Answer:
The position for mass is [tex]x(t)=36.75sin(37.5t)[/tex]
Explanation:
Let x(t) donate the position of mass at time t,Then x satisfies the differential equation
[tex]m\frac{d^2x}{dt^2} +kx=0\\here\\m=4kg\\k=30N/0.2m\\thus\\w^2=k/m=30N/0.2m*4kg=37.5[/tex]
The general solution is
[tex](x)t=C_{1}cos(37 .5t)+C_{2}sin(37.5t)[/tex]
It follows
[tex]x'(t)=-37.5C_{1}sin(37.5t)+37.5C_{2}cos(37.5t)\\now\\x(0)=0\\gives\\C_{1}=0\\ and\\x'(0)=1m/s\\gives\\C_{2} =36.75[/tex]
thus the position of mass is
[tex]x(t)=36.75sin(37.5t)[/tex]
