C2 Varinat 20 termech from the reshebnik Yablonsky A.A. 1978

Using the workbook of Yablonsky A.A. 1978 in theoretical mechanics, we present the solution to problem C2 option 20 on the topic “Determination of the reaction of supports of a solid body” (p. 12 in the collection).

To determine the reaction of the supports of a rigid body in this problem, it is necessary to consider the equilibrium of the body on the supports. First, we select a support point A and draw up equilibrium equations for the body relative to this point. Then we select the fulcrum B and draw up similar equations.

For the fulcrum A, the equilibrium equations have the following form:

ΣF_x = 0: R_Ax - F = 0, ΣF_y = 0: R_Ay - N = 0, ΣM_A = 0: -F * a + N * b - M = 0,

where R_Ax and R_Ay are the reactions of support A along the x and y axes, respectively, N is the reaction force of support B, F is the force acting on the body, M is the moment of force acting on the body relative to the support point A, and a and b are the distances from support point A to the point of application of force F and to the point of application of force N, respectively.

For fulcrum B, the equilibrium equations have the following form:

ΣF_x = 0: R_Bx = 0, ΣF_y = 0: R_By - N - F = 0, ΣM_B = 0: -N * c - F * d = 0,

where R_Bx and R_By are the reaction of support B along the x and y axes, respectively, and c and d are the distances from the point of support B to the point of application of force N and to the point of application of force F, respectively.

By solving a system of equations, it is possible to determine the reactions of the supports of a solid body.

We present to your attention the digital product "C2 Option 20 termech from the reshebnik Yablonsky A.A. 1978." in theoretical mechanics. This product is a solution to a specific problem from A.A. Yablonsky’s solution book. in theoretical mechanics, namely, determining the reaction of the supports of a solid body.

We present to your attention a beautifully designed html document that contains a detailed solution to this problem, consisting of a system of equilibrium equations for determining the reactions of the supports of a solid body.

By purchasing this digital product, you get the opportunity to quickly and conveniently familiarize yourself with the solution to the problem and use it for your educational purposes. The product is designed in an attractive style, making it pleasant and easy to read.

The description of the product "C2 Option 20 termekh from the reshebnik Yablonsky A.A. 1978" is as follows:

This product is a solution to a specific problem from A.A. Yablonsky’s solution book. in theoretical mechanics. Problem C2 option 20 on the topic “Determination of the reaction of the supports of a rigid body” is solved using a system of equilibrium equations for determining the reactions of the supports of a rigid body. The solution to the problem is contained in a beautifully designed html document.

After payment, you will have access to a solution to the problem, which is written in a clear, legible handwriting of a teacher with 22 years of experience and tested for 17 years in one of the universities of the Russian Federation and for more than seven years on the Internet throughout the country.

This digital product will be useful to students and teachers who are engaged in theoretical mechanics and are looking for solutions to problems for their educational purposes. The solution is designed in an attractive style, making it pleasant and easy to read. If you like the work, you can leave a positive review by clicking on the unique link that you will receive after payment.

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This product is a solution to problem C2 option 20 in theoretical mechanics, from a unique workbook for the collection edited by A.A. Yablonsky 1978 edition. The work was carried out by an experienced teacher with 22 years of experience and tested for 17 years in one of the universities of the Russian Federation and for more than seven years on the Internet throughout the country. The solution to the problem is based on the topic “Determination of the reaction of supports of a rigid body” and is located on page 12 in the collection. After payment, the product will be available for download. If you liked the work, please leave a positive review by clicking on the unique link that you will receive after payment.

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