If the integers m and n are chosen at ra...

If the integers m and n are chosen at random between 1 and 100, then the probability that a number of the form `7^m+7^n` is divisible by 5, equals

`(1)/(4)`

`(1)/(7)`

`(1)/(8)`

`(1)/(49)`

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The correct Answer is:

`7^1=7,7^2=49,7^3 = 343,7^4=2401…`
Therefore for `7^r, r in N` the number ends at unit place 7,9,3,1,7…
`therefore 7^m+7^n` will be divisible by 5 if it end at 5 or 0.
But it cannot end at 5
Also for end at 5.
For this m and n should be as follows

For any given value of m, there will be be 25 values of n Hence , the probability of the required event is
`(100xx 25)/(100xx100)=1/4`
Note:Power of prime numbers have cycclic numbers in their unit place.

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If the integers m and n are chosen at random between 1 and 100, then the probability that a number of the form `7^m+7^n` is divisible by 5, equals

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