Prove that #1^99+2^99+3^99+4^99+5^99# is divisble by 5.?

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Answer 1 · 2018-07-28T01:54:12

See proof below

#1=1\mod 5#

#1^{99}=1^99\mod 5#

#1^{99}=1\mod 5#

Similarly,

#2^{99}=2^{99}\mod 5#

#3^{99}=(-2)^99\mod 5#

#4^{99}=(-1)^99\mod 5#

#5^{99}=0\mod 5#

#\therefore 1^99+2^99+3^99+4^99+5^99#

#=(1+2^99+(-2)^99+(-1)^99+0)\ mod 5#

#=(1+2^99-2^99-1)\ mod 5#

#=0\ mod 5#

hence the given number is divisible by #5#

Answer 2 · 2018-07-28T03:16:03

We Know by divisibility rule that #a^n+b^n# is divisible by #a+b# when #n# is odd. Since inserting #a=-b# the value of #a^n+b^n= (-b)^n+b^n=0#

For similar reason in our problem

#1^99+4^99# is divisible by #1+4=5#

Again #2^99+3^99# is divisible by #2+3=5#

And #5^99# is divisible by #5#

Hence the sum #1^99+2^99+3^99+4^99+5^99# must be divisible by #5#