For determination of mode and median graphically, one considers:
In the construction of cost of living index, commodities are selected by :
If x and y are uncorrelated variables then this implies :
In simple random sampling of n units from a population of N units the quantity [1 (n/N)] is called the
The coefficient of range of the weights of 10 students from the following data:
41,20,15,65,73,84,53,35,71,55 is
Consider simple random sampling with replacement from a population of size N. The number of samples of size n is
If a population consists of 10 units and SRSWOR is adopted, the probability of selecting a specified sample of 2 units is :
In drawing a sample of size n under SRSWR from a population of size N, the probability that a specified member is included in the chosen sample is
Suppose a person would earn Rs. 10,000 in base period. Suppose the cost of living index increases by 20over base period. Then the employers of that person increase his salary by Rs. 1500. Which of the following option is TRUE?
The correlation coefficient between two variables X and Y is 0.4. The correlation coefficient between 2X and (Y) will be :
Trace out the WRONG option from the following: (CLI= Cost of living index numbers)
Relationship between real wage and money wage is given by
When the collected data is grouped with reference to time, we have
In SRSWOR of size n from a population with N units if p is the proportion of sampled units having a given attribute, then unbiased estimate of V(p) is
Which type of sampling is one where only the first sample unit is selected at random and the remaining units are automatically selected in a definitesequence at equal spacing from one another. It is :
A random sample of size n is drawn from a population of size N by SRSWOR method. Then the standard error of sample mean will be zero if n is
The coefficient of correlation between two variables X and Y is 0.48. The covariance is 36. The variance of X is 16. The standard deviation of Y is :
If 4,5,6,6,6,6,6,6,6,7 be a random sample from a Poisson population with parameter λ, then an unbiased estimate of λ is :
There are 35 students in a hostel. If the number of students increases by 7, the expenses of the hostel increases by Rs. 42 per day while the averageexpenditure per head diminishes by Re. 1. The original expenditure of the hostel is:
If 4,5,6,6,6,6,6,6,6,7 be a random sample from a poisson population with parameter λ, then an unbased estimate of λ is :
There are 35 students in a hostel. If the number of students increases by 7, the expenses of the hostel increases by Rs. 42 per day while the average expenditure per head diminishes by Re. 1. The original expenditure of the hostel is:
Which of the following is a method of collection of primary data?
If the regression line of Y on X is Y =30 0.9X and the standard deviations are Sx = 2 and Sy = 9, then the value of the correlation coefficient rxy is :
A coin is tossed repeatedly until a head appears. If 'p' be the probability of getting a head in any toss and x be the number of tosses required to get the first head then which of the following statement is true:
Let x1,x2,....xn be a random sample of size n from N (µ , σ2) population where µ and σ are both unknown. For testing H0:µ = µ0 against H2:µ = µ1(±µ0) if one uses the test statistic
then H0 is rejected at level ∝
For a trivariate distribution, if the correlation coefficients are r12 = r13 = r23 = r, -1 < r < 1, then r12.3 is:
An observation is drawn from an experimental distribution with mean θ, if the observation is found to be 2, and we test H0 : θ>1 against H1 : θ>1 with level e-3 then
The average of 25 numbers is 36. If the average of first 13 numbers is 32 and that of the last 13 numbers is 39, then the 13th number is
In an analysis of variance problem involving 3 treatments and 10 observations per treatment, SSE= 399.6 The MSE for the analysis would be :
If six hand-writings were ranked by two judges in a competition and the rankings are as follows:
Then the value of Spearman's rank correlation coefficient is
In an ANOVA problem for oneway classified data, with three classes and three observations per class, if the F value is 1.5 and the total sum of squares is 18, then the mean square between classes is :
The mean and standard deviation (s.d.) of runs scored by three batsmen A,B and C in 9 consecutive matches are given below,
Considering coefficient of variations as the measure of consistency,
which of the following is correct:
In the analysis of twoway classified data if p and q are the number of levels of the two factors then an unbiased estimator for the error variance is given by
If a data set contains n paired values on two variables x(independent) and y(dependent), then their plot is called :
An ANOVA procedure is used for data obtained from five populations. Five samples were taken from the 5 populations each comprising of 20 observations. The degree of freedom associated with F is :
The data taken from the publication "sankhya" will be considered as :
Suppose rxy is the correlation coefficient between two variables X and Y where s.d.(X) = s.d.(Y). If θ is the angle between the two regression lines of Y on X and X on Y then :
Which of these statements on variation is INCORRECT?
In the oneway analysis of variance model with k factors, let MSE denote the mean sum of squares due to error, MST denote the mean sum of squares due to factors, MTS denote the mean total sum of squares. For testing and homogeneity of the factor means, the test statistic is
Suppose two distributions have the same mean, same standard deviation and are equally skewed, but the first distribution is more peaked than the other. This feature of the frequency distributions in which they are different are called :
In ANOVA for testing the equality of group means, one conducts
If P(A ∩ B) = 1/2, P(Ac ∩ Bc ) = 1/2 and 2P(A) = P(B) = p, then the value of p is :
Ratio to trend method for seasonal indices provide good results if:
In a class, there are 25 students whose average age decreases by 3 months when one student aged 22 years is replaced by a new student. The age of the new student is :
Based on results of 2 way ANOVA, the SSE was computed to be 139.4. If we ignore one of the factors and perform one way ANOVA using the same data, SSE will :
If the annual trend of production (Y) of a certain commodity in a factory with origin 2,000 and X unit = one year is Y= 148.8 + 7.2X Then the monthly trend equation is :
If A1 , A2 and A3 are three independent events with P(A1 ) = 1/3, P(A2 ) = 1/4 and P(A3 ) = 2/5, then the probability that exactly one of the events occurs is :
If the trend line with 2008 as origin is Y= 20.6 + 1.68X, then the trend line with 2004 as origin is :
Moments are statistical constants from which we can find the different features of a distribution. Which one of the following is INCORRECT ?
