Answer:
[tex]\bar r = +3.622\,cm[/tex]
Explanation:
Let consider that both rods have uniform densities. The location of the center of mass is given by the following formula:
[tex]\bar r = \frac{\rho_{brass}\cdot r_{brass}+\rho_{lead}\cdot r_{lead}}{\rho_{brass}+\rho_{lead}}[/tex]
[tex]\bar r = \frac{(8.44\,\frac{g}{cm^{3}} )\cdot (-25\,cm)+(11.3\,\frac{g}{cm^{3}} )\cdot (+25\,cm)}{8.44\,\frac{g}{cm^{3}}+11.3\,\frac{g}{cm^{3}}}[/tex]
[tex]\bar r = +3.622\,cm[/tex]
Answer:
Xcm=3.62cm
Explanation:
We can assume that the rods have the same radius (to compute the volume), an also we can assume that the center of mass of each part of the rod (for brasss and lead) is at the center of each material, that is, x1=-25cm, x2=25cm
If we take the origin at the center of the rod we have
[tex]X_{CM}=\frac{M_1x_1+M_2x_2}{M_1+M_2}[/tex]
M1 (brass) and M2 (lead) are
[tex]M_1=V*\rho_1=(\pi r^250cm)(8.44\frac{g}{cm})=422\pi r^2g\\M_2=V*\rho_2=(\pi r^250cm)(11.3\frac{g}{cm})=565\pi r^2g\\[/tex]
Hence,
[tex]X_{CM}=\frac{(422\pi r^2g)(-25cm)+(565\pi r^2g)(25cm)}{422\pi r^2g+565\pi r^2g}\\X_{CM}=3.62cm[/tex]
hope this helps!!
