Mathematics, 07.10.2020 22:01 christopherluckey7
Consider the statement "every non trivial tree has exactly two leaves". The following is an attempted proof of the statement using induction on n, where n the number of vertices. Base case: n=2. The tree is a path, and has exactly two leaves. Inductive hypothesis: Assume that every tree on k vertices has exactly two leaves. Inductive step: Consider a tree T on k vertices. It has exactly two leaves. Add a vertex, make the new vertex adjacent to a leaf of T. Now the new tree has k+1 vertices, and has exactly two leaves. What is wrong with the proof?
Answers: 2
Another question on Mathematics
Mathematics, 21.06.2019 16:30
Diana is painting statues she has 7/8 of a liter of paint each statue requires 1/20 of a liter of paint how many statues can she paint?
Answers: 3
Mathematics, 21.06.2019 17:40
Aline has a slope of and a y-intercept of –2. what is the x-intercept of the line?
Answers: 1
Mathematics, 21.06.2019 20:00
Find the slope of the line passing through a pair of points
Answers: 2
Mathematics, 21.06.2019 20:00
Need ! the total ticket sales for a high school basketball game were $2,260. the ticket price for students were $2.25 less than the adult ticket price. the number of adult tickets sold was 230, and the number of student tickets sold was 180. what was the price of an adult ticket?
Answers: 1
You know the right answer?
Consider the statement "every non trivial tree has exactly two leaves". The following is an attempte...
Questions
Chemistry, 29.12.2021 19:00
SAT, 29.12.2021 19:00
Computers and Technology, 29.12.2021 19:00
Mathematics, 29.12.2021 19:00
Chemistry, 29.12.2021 19:00
Mathematics, 29.12.2021 19:00
Health, 29.12.2021 19:00
English, 29.12.2021 19:00
Engineering, 29.12.2021 19:00
Business, 29.12.2021 19:00
Physics, 29.12.2021 19:00
