Answer:
Total distance D=7.66 ft
Explanation:
Given that: [tex]V=t^{2}-4[/tex]
Here velocity of particle will be zero at t=2 sec,so we take interval to find total distance.
We know that [tex]V=\dfrac{ds}{dt}[/tex]
ds=V dt
So [tex]s=\int_{t_{1}}^{t_{2}}Vdt[/tex]
It means that ,the area of velocity-time(V-t) graph will give the displacement.
Given that [tex]t_{1}=0 ,t_{2}=3[/tex]
So now by putting the value in above integration
[tex]s=\int_{0}^{2}(t^{2}-4)dt+\int_{2}^{3}(t^{2}-4)[/tex]
[tex]s=\left [\frac{1}{3}t^3-4t\right ]_o^2+\left [\frac{1}{3}t^3-4t\right]_2^3[/tex]
s= -5.33+2.33 ft
s= -3 ft (we know that displacement is a vector quantity so it have sing)
So this is the displacement of particle at time 0 sec to 3 sec.
To find the total distance we will add all take mode on -5.33 ft and and will add with 2.33 ft instead of subtract.
So the total distance travelled by particle D=7.66 ft.
D=7.66 ft
