Statics/Trusses

A truss is a structure consisting of two-force members. There is a force acting at each end of the member. These forces must be equal in magnitude and opposite in direction, along the line of the joints of the member. This force is called the axial force. The member is said to be in compression if T is negative (ie, the forces at each end are toward each other) or in tension if T is positive.

The following picture shows a three member truss. Angles, and one force are given in the picture. Find the force in the vertical and diagonal member by using what you know about equilibrium.

Assign a coordinate system. In this problem a two dimensional X,Y plane can be used with the positive X axis being horizontal running from left to right(pointing to the right). The Y axis will be vertical and pointing upwards.

Since this is a statics problem, the joint cannot move. The only way the joint won't move is if the forces acting on it are in equilibrium (the net force must be equal to zero in all directions). An intelligent step now would be to sum X and Y forces at the joint.

Assign variable names so you don't get members confused with each other, let's call the vertical member's tension ${\displaystyle T_1}$ and the diagonal member's tension ${\displaystyle T_2}$.

${\displaystyle \sum F_x=0=-10-T_2\cos (30)+T_1\cos (90)}$

${\displaystyle \sum F_y=0=T_1+T_2\sin (30)}$

The cosine of 90 degrees is zero so ${\displaystyle T_1}$ drops out. You could also drop out ${\displaystyle T_1}$ simply by noticing that ${\displaystyle T_1}$ does not have an X component.

${\displaystyle \sum F_x=0=-10-T_2\cos (30)}$

${\displaystyle T_2=-11.547N}$

The negative sign indicates that the force is in the opposite direction as in the picture. This means the member is in compression instead of tension. Now we can solve for ${\displaystyle T_1}$.

${\displaystyle \sum F_y=0=T_1+T_{2}sin(30)}$

${\displaystyle \sum F_y=0=T_1+-11.547sin(30)}$

${\displaystyle T_1=5.774N}$

This answer came out positive, meaning the direction indicated in the picture was correct and the member is in tension.

The problem has been solved, we know the force in every member of the truss and whether the member is in tension or compression. If you are having problems visualizing the problem see if the image below helps.

The moments about all axes must also be zero, but the moments are already known to be zero about the joint because all forces pass directly through the joint.

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