Answer :
Answer:
x ’= 1,735 m, measured from the far left
Explanation:
For the system to be in equilibrium, the law of rotational equilibrium must be fulfilled.
Let's fix a reference system located at the point of rotation and that the anticlockwise rotations have been positive
They tell us that we have a mass (m1) on the left side and another mass (M2) on the right side,
the mass that is at the left end x = 1.2 m measured from the pivot point, the mass of the right side is at a distance x and the weight of the body that is located at the geometric center of the bar
x_{cm} = 1.2 -1
x_ {cm} = 0.2 m
Σ τ = 0
w₁ 1.2 + mg 0.2 - W₂ x = 0
x = [tex]\frac{m_1 g\ 1.2 \ + m g \ 0.2}{M_2 g}[/tex]
x = [tex]\frac{m_1 \ 1.2 \ + m \ 0.2 }{M_2}[/tex]
let's calculate
x = [tex]\frac{2.9 \ 1.2 \ + 4 \ 0.2 }{8.00}[/tex]2.9 1.2 + 4 0.2 / 8
x = 0.535 m
measured from the pivot point
measured from the far left is
x’= 1,2 + x
x'= 1.2 + 0.535
x ’= 1,735 m
