 4 5 6 7 8 9 10 Total
P(x) .05 .10 .30 .20 .05 .10 .05 .10 .05 1.00
Assignment B
Case Detail:
The length of life of an instrument produced by a machine has a normal ditribution with a mean of 14 months and standard deviation of 2.5 months. Find the probability that an instrument produced by this machine will last
Que 1 between 10 to 14 months
Que 2. Less than 10 months
Que 3. More than 10 months
Ans.
Assignment C
Que 1
Scatter diagram is also called _________________
Options
Correlation graph
Dot Chart
Zero correlation
None of these
Que. 2.
Correlation can be ____________________________________________
Options
Positive only
Positive or negative
Negative only
None of these
Que 3
In correlation analysis, P.E. = ________________. x 0.6745
Options
Standard Error
Probable Error
Correlation analysis
None of these
Que. 4
________________________________________
Regression lines are also called ________________________.
Options
Correlation graph
Scatter diagram
Estimating lines
None of these
Que. 5
The arithmetic mean of bxy and byx is ____________________________.
Options
Equal to 1
Equal to 2
Greater than r
Less than r
Que 6.
____________________________. refers to the chance of happening or not happening of an event.
Options
Regression
Probability
Correlation
None of these
Que 7
An event whose occurrence is impossible, is called ______________________
Options
Sure event
Impossible event
Uncertain event
None of these
Que 8
If two events, A and B are not mutually exclusive, the P(AUB) = __________________
Options
P(A) + P(B)
P(A) + P(B) - P(A and B)
P(A) + P(B) + P(A and B)
None of these
Que 9
The definition of priori probability was originally given by ____________________________
Options
De-Moivre
Laplace
Pierre de Fermat
James bernoulli
Que.10
Three dies are thrown, probability of getting a sum of 3 is ____________________.
Options
3/216
(2/3)
(3/36)
1/216
Question No. 11 Marks - 10
Binomial distribution is a ________________________________ probability distribution
Options
Discrete
Continuous
Continuous distribution
None of these
Question No. 12 Marks - 10
When probability is revised on the basis of all the available information, it is called ____________.
Options
Priori probability
Continuous
Posterior probability
None of these
Question No. 13 Marks - 10
The height of persons in a country is a ________________________. random variable.
Options
Discrete
Continuous
Discrete as well as continuous
None of these
Question No. 14 Marks - 10
For a binomial distribution with probability p of a success and of q of a failure, the relation between mean and variance is ____________________________.
Options
Mean is greater than variance
Mean is less than variance
Mean is equal than variance
Mean is greater than or equal to variance
Question No. 15 Marks - 10
In a binomial distribution, if n =8 and p = 1/3,then variance = ________________________
Options
(16/9)
(8/3)
48/3
64/3
Question No. 16 Marks - 10
Poisson distribution is the limiting form of ______________________________.
Options
Poisson
Binomial distribution
Normal distribution
None of these
Question No. 17 Marks - 10
Poisson distribution is a ____________________________probability distribution.
Options
Discrete
Continuous
Poisson
None of these
Question No. 18 Marks - 10
In Poisson distribution, the value of ‘e’ = __________________________
Options
282
718
1.718
2.718
Question No. 19 Marks - 10
Mean and variance of Poisson distribution is equal to ______________________________.
Options
nq
e
m
npq
Question No. 20 Marks - 10
__________________________.distribution gives a normal bell shaped curve.
Options
Poison
Binomial
Normal
None of These
Question No. 21 Marks - 10
The height of normal curve is at its maximum at the ______________________.
Options
Mean
Mode
Medain
None of these
Question No. 22 Marks - 10
Normal distribution is ______________________
Options
Continuous
Unimodal
Symmetrical
All of these
Question No. 23 Marks - 10
An approximate relation between MD about mean and SD of a normal distribution is
Options
5MD = 4 SD
3MD = 3 SD
3MD = 2 SD
4MD = 5 SD
Question No. 24 Marks - 10
In a ________________________. distribution, quartiles are equi-distant from median
Options
Poison
Normal
Binomial
None of These
Question No. 25 Marks - 10
A normal distribution requires two parameters, namely the mean and ______________
Options
Standard deviation
mean deviation
Mode
Medain
Question No. 26 Marks - 10
Mean ± 2 S.D. covers ______________.% area of normal curve.
Options
95.45
98.73
68.27
95.54
Question No. 27 Marks - 10
A __________________________ is a function of sample values.
Options
Statistic
Parameter
Population
None of these
Question No. 28 Marks - 10
Test of hypothesis and ________________________ are the two branches of statistical inference
Options
Probability
Statistical analysis
Estimation
None of these
Question No. 29 Marks - 10
Quartile deviation of normal distribution is equal to ____________________
Options
2/3 S.D.
4/5 S.D.
3/4 S.D.
1 S.D.
Question No. 30 Marks - 10
Type I error is denoted by the symbol ________________________________.
Options
Alpha
Beta
Gramma
None of these
Question No. 31 Marks - 10
A sample is treated as large sample when its sample size is ____________________________
Options
More than 30
More than 100
More than 20
More than 50
Question No. 32 Marks - 10
Degrees of freedom for Chi-square in case of contingency table of (4x3) order are __________________.
Options
6
7
8
9
Question No. 33 Marks - 10
By test of significance, we mean ____________________________
Options
A significant procedure in statistics
A method of making a significant statement
A rule of accepting or rejecting hypothesis
A significant estimation problem
Question No. 34 Marks - 10
When sample is small, ________________________ test is applied.
Options
z- test
y- test
test
t- test
Question No. 35 Marks - 10
Who developed F-test?
Options
R.A. Fischer
Karl Pearson
James Bernoulli
Charles Babage
Question No. 36 Marks - 10
Chi-square test was developed by __________________
Options
R.A. Fischer
Karl Pearson
William Gosset
James Bernoulli
Question No. 37 Marks - 10
In a normal curve, the significance level is usually termed as ______________________region
Options
Acceptance region
Critical region
Level of acceptance
None of these
Question No. 38 Marks - 10
Chi-square test was first used by____________________________
Options
R.A. Fischer
Karl Pearson
William Gosset
James Bernoulli
Question No. 39 Marks - 10
If two samples of size 9 and 11 have means 6.8 and 8.8, and variance 36 and 25 respectively, then value of t = ____________________.
Options
0.79
1.79`
2.79
None of these
Question No. 40 Marks - 10
In one way ANOVA, the variances are ______________________
Options
Between samples
Within samples
Both 1&2 options
Neither 1 nor 2 option