If the arithmetic mean of the numbers `x_1 , x_2, x_3,……., x_n` is `barx`, then the arithmetic mean of the numbers `ax_1 + b, ax_2 + b, ax_3 + b, ……, ax_n + b`, where a and b are two constants, would be:

If the arithmetic mean of the numbers x_(1),x_(2),x_(3),...,x_(n) is bar(x), then the arithmetic mean of the numbers ax_(1)+b,ax_(2)+b,ax_(3)+b,...,ax_(n)+b where a,b are two constants,would be

If sigma^2 is the variance of n observations x_1,x_2 ,…., x_n ,prove that the variance of n observations ax_1,ax_2 ,…, ax_n is a^2sigma^2 , where a ne 0

Given that barx is the mean and sigma^2 is the variance of n observations x_1,x_2 ,…., x_n . Prove that the mean and variance of the observations ax_1,ax_2 , .., ax_n , are abarx and a^2sigma^2 respectively (a ne 0) .

Let f(x) =ax^(2) -b|x| , where a and b are constants. Then at x = 0, f (x) is

If x is the mean of x_1, x_2, ..... ,x_n , then for a ne0 , the mean of ax_1, ax_2, .... ,ax_n,(x_1)/a,(x_2)/a,....,(x_n)/a is

If lim_(x to 0) (1+ax)^(b//x)=e^4 , where a and b are natural numbers then