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發表 宇智波鼬 於 星期二 七月 10, 2007 4:02 pm

3.
If mp>p^2,then
acmp>b^2n^2
4(bn)^2=(ac+mp)^2=a^2c^2+m^2p^2+2acmp
So that, (ac)^2+(mp)^2<2b^2n^2.
but, (ac)^2+(mp)^2>=2acmb>2b^2n^2
-><-

發表 宇智波鼬 於 星期二 七月 10, 2007 3:32 pm

2. p^3+m^3=(p+m)(p^2-pm+m^2)=2
if p+m>2, then p^2-pm+m^2 must <1.
P^2+2pm+m^2>4,
1>p^2-pm+m^2>4-3pm=>pm>1
and p^2+m^2>=2pm => p^2-pm+m^2>=pm>1 -><-

4.
We assume those five numbers are a-2 a-1 a a+1 a+2
The sum of their squares are 5a^2+10
5a^2+10=2(mod4) (if a is an even number)
5a^2+10=3(mod4) (if a is an odd number).
But perfects squares =1or0(mod4) -><-

發表 danny 於 星期二 七月 10, 2007 12:43 pm

#ed_op#DIV#ed_cl##ed_op#DIV#ed_cl#1.a.#ed_op#/DIV#ed_cl##ed_op#DIV#ed_cl#a#ed_op#SUP#ed_cl#2#ed_op#/SUP#ed_cl#+b#ed_op#SUP#ed_cl#2#ed_op#/SUP#ed_cl#-c#ed_op#SUP#ed_cl#2#ed_op#/SUP#ed_cl#=0,ab≠0,(a#ed_op#SUP#ed_cl#2#ed_op#/SUP#ed_cl#+b#ed_op#SUP#ed_cl#2#ed_op#/SUP#ed_cl#-c#ed_op#SUP#ed_cl#2#ed_op#/SUP#ed_cl#)/2ab=cosC=0#ed_op#/DIV#ed_cl##ed_op#DIV#ed_cl#0&lt;C&lt;π,C=0.5π#ed_op#/DIV#ed_cl##ed_op#DIV#ed_cl#b.cosC=(a#ed_op#SUP#ed_cl#2#ed_op#/SUP#ed_cl#+b#ed_op#SUP#ed_cl#2#ed_op#/SUP#ed_cl#-c#ed_op#SUP#ed_cl#2#ed_op#/SUP#ed_cl#)/2ab=(ca#ed_op#SUP#ed_cl#2#ed_op#/SUP#ed_cl#+cb#ed_op#SUP#ed_cl#2#ed_op#/SUP#ed_cl#-c#ed_op#SUP#ed_cl#3#ed_op#/SUP#ed_cl#)/2abc=(ca#ed_op#SUP#ed_cl#2#ed_op#/SUP#ed_cl#+cb#ed_op#SUP#ed_cl#2#ed_op#/SUP#ed_cl#-a#ed_op#SUP#ed_cl#3#ed_op#/SUP#ed_cl#-b#ed_op#SUP#ed_cl#3#ed_op#/SUP#ed_cl#)/2abc#ed_op#/DIV#ed_cl##ed_op#DIV#ed_cl#=[a#ed_op#SUP#ed_cl#2#ed_op#/SUP#ed_cl#(1-a/c)+b#ed_op#SUP#ed_cl#2#ed_op#/SUP#ed_cl#(1-b/c)]/2ab&gt;0#ed_op#/DIV#ed_cl##ed_op#DIV#ed_cl#cosC&gt;0,0&lt;C&lt;π,0&lt;cosC&lt;0.5π#ed_op#/DIV#ed_cl##ed_op#/DIV#ed_cl##ed_op#DIV#ed_cl##ed_op#/DIV#ed_cl#

[問題]Prove

發表 訪客 於 星期四 十月 13, 2005 6:14 pm

1.prove that in triangle ABC..
  a.if a^2+b^2=c^2, then angle C = 90 degree
  b.if a^3+b^3=c^3, then angle C is less than 90 degree
2.Given that p, m are real number and p^3+m^3=2.Prove that p+m is less  than or equal to 2
3.Given that a,b,c,m,n,p are real number and ap+cm=2bn,ac is greater than b^2. Prove that mp-n^2 is less than or equal to 0.
4.Prove that the sum of the squares of any five consecutive natural numbers cannot be a prefect square.