n=10, mean =10, variance =2.
So ∑xi=100 and ∑xi2=10(2+100)=1020.
After replacing α by β:
new mean =10.1⇒∑xi−α+β=101⇒β−α=1
New variance =1.99⇒10∑xi2−α2+β2−(10.1)2=1.99
∑xi2−α2+β2=10(1.99+102.01)=1040
β2−α2=1040−1020=20
(β−α)(β+α)=20⇒1⋅(α+β)=20
α+β=20