Simple Harmonic Motion 4 Question 16

16. Two light springs of force constants $k _1$ and $k _2$ and a block of mass $m$ are in one line $A B$ on a smooth horizontal table such that one end of each spring is fixed on rigid supports and the other end is free as shown in the figure.

The distance $C D$ between the free ends of the spring is $60 cm$. If the block moves along $A B$ with a velocity $120 cm / s$ in between the springs, calculate the period of oscillation of the block. (Take, $\left.k _1=1.8 N / m, k _2=3.2 N / m, m=200 g\right)(1985,6 M)$

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Answer:

Correct Answer: 16. $2.82 s$

Solution:

  1. Between $C$ and $D$ block will move with constant speed of $120 cm / s$. Therefore, period of oscillation will be (starting from $C$ ).

$$ T=t _{C D}+\frac{T _2}{2}+t _{D C}+\frac{T _1}{2} $$

Here, $\quad T _1=2 \pi \sqrt{\frac{m}{k _1}}$ and $T _2=2 \pi \sqrt{\frac{m}{k _2}}$

and $t _{C D}=t _{D C}=\frac{60}{120}=0.5 s$

$\therefore \quad T=0.5+\frac{2 \pi}{2} \sqrt{\frac{0.2}{3.2}}+0.5+\frac{2 \pi}{2} \sqrt{\frac{0.2}{1.8}}$

$$ (m=200 g=0.2 kg) $$

$$ T=2.82 s $$



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