If the equation of exponential trend with 2004 as origin is Y= 20(1.5)x , Then equation of the exponential trend with 2006 as origin is :
A closet contains 8 pairs of shoes. If 4 shoes are chosen at random, then the probability that all the four shoes are of the same type (left or right) is :
Demand for seats in a university is at its highest in the fall; demand also trends to grow and fall off in 25 year waves. In time service forecasting, the former demand characteristic would be called_______ and the latter would be called ___________.
Fill up the blank: The secular trend is the part of time points where more or less regular and _______ is observed showing either the tendency of growth or decline.
Following histogram shows certain frequency distribution against class intervals.
In a multiplicative time series model, the seasonal indices computed by the ratiototrend method
For two equally likely, exhaustive and independent events A and B, P(A ∩ B) is :
To remove quadratic trend from an additive time series, differencing :
For four observations 1, 0, 1, 4, the measure of kurtosis equals
In multiplicative model of time series: Xt= Tt x St x Ct x It, where Tt , St , Ct , It are trend, seasonal, cyclical and irregular components, what can be said about the values of It?
Let A and B be the two possible outcomes of an experiment and suppose P(A) = 0.4, P(A U B) = 0.7 and P(B) = p, for what choice of p, A and B independent?
Consider the following time series data :
Fitting a straight-line, is the trend value for the year 1992 is :
If the arithmetic mean is 26.8 and the median is 27.9, then the mode is :
In time series analysis which source of variation can be estimated by the ratiototrend method:
The probability that a contractor gets a plumbing contract is 2/3 and the probability that he will not get an electric contract is 5/9. If the probability of getting at least one contract is 4/5, then the probability that he will get both the contracts is :
If a time series data is given below then find three yearly moving averages to find trend.
Which one of the options is correct:
If the actual values in time series from 2000 to 2006 are 77, 88, 94, 85, 91, 98 and 90 and the equation of the trend line with 2003 as origin is Y = 89 + 2X , then in case of multiplicative model, the trend eliminated values are :
A and B are two independent events in a given sample space and the probability that both A and B occur is 0.16 while the probability that neither occurs is 0.36, then P(A) and P(B), respectively are :
Link relatives in a time series remove the influence of :
The annual vehicles production (In lacs) in India is given in the pie chart.
If the annual production of motor cycle is 1.80 lacs, the annual production
Let E and F be two events with P(E ) > 0, P(F|E) = 0.3 and P(E ∩ Fc ) = 0.2. Then P(E) equals:
If the trend equation fitted from a data on production (y in kg) of a fertilizer factory is 26y = 5335 + 624t, where time(t) has unit 1 year. Then monthly increase in production of fertilisers (in kg) is:
The probability that an urn containing 5 balls contains only white balls if the first two balls drawn from it were found to be white is :
Suppose owing to increased prices, a consumer reduces consumption of all commodities by 10% compared to the previous year. If IL and IP are the Laspeyres' and Paasche's price indices for the current year with the previous year as base, then
The standard deviation of a distribution is 5. The value of the fourth central moment, in order that the distribution be mesokurtic, should be :
If 'I' represents a cost of living index, then the purchasing power of money is proportional to
The system of combining two or more overlapping series of index numbers to obtain a single continuous series is called
The formula for calculating an index number should be such that it gives the same ratio between one point of comparison and the other, no matter which of the two is taken as the base or putting it another way, the index number reckoned forward should be reciprocal of the one reckoned backwards' which test of consistency of index number is this ?
Event S and T are independent with P(S) < P(T), P(S ∩ T) = 6/25 and P(S|T) + P(T|S) = 1. Then P(S) is
Initially there are 9 workers, all being paid a uniform wage. Later a 10th worker is added whose wage rate is Rs 20 less than for the others. The average wage gets :
If L(p) and L(q) represent Laspeyres' index number for prices and quantities and P(p) and P(q) represents Paasche's index number for price and quantities then :
Let x be a random variable with probability mass function
ƒ(x) = k, |x|, if x = -2, 1, 3
=0, otherwise
where, K is a constant. Then the variance of x is :
For a frequency distribution of a variable x, mean = 32, median = 30. The distribution is :
It is known from past experience that in a certain plant there are on the average 4 industrial accidents per month. The probability that in a given month there will be less than 4 accidents is : (e4= 0.0183)
For a frequency distribution of a discrete variable, the diagram of less than type cumulative frequency is a
If a continuous random variable x has the probability density function
In a negatively skewed distribution
Let x ~ Binomial (5,0.6) and Y ~ Poisson (2) be independent. Then P(xy = 0) equals :
The mean and standard deviation of a variable x are 36 and 4 respectively. Then the mean and standard deviation of [50 (x/4)], respectively are :
The joint distribution of x and y is as follows
Then E(x|y=1) is :
If a variable has three values k, 0 and 3k with corresponding frequencies as 3k, 2k and k respectively, then the value of coefficient of skewness b1 is :
If x is a continuous random variable with p.d.f.
ƒ(x) = 1/√2∏ exp (-x2/2), -∞ < x < ∞
and y is defined as y = x+1, then E(y) equals:
If μr be the rth order centralmoment of a population μ0 , μ1 and μ2 are : (where, σ = standard deviation)