Solution to problem 2.3.25 from the collection of Kepe O.E.

Problem 2.3.25 is to determine the length of the bracket at which the moment in the MA embedding will be equal to 3 N m if the intensity of the distributed load qmax is equal to 1 N/m. The answer to this problem is 3.0.

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A digital product is offered called “Solution to problem 2.3.25 from the collection of Kepe O.?”. This product contains a complete and detailed solution to the problem on the topic “Determining the length of the bracket.” The task is to determine the length of the bracket at which the moment in the MA embedding will be equal to 3 N m, if the intensity of the distributed load qmax is equal to 1 N/m. The answer to this problem is 3.0.

The solution was made by an experienced specialist and contains all the necessary calculations and explanations. The product design is made in a beautiful html format, which allows you to conveniently view and study it on any device.

By purchasing this product, you will receive useful material for your education and development, which will help you better understand the topic and successfully solve similar problems.

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Solution to problem 2.3.25 from the collection of Kepe O.?. consists in determining the length of the bracket l, at which the moment in the MA embedding will be equal to 3 N m, with a distributed load intensity qmax equal to 1 N/m. The answer to the problem is 3.0.

To solve the problem, you need to use the statics equation for moments, which looks like this:

ΣM = 0

Where ΣM is the sum of the moments of forces applied to the system.

In this problem, a distributed load qmax is applied to the system, which creates a moment on the section of the bracket from point A to point B. The moment of this force can be calculated using the formula:

MA = (qmax * l^2) / 2

where l is the length of the bracket.

Substituting the known values ​​into this formula, we get:

3 Nm = (1 N/m * l^2) / 2

From here you can find the length of the bracket l:

l = √(6 m^2) = 3 m

Thus, the length of the bracket at which the moment in the MA embedding will be equal to 3 N m, with a distributed load intensity qmax equal to 1 N/m, is equal to 3 meters.

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