If the mean of the set of numbers `x,_(1),x_(2),... x_(n)` is `barx`, then the mean of the numbers `x_(i)+2i ,1 le i le n` is

If the number of terms in (x + 2+ (1)/(x))^(n) (n in I ^(+) " is " 401 , then n is greater then

If barx represents the mean of n observations x_1, x_2,…….,x_n , then value of sum_(i=1)^n (x_1-barx) is :

If barx is the mean of x1, x2,x2,x3, ………..xn , then the mean of x1+a,x2+a, x3+a...xn+a

The mean of n observations x_1,x_2,…………..x_n is barx . If (p+q) is added to each observations then prove that the mean of the new set of observations is barx+(p+q) .

The probability that the roots of the equation x^(2)+nx +(n+1)/2 are real where n in N (N set of natural numbers ) and n le 5 is :

The mean of x_i and x_2 is M_1 and that of x_1,x_2,x_3,x_4 is M_2 . Then the mean of ax_1,x_3/a,x_4/a is

Statement-1 The number of terms in the expansion of (x + (1)/(x) + 1)^(n) " is " (2n +1) Statement-2 The number of terms in the expansion of (x_(1) + x_(2) + x_(3) + …+ x_(m))^(n) "is " ^(n + m -1)C_(m-1) .

Let barx be the mean of x_1,x_2,……,x_n and bary the mean of y_1,y_2……,y_n barz is the mean of x_1,x_2,…. ,x_n, y_1, y_2 is equal to :