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Topic: Re: a tendency, however!

Hello, Kodt, you wrote: If to consider a constant tendency how many deer will fall from a breakaway during the following, well we tell, 5 minutes? 8+16+32+64+128=248?

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Re: Re: a tendency, however!

Hello, Kodt, you wrote: If to consider a constant tendency how many deer will fall from a breakaway during the following, well we tell, 5 minutes? At all. All deer already fell.

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Re: Re: a tendency, however!

It is easy to note that the enumerated numbers satisfy to following property: these are such natural n for which (35*10^n-11)/3 is a prime number. From here the answer: 1, 2, 4, 5, 6, 7, 14, 21

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Re: Re: a tendency, however!

Hello, Kodt, you wrote: If to consider a constant tendency how many deer will fall from a breakaway during the following, well we tell, 5 minutes? The boy fell from 4 steps and broke a foot. How many feet the boy if falls from 40 steps breaks?

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Re: Re: a tendency, however!

Hello, deniok, you wrote: D> it is easy to note that the enumerated numbers satisfy to following property: these are such natural n for which (35*10^n-11)/3 is a prime number. From here the answer: D> 1, 2, 4, 5, 6, 7, 14, 21 And still numbers satisfy the infinite dispersing sequence f (n) = 2 ^ (n mod 3). From here the answer: 1, 2, 4, 1, 2, 4, 1, 2, 4, 1, 2, 4...

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Re: Re: a tendency, however!

Hello, Kodt, you wrote: If to consider a constant tendency how many deer will fall from a breakaway during the following, well we tell, 5 minutes? There is no near a river Anadyr of such breakaways from which the deer will fall within 5 minutes (unless a deer inflatable and it is pumped up by helium but then he cannot run up and jump off => tendency violation)

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Re: Re: a tendency, however!

Hello, kov_serg, you wrote: _> the Boy fell from 4 steps and broke a foot. How many feet the boy if falls from 40 steps breaks? It breaks a neck.

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Re: Re: a tendency, however!

Hello, Kodt, you wrote: (speed - the first derivative, acceleration - the second, a tendency - however, the third) it is original. Never heard such determination of a tendency. Then it turns out that the formula for number fallen from zero till n th minute S n=n (n+1)/2 + n (n-1) (n-2)/6. Also it is necessary to count S 8 - S 3. Number laziness to consider.

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Re: Re: a tendency, however!