What is the equilibrium force exerted by the muscle in holding a ball?

AI Thread Summary
The discussion focuses on calculating the equilibrium force exerted by a muscle when holding an 8kg ball, considering the forearm's position and mass. The equilibrium condition requires balancing torques and forces, leading to the conclusion that the muscle force is 608.22 N. An upward force from the shoulder is necessary to maintain vertical equilibrium, which does not affect torque calculations since it acts along the same line as the elbow. The conversation clarifies that the elbow experiences a downward force due to the combined weights of the ball and forearm, necessitating a stronger muscle force to maintain balance. Ultimately, all forces and torques must cancel out for the forearm to remain in equilibrium.
pixietree
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Homework Statement


A human holds a ball of mass 8kg at his hand, so that the forearm is perpendicular to the upperarm.
The distance between the elbow and the center of mass of the forearm is 0.15 meters, the distance between the elbow and the muscle is 0.05 meters and the mass of the forearm is 2 kg. The ball is held 0.35 meters from the elbow (as depicted below).
Xyk50Z.png

Find the force of the mustle given equilibrium.

Homework Equations


$$\sum_{i=1}^n \tau_i=0$$
$$F_{m} = ma$$

The Attempt at a Solution


$$r_{mustle}*F_{mustle} - r_{arm}*F_{arm} - r_{ball}*F_{ball}=0$$
$$F_{mustle} = \frac {r_{arm}*F_{arm} + r_{ball}*F_{ball}}{r_{mustle}}$$
Hence, $$F_{mustle} = \frac {r_{arm}*m_{arm}+r_{ball}*m_{ball}}{r_{mustle}} *g $$
Setting the given data yields $$\mathbf F = 608.22\mathbf y N$$
Here is the part I don't understand: If I am right, the forearm does not move and hence does not accelerate.
But $$F-m_{arm}*g-m_{ball}*g = 608.22 - 2*9.81 - 8*9.81 = 510.12 N$$, hence the sum of forces on the formarm is not zero.
 
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Hi pixietree! :oldsmile:

That is correct.
There is an additional upward force in the shoulder, that was left out, to ensure equilibrium of the vertical forces.
However, it doesn't contribute to the torques, since the elbow is on the same line as that force.
 
I like Serena said:
Hi pixietree! :oldsmile:

That is correct.
There is an additional upward force in the shoulder, that was left out, to ensure equilibrium of the vertical forces.
However, it doesn't contribute to the torques, since the elbow is on the same line as that force.

Shouldn't there be an additional weight of the muscle downwards at a distance of rmuscle ?
 
rock.freak667 said:
Shouldn't there be an additional weight of the muscle downwards at a distance of rmuscle ?

We're looking at the free body diagram of only the forearm.
The force from the shoulder is transmitted to the forearm in the elbow, where it rotates.
The muscle itself is part of the upper arm, which will have some upward force on it from the shoulder, and some torque as well, to keep it in equilibrium.
 
I like Serena said:
We're looking at the free body diagram of only the forearm.
The force from the shoulder is transmitted to the forearm in the elbow, where it rotates.
The muscle itself is part of the upper arm, which will have some upward force on it from the shoulder, and some torque as well, to keep it in equilibrium.

Ah yes that makes more sense.
 
If I understand you correctly rock.freak667, I got the torques right hence there is some downward force of 510.12 Newtons acted at the elbow. But why does the elbow feel this force downwards? I didn't understand your explanation.
 
pixietree said:
If I understand you correctly rock.freak667, I got the torques right hence there is some downward force of 510.12 Newtons acted at the elbow. But why does the elbow feel this force downwards? I didn't understand your explanation.

If we look at just the forearm, we have a couple of downward forces on the right (ball and arm weight), and an upward force on the left (muscle).
With just that the arm would tilt down.
To compensate, we need an downward force at the elbow to counteract the muscle, that has to pull extra strong.
Consequently all forces cancel out (which they must to be in equilibrium), and then the canceled out torque ensure the forearm doesn't tilt.

So we have a downward force on the elbow.
And according to "action = - reaction", that means we have an equal and opposite upward force from the upper arm on the elbow, which gets then transmitted through the upper arm to the shoulder.
 
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