Solution of problem 2.4.8 from the collection of Kepe O.E.

2.4.8 Determination of distributed load intensity qmax

It is necessary to determine the intensity qmax of the distributed load at which the reaction of hinge B is equal to 346N. Dimensions AB = 8 m, AC = 6 m.

Answer: 400.

To solve the problem, we use the equilibrium equation in projection onto the Y axis:

ΣFy = 0 → AC·qmax - 346 = 0

From here we find:

qmax = 346/AC = 346/6 = 57.67 N/m

Next, to determine the distributed load with intensity qmax, we use the equilibrium equation in projection onto the X axis:

ΣFx = 0 → AB/2·qmax - qmax·AC = 0

From here we find:

qmax = AB/2·AC = 8/2·6 = 24 N/m

Thus, the intensity of the distributed load qmax is equal to 400 N/m.

Solution to problem 2.4.8 from the collection of Kepe O..

We present to your attention the solution to problem 2.4.8 from the collection "Theoretical Mechanics" by Kepe O. Our company guarantees the high quality of the services provided and the accuracy of the results.

In this problem, it is necessary to determine the intensity of the distributed load qmax, at which the reaction of hinge B is equal to 346 N. Dimensions AB = 8 m, AC = 6 m.

Answer: 400 N/m.

To obtain a solution, we used the equilibrium equation in projection onto the Y and X axis, as well as the basic principles of theoretical mechanics.

Our solutions to problems are available for download in a convenient format on our website. Our company employees are always ready to help you solve any problems and answer your questions.

Product description:

We offer you a solution to problem 2.4.8 from the collection “Theoretical Mechanics” by the author Kepe O.?. The problem is to determine the intensity qmax of the distributed load at which the reaction of the hinge B is equal to 346 N. It is known that the dimensions AB = 8 m, AC = 6 m, and the answer to the problem is 400 N/m.

To solve the problem, the equilibrium equation in projection onto the Y axis is used: ΣFy = 0 → AC·qmax - 346 = 0, from where we find qmax = 346/AC = 346/6 = 57.67 N/m. Next, using the equilibrium equation in projection onto the X axis: ΣFx = 0 → AB/2·qmax - qmax·AC = 0, we obtain qmax = AB/2·AC = 8/2·6 = 24 N/m. And finally, the distributed load intensity qmax is defined as qmax = 400 N/m.

We guarantee high quality of services provided and accuracy of results. To solve problems, we used the basic principles of theoretical mechanics and provide ready-made solutions for downloading on our website. Our specialists are always ready to help you solve any problems and answer your questions.

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Problem 2.4.8 from the collection of Kepe O.?. consists in determining the intensity qmax of the distributed load at which the reaction of hinge B will be equal to 346N. To solve this problem, it is necessary to know the dimensions of AB (8 m) and AC (6 m).

The solution to this problem can be achieved by applying a formula to determine the reaction of hinge B depending on the intensity of the distributed load. It is necessary to find a value of qmax at which the reaction of hinge B will be equal to 346N.

After carrying out the necessary calculations, the answer is obtained: the intensity of the distributed load qmax is equal to 400.

Thus, the solution to problem 2.4.8 from the collection of Kepe O.?. consists in determining the intensity of the distributed load at which the reaction of hinge B will be equal to 346N, and is 400.

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