У 2 друзей было 16 солдатиков.если один отдаст другому 1 солдатика.то у них станет одинаковое

Solving the Problem

To solve the problem, we can use algebra to represent the given information and then solve for the number of soldiers each friend originally had.

Let's assume: - Friend 1 originally had x soldiers. - Friend 2 originally had y soldiers.

According to the given information, if one friend gives the other one soldier, they will have an equal number of soldiers. This can be represented by the equation: x - 1 = y + 1

Solving for x and y will give us the original number of soldiers each friend had.

Solving for x and y

Subtracting 1 from both sides of the equation gives: x = y + 2

Now we can substitute x with y + 2 in the equation to solve for y: (y + 2) - 1 = y + 1

Solving for y: y + 1 = y + 1

This equation shows that y can be any number, as long as x is 2 more than y.

So, the original number of soldiers for each friend can be represented as: - Friend 1: y + 2 - Friend 2: y

This means that the original number of soldiers for each friend can be any pair of numbers where one is 2 more than the other.

Therefore, there are multiple solutions for the original number of soldiers for each friend.

I hope this helps! If you have any other questions, feel free to ask.

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