Newtons Laws EX 25

The mass is pulled down by the force of gravity, ${\displaystyle F_G=mg}$, and pulled up by the spring force, ${\displaystyle F_s=kx}$. The sum of the forces on the mass is zero because the problem implies that the mass is just hanging from the spring and it is at rest. We choose the coordinate system and draw the free-body diagram as shown below.

${\displaystyle F_S-F_G=0}$

${\displaystyle F_S=F_G}$

${\displaystyle kx=mg}$

${\displaystyle x=\frac{mg}{k}}$

This equation is true when the hanging mass is equal to 200 g or 250 g. We expect that the spring will stretch more. Let ${\displaystyle m_1=200}$ g and ${\displaystyle m_2=250}$ g. Similarly, let ${\displaystyle x_1=1.5}$ cm and ${\displaystyle x_2}$ needs to be determined. We write the equations for both ${\displaystyle x_1}$ and ${\displaystyle x_2}$:

${\displaystyle x_1=\frac{m_{1}g}{k}}$

${\displaystyle x_2=\frac{m_{2}g}{k}}$

Divide the two equations:

${\displaystyle \frac{x_2}{x_1}=\frac{m_2}{m_1}}$

${\displaystyle x_2=\frac{x_1{m}_2}{m_1}}$

${\displaystyle x_2=1.875}$ cm