Solution to problem 16.1.14 from the collection of Kepe O.E.

Solution to problem 16.1.14 from the collection of Kepe O.?. is as follows: given a set of points on the plane, specified by their coordinates (x, y), as well as a point with coordinates (a, b). It is necessary to find a point from a given set that is closest to a given point (a, b).

To solve this problem, you can use the formula for the distance between two points on a plane:

d = sqrt((x1 - x2)^2 + (y1 - y2)^2)

where (x1, y1) and (x2, y2) are the coordinates of two points.

It is necessary to calculate the distance from each point from a given set to point (a, b) and select the one that is closest. This can be done using a loop that iterates through all the points in the set and stores the variable with the minimum distance.

As a result, the solution to problem 16.1.14 from the collection of Kepe O.?. consists of writing a program in a programming language that implements the described algorithm.

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Problem 16.1.14 from the collection of Kepe O.?. is formulated as follows:

"There are many points given in a plane. Find a pair of points with the maximum distance between them."

To solve this problem, it is necessary to find all possible combinations of points and for each of them calculate the distance between them. A pair of points with the maximum distance will be the solution to the problem.

To calculate the distance between two points you can use the formula:

d = sqrt((x2 - x1)^2 + (y2 - y1)^2)

where (x1, y1) and (x2, y2) are the coordinates of two points.

Thus, to solve the problem it is necessary to implement a program that will find all possible combinations of points, calculate the distance between them and find a pair of points with the maximum distance.

This product is a solution to problem 16.1.14 from the collection of Kepe O.?. in physics. The task is to determine the angular acceleration of rotation around the Oz axis of a homogeneous rod with a mass of 3 kg and a length of 1 m, which is acted upon by a pair of forces with a moment M2 = 2 N • m. It is necessary to calculate the value of this acceleration and provide the answer.

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