Hidden Fibonacci and Golden Ratio: MIT Integration Bee (19)
Let's try to spot a hidden fibonacci sequence in the continued fraction and evaluate the integral by using the relationship between fibonacci and golden ratio.
Your support is truly a huge encouragement.
Please take a second to subscribe in order to send us your valuable support and receive notifications for new videos!
Every subscriber and like are immensely appreciated.
If you have any questions or ideas for improvement, feel free to comment them below!
2017 MIT Integration Bee Qualifier Test:
http://www.mit.edu/~same/pdf/qualifying_round_2017_test.pdf
Видео Hidden Fibonacci and Golden Ratio: MIT Integration Bee (19) канала LetsSolveMathProblems
Your support is truly a huge encouragement.
Please take a second to subscribe in order to send us your valuable support and receive notifications for new videos!
Every subscriber and like are immensely appreciated.
If you have any questions or ideas for improvement, feel free to comment them below!
2017 MIT Integration Bee Qualifier Test:
http://www.mit.edu/~same/pdf/qualifying_round_2017_test.pdf
Видео Hidden Fibonacci and Golden Ratio: MIT Integration Bee (19) канала LetsSolveMathProblems
Показать
Комментарии отсутствуют
Информация о видео
Другие видео канала
A Breathtaking Journey of IntegrationSolution 86: Double Factorial and Roots of Unity Filter (Proof)Can You Evaluate This Infinite Summation? (2018 AMC 12 A Problem 19)Tricky Natural Log Rule: MIT Integration Bee (12)Tricky x^1/2 and x^1/4: MIT Integration Bee (9)Impossible?3 Things You Should NEVER Do When Studying MathA Beautiful Double Factorial IdentityA Super Hero's Solution To A Challenging ProblemDouble Summation from Harvard-MIT Math Tournament (HMMT)Pentagons and the Golden Ratio - Numberphileintegration by partial fractions with an irreducible quadratic factorInfinite fractions and the most irrational numberEuler Substitution: MIT Integration Bee (3)Difficult but Fun Integration Question (1985 Putnam A5)Exploiting Symmetry: Integration Problem from 1987 Putnam B1Dirichlet Kernel: MIT Integration Bee (10)Get Your Popcorn Ready: MIT Integration Drama (16)Improper Integral of ln(sinx) from 0 to pi/2: MIT Integration Bee (4)