There are two common types of periodical cicadas. The most prevalent is the 17 -year cicada, for which a brood of nymphs emerges from the ground to breed and lay eggs after a 17 -year underground wait. The 13 -year cicada has a similar life cycle, but with a 13 -year interval between one emergence and the next. Studies show that having a prime-number interval, such as 13 or 17 , offers evolutionary advantages to each species. In particular, there is less interference between the two species when they live in the same region. (a) If broods of 13 -and 17 -year species happened to emerge in the same year, how many years will pass before this interference is repeated? (b) Suppose, hypothetically, that there exist 12 - and 18 -year species of cicadas. If both species happened to emerge the same year, in how many years will they interfere with one another again? (a) Before the interference is repeated,
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the broods of 13- and 17-year cicadas will coincide every 221 years. This is calculated by finding the least common multiple (LCM) of the two cycles: LCM(13, 17) = 13 * 17 = 221, since both numbers are prime and share no common factors. Imagine a vibrant symphony of cicadas singing together, only to go silent for over two centuries before their harmonious emergence sparks again! (b) For the hypothetical 12- and 18-year cicadas, they will interfere again in 36 years. This is because their life cycles share factors, and the LCM(12, 18) determines the next overlap. The prime factorization of 12 is 2² × 3 and for 18, it’s 2 × 3². Taking the highest powers of each, 2² and 3², leads us to 36. Picture those cicadas buzzing around after their long slumbers, stirring up a commotion once again in just 36 years!
