Answer:
b. -11.6 cm
Explanation:
We have given parameters:
Length, l = 1.5 m = 150 cm
Mass of weight, [tex]m_1[/tex] = 20 kg
Width, x = 4 cm
Distance d = 4 cm
Mass of bar, [tex]m_{bar}[/tex] = 5 kg
We are asked to find the center of mass from the mid-point, [tex]X_{CM} = ?[/tex]
Since 3 weights are on the left and 2 weights are on the right, we know:
[tex]m_{left}[/tex] = 3 * 20 = 60 kg
[tex]m_{right}[/tex] = 2 * 20 = 40 kg
And also we know that, [tex]M = \frac{l}{2}[/tex] = 150/2 = 75 cm
For the left side, center of mass is:
[tex]x_{left} = \frac{3 * 4}{2} = 6[/tex] cm
From the midpoint, the distance to the left is:
[tex]X_{left} = -(M - 4 - x_{left}) = -(75 - 4 -6) = -65[/tex] cm
For the right side, center of mass is:
[tex]x_{right} = \frac{2 * 4}{2} = 4[/tex] cm
From the midpoint, the distance to the right will be:
[tex]X_{right} = (M - 4 - x_{right}) = (75 - 4 - 4) = 67[/tex] cm
Hence,
[tex]X_{CM} = \frac{m_{right}*x_{right} + m_{left}*x_{left} }{m_{right} + m_{left} + m_{bar}} = \frac{40 * 67 - 60 * 65}{40 + 60 + 5} = -11.62[/tex] cm
