Respuesta :
Xf=?
Xi=0m
Vi=0m/s
Vf=40m/s
a=?
t=12s
Xf=Xi+1/2(Vi+Vf)t
Xf= 0 +1/2 (0+40)12
Xf=1/2 (40)12
Xf=240m
Vf=Vi+at
40=0+a (12)
40=12a
a=3.33m/s^2
Xi=0m
Vi=0m/s
Vf=40m/s
a=?
t=12s
Xf=Xi+1/2(Vi+Vf)t
Xf= 0 +1/2 (0+40)12
Xf=1/2 (40)12
Xf=240m
Vf=Vi+at
40=0+a (12)
40=12a
a=3.33m/s^2
Answer:
a) 107.279m
b)[tex]1.49m/s^2[/tex]
Explanation:
We use the second and third equations of a uniformly accelerated motion as follows;
[tex]s=ut+\frac{1}{2}at^2...................(1)\\v^2=u^2+2as...................(2)[/tex]
where u is the initial velocity, v is final velocity, a is acceleration, t is time taken and s is distance covered.
Given;
u = 0m/s (since the car starts from rest)
v =40mi/h
t = 12s
a = ?
s = ?
substituting into equation (1), we obtain the following;
[tex]s=0*t+\frac{1}{2}*a*12^2\\s=\frac{1}{2}*a*144\\s=72a.................(3)[/tex]
For the purpose of consistency of units, we have to first of all convert the 40mi/h to m/s as follows;
1 mile = 1609.34m
therefore;
40miles = 40 x 1609.34m = 64373.8m
Also,
1 hour = 60 x 60s =3600s.
Hence;
[tex]40mi/h=\frac{64373.8}{3600}m/s\\40mi/h=17.88m/s[/tex]
We then make sustitution into equation (2) as follows;
[tex]17.88^2=0^2+2*a*s\\319.69=2as....................(4)[/tex]
We then proceed to solve for s and a by solving equations (3) and (4) simultaneously.
(a) To find s, the distance covered;
from equation (3), [tex]a=\frac{s}{72}[/tex]. We then put this into (4) to obtain the following;
[tex]319.69=2*\frac{s}{72}*s\\319.69=\frac{2s^2}{72}\\hence\\2s^2=319.69*72\\2s^2=23017.68\\s^2=\frac{23017.68}{2}\\s^2=11508.84\\s=\sqrt{11508.84}\\\\s=107.279m[/tex]
b) As previously stated, [tex]a=\frac{s}{72}[/tex];
hence,
[tex]a=\frac{107.279}{72}\\a=1.49m/s^2[/tex]
