The mean of n items is `bar(x)`. If the first item is increased by n, second by `n-1` and so on and last by 1, then the new mean is

The mean of n items is overline(X) . If the first item is increased by 1, second by 2 and so on, then the new mean is

The mean of n observations is X . If the first item is increased by 1, second by 2 and so on, then the new mean is (a) X +n (b) X +n/2 (c) X +(n+1)/2 (d) None of these

The mean of n observation is barX . If the first observation is increased by 1^(2) , second by 2^(2) and so on, then the new mean is

The mean of 11 items overline(X) . If first item is increased by 1, second item by 2 and so on, then new mean becomes lamda more than overline(X) and lamda is

Mean of a set of numbers is bar(x) . If each number is increased by lambda , then the mean of new set is

The arithmetic mean of a set of observations is bar(X) . If each observation is divided by alpha and then is increased by 10, then the mean of the new series is

If each of n numbers x_(i)=i , is replaced by (i+1)x_(i) , then the new mean is

The AM of n numbers of a series is bar(X). If the sum of first (n-1) terms is k, then the n^(th) number is

The mean of the series x_1, x_2,...x_n is barX . If x_2 is replaced by lambda then the new mean is

Mean of a certain number of observations is x . If each observation is divided by m(m!=0) and increased by n , then the mean of new observation is (a) ( x )/m+n (b) ( x )/n+m (c) x +n/m (d) x +m/n