Prove that the following inequality is true
by using Mathematical Induction :
(a^n + b ^n) / 2 > [(a + b) / 2]^n
Assume n is a natural number (n ≧ 2)
and a > b > 0
數學挑戰題 (8) --- Mathematical Induction (10分)
2007-02-21 10:22 pm
回答 (1)
2007-02-21 10:50 pm
✔ 最佳答案
When n = 2, 圖片參考:http://i117.photobucket.com/albums/o61/billy_hywung/Maths/MIineq1.jpg
Therefore the inequality is true for n = 2.
Now, assuming that the inequality is true for n = k, where k is a positive integer ≧ 2, i.e.
圖片參考:http://i117.photobucket.com/albums/o61/billy_hywung/Maths/MIineq2.jpg
Here comes that the inequality is also true for n = k + 1.
By the first principle of M.I., the inequality is true for all positive integers n ≧ 2.
參考: My Maths knowledge
收錄日期: 2021-04-21 12:10:14
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