412. Sislovesme | 1080p |

mutualPairs = 0 for i = 1 … N: j = love[i] if i < j and love[j] == i: mutualPairs += 1 print(mutualPairs)

From Lemma 1 every increment corresponds to a genuine mutual‑love pair. From Lemma 2 every genuine pair contributes exactly one increment. From Lemma 3 no non‑mutual pair contributes any increment. Therefore the total number of increments equals precisely the number of mutual‑love pairs. ∎ 412. Sislovesme

With over [insert number] followers across platforms, Sislovesme has become a household name, particularly among younger audiences. But what sets her apart from other creators, and how has she managed to build such a devoted fan base? mutualPairs = 0 for i = 1 …

Hence the algorithm increments mutualPairs . Therefore the total number of increments equals precisely

love[1 … N] // 1‑based indexing

As we reflect on the impact of Sislovesme, we're reminded that, in the digital age, influence extends far beyond mere numbers. It has the potential to inspire, uplift, and bring people together in meaningful ways. Whether you're a longtime fan or just discovering her content, Sislovesme's story serves as a reminder of the transformative potential of social media when used to share love, kindness, and positivity.

Both programs run in less than 0.1 s for the maximal input ( 10⁶ integers).