If you write the AP with a common denominator, we have $$\frac 7{420}, \frac 6{420},\frac 5{420},\frac 4{420},\frac 3{420},\frac 2{420}, \frac 1{420}$$ This motivates taking the common denominator to be $$\mathrm{lcm}(1,2,3,4,5,6,7,8) = 840$$The AP is $$\frac 8{840}, \frac 7{840}, \frac 6{840}, \frac 5{840}, \frac 4{840}, \frac 3{840}, \frac 2{840}, \frac 1{840} = \frac 1{105}, \frac1{120}, \frac 1{140}, \frac 1{168}, \frac 1{280}, \frac 1{420}, \frac 1{840}$$ Proof that there is no such infinite AP (apart from constant AP): Suppose there is. Then let the sequence of naturals be $a_1,a_2,a_3, \ldots$ such that their reciprocals are in an AP. Then either $a_1,a_2, \ldots $ is decreasing or increasing. If it is decreasing, then we have a contradiction as we can't have a strictly decreasing infinite sequence of natural numbers. So $a_1,a_2, \ldots$ are increasing. But then $\frac 1{a_1},\frac 1{a_2}, \ldots$ are decreasing (common difference $d$ is negative). However, then the AP can't have infinitely many positive terms, contradiction again.