Solution to problem 13.3.25 from the collection of Kepe O.E.

In the vertical plane, the material point M moves under the influence of gravity. The initial speed of the point is v0 = 600 m/s. It is necessary to find the maximum elevation height h in kilometers.

Answer:

The maximum height is reached at the moment when the speed of the point becomes zero. In order to find the time after which this will happen, we use the equation of motion:

h = v0*t - (g*t^2)/2,

where h is the maximum height, t is time, v0 is the initial velocity, g is the acceleration of gravity.

When the speed goes to zero:

v = v0 - g*t = 0,

from where time can be expressed as:

t = v0/g.

Substituting this time value into the equation for height, we get:

h = (v0^2)/(2*g) = 16.2 km.

Answer: h = 16.2 km.

Solution to problem 13.3.25 from the collection of Kepe O..

that digital product is a solution to problem 13.3.25 from the collection of problems in physics by Kepe O.. In this problem, a material point moves in a vertical plane under the influence of gravity, and it is necessary to find the maximum lifting height if at the initial moment the speed of the point is 600 m/ With.

The solution to the problem is presented in the form of an HTML page, designed in a modern style. It describes the solution process in detail and provides the necessary formulas and calculations. All information is presented in a convenient and easily understandable form.

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The digital product is a solution to problem 13.3.25 from the collection of problems in physics by Kepe O.?. In this problem, a material point moves in a vertical plane under the influence of gravity, and it is necessary to find the maximum lifting height if at the initial moment the speed of the point is 600 m/s. The solution to the problem is presented in the form of an HTML page, designed in a modern style. It describes the solution process in detail and provides the necessary formulas and calculations.

The maximum height is reached at the moment when the speed of the point becomes zero. In order to find the time after which this will happen, the equation of motion is used: h = v0t - (gt^2)/2, where h is the maximum height, t is time, v0 is the initial velocity, g is the acceleration of gravity. When the speed goes to zero: v = v0 - gt = 0, from which time can be expressed as t = v0/g. Substituting this time value into the equation for height, we obtain h = (v0^2)/(2g) = 16.2 km.

By purchasing this digital product, you will receive a complete and understandable solution to the problem, which will help you better understand the laws of physics and improve your knowledge in this field. All information is presented in a convenient and easily understandable form. Don't miss the opportunity to purchase a high-quality digital product and improve your knowledge of physics!

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Problem 13.3.25 from the collection of Kepe O.?. consists in determining the maximum height of rise of a material point M moving in a vertical plane under the influence of gravity. At the initial moment of time, the speed of the point is v0 = 600 m/s. To solve the problem, it is necessary to use the laws of dynamics and the equations of kinematics of motion of a material point. The answer to the problem is 16.2 km.

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