Question
The product of $n$ positive numbers is unity Then their sum is(a) a positive integer(b) divisible by $n$(c) equal to $n+\frac{1}{n}$(d) never less than $n$
Step 1
.., a_n$. We are given that the product of these numbers is equal to one, i.e., $a_1 \cdot a_2 \cdot a_3 \cdot ... \cdot a_n = 1$. Show more…
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