Question

Four particles of masses $m_1=2m,m_2=4m,m_3=m$ and $m_4$ respectively are placed at the four corners of a square. What should be the value of mass $m_4$ so that the centre of mass of the system of particles lies at the centre of square?

• A. $m$
• B. $2m$
• C. $4m$
• D. $6m$

Answer 1

The correct option is C $4m$


Considering a square with side $a$ and assigning origin $(0,0)$ at mass $m_1$ .

The $x$ and $y$ coordinates of all masses can be written as :
$\begin{array}{ccc}\text{mass}& x& y\\ m_1=2m& 0& 0\\ m_2=4m& a& 0\\ m_3=m& a& a\\ m_4=m_4& 0& a\end{array}$

$\because$ $\text{COM}$ of system of particles should be at the centre of the square. Hence coordinates of $\text{COM}$ is represented by $(x_{\text{COM}},y_{\text{COM}})=(\frac{a}{2},\frac{a}{2})....\left(i\right)$

Applying the formula and equating the $x$ and $y$ coordinates of $\text{COM}$ from Eq. $\left(i\right)$

$x_{\text{COM}}=\frac{m_1{x}_1+m_2{x}_2+m_3{x}_3+m_4{x}_4}{m_1+m_2+m_3+m_4}$

$\Rightarrow \frac{a}{2}=\frac{0+4ma+ma+0}{2m+4m+m+m_4}=\frac{5ma}{(7m+m_4)}...\left(ii\right)$

Simillarly, $y_{\text{COM}}=\frac{m_1{y}_1+m_2{y}_2+m_3{y}_3+m_4{y}_4}{m_1+m_2+m_3+m_4}$

$\Rightarrow \frac{a}{2}=\frac{0+0+ma+m_{4}a}{7m+m_4}=\frac{(m+m_4)a}{7m+m_4}.....\left(iii\right)$

Equating Eq. $\left(ii\right)$ & $\left(iii\right)$:
$5ma=(m+m_4)a$
$\Rightarrow m_4=5m-m=4m$
$\therefore m_4=4m$