In 2018, Luca and Patel conjectured that the largest perfect power representable as the sum of two Fibonacci numbers is 38642 = F₃₆ + F₁₂. In other words, they conjectured that the equation (∗) y^a = F_n + F_m has no solutions with a ≥ 2 and y^a > 3864² . While this is still an  open problem, there exist several partial results. For example, recently Kebli, Kihel, Larone and Luca proved an explicit upper bound for y a , which depends on the size of y. In this paper, we find an explicit upper bound for y a , which only depends on the Hamming weight of y  with respect to the Zeckendorf representation. More specifically, we prove the following: If y = F_n1 + · · · + F_nk and equation (∗) is  satisfied by y and some non-negative integers n, m and a ≥ 2, then y ^a ≤ exp C(ε) · k (^3+ε)^k2 . Here, ε > 0 can be chosen arbitrarily and  C(ε) is an effectively computable constant.