If the mean of the set of numbers x1, x2, x3, ldots, xn is barx, then the mean of the numbers xi+2 i, 1 ≤ i ≤ n is

Question

If the mean of the set of numbers x1, x2, x3, ldots, xn is barx, then the mean of the numbers xi+2 i, 1 ≤ i ≤ n is (A)  barx+2 n (B)  barx+n+1 (C)  barx+2 (D)  barx+n

Tardigrade Admin · Accepted Answer

We know that barx=( displaystyle∑i=1n xi/n) ⇒ displaystyle∑i=1n xi=n barx ∴ ( displaystyle∑i=1n(xi+2 i)/n)=( displaystyle∑i=1n xi+2 displaystyle∑i=1n i/n)=(n barx+2(1+2+ ldots n)/n) =(n barx+2 (n(n+1)/2)/n) = barx+(n+1)

Q. If the mean of the set of numbers $x_{1}, x_{2}, x_{3}, \dots, x_{n}$ is $\overset{x}{ˉ}$ , then the mean of the numbers $x_{i} + 2 i, 1 \leq i \leq n$ is

$\overset{x}{ˉ} + 2 n$

$\overset{x}{ˉ} + n + 1$

$\overset{x}{ˉ} + 2$

$\overset{x}{ˉ} + n$

Q. If the mean of the set of numbers x1​,x2​,x3​,…,xn​ is xˉ, then the mean of the numbers xi​+2i,1≤i≤n is

xˉ+2n

xˉ+n+1

xˉ+2

xˉ+n

We know that xˉ=ni=1∑n​xi​​ ⇒i=1∑n​xi​=nxˉ ∴ni=1∑n​(xi​+2i)​=ni=1∑n​xi​+2i=1∑n​i​=nnxˉ+2(1+2+…n)​ =nnxˉ+22n(n+1)​​ =xˉ+(n+1)

Q. If the mean of the set of numbers $x_{1}, x_{2}, x_{3}, \dots, x_{n}$ is $\overset{x}{ˉ}$ , then the mean of the numbers $x_{i} + 2 i, 1 \leq i \leq n$ is

$\overset{x}{ˉ} + 2 n$

$\overset{x}{ˉ} + n + 1$

$\overset{x}{ˉ} + 2$

$\overset{x}{ˉ} + n$