math,help

Is it the same thing :

fibonacci math and the golden mean?

for one i know that this type of math deals with sequences but can someone explian to me briefly the differnces and similarities.

http://en.wikipedia.org/wiki/Golden_ratio

  1. 👍
  2. 👎
  3. 👁

Respond to this Question

First Name

Your Response

Similar Questions

  1. Art

    Modern artist use rules that were developed in recent decades in order to produce realistic-looking structures in their drawings. -True*** -False Objectives and figures that are drawn with correct proportions have a sense of order

  2. Algebra

    The ratio of the length to the width of a golden rectangle is (1 + √(5):2:.The dimensions of a garden form a golden rectangle. The width of the garden is 12 feet. Find the length L of the garden. Round your answer to the nearest

  3. ELA

    Use the excerpt from “The Goose and the Golden Egg” to answer the question. There was once a Countryman who possessed the most wonderful Goose you can imagine, for every day when he visited the nest, the Goose had laid a

  4. Art

    During which time period were artists keenly interested in using the golden ratio in their paintings? A.Baroque Period B.Oriental Period C.Futuristic Period D.Renaissance Period When the Greeks built the Parthenon its dimensions

  1. english

    At the end of "The New Colossus," the statue says, "I lift my lamp beside the golden door!" What is "the golden door"?

  2. algebra

    A room is approximately shaped like a golden rectangle. Its length is 21 ft. What is the​ room's width? Write your answer in simplified radical form and rounded to the nearest tenth of a foot. Note that the ratio of the length

  3. How to get quick responses to your math questions

    Math is a wide subject, ranging from K to 11, college and university. Then there is algebra, trigonometry, geometry, arithmetic, calculus, number theory, ... etc. Not all teachers answer all math questions (many do). If you would

  4. LNU math

    math In a class of 50 students it was found 21 are taking English 14 are taking Math 28 are taking History 7 are taking Math and English 10 are taking Math and History 11 are taking History and English 3 are taking all three

  1. Math

    How would I solve this part of the Fibonacci sequence piecewise function? f(n) = f(n-1)+f(n-2) if n > 1. Thanks

  2. greek philosophy and history

    Aristotle taught his students to follow the a. Golden Rule c. golden mean b. Golden Fleece d. none of these

  3. Maths

    A super-Fibonacci sequence is a list of whole numbers with the property that, from the third term onwards, every term is the sum of all the previous terms. For example, 1, 4, 5, 10, ... How many super-Fibonacci sequences with 1

  4. Math

    F25= 75,025 and F26= 121,393 where Fn is the nth term in the Fibonacci sequence. Find F27. I do not understand the Fibonacci sequence, could someone help me with my question and explain it to me please.

You can view more similar questions or ask a new question.