Answer:
s=0.36m part c lands
Explanation:
from conservation of linear momentum
we know that
the momentum before Collision(explosion) is equal to the momentum after collision( explosion)
0=maua+mbub+mcuc
ma=.5kg
mb=.5kg
mc=9.8-(0.5+0.5)
mc=8.8kg
since the fragments all fall to the ground at the same time, we assume same time for all
t=0.27s
the velocity of a
v=u +at
since it falling stariaght down
v=0+9.81*.27
v=2.64m/s is the vertical side of its velocity
, since its falling straight down , the horizontal velocity is zero
the velocity of b
s=ut horizontal component of the distance
6.5=.27*ub
ub=24.07m/s
from
0=maua+mbub+mcuc
0=0.5*0+0.5*24.07+8.8*cu
uc=1.36
the distance from a will be
s=ut
s=1.36*.27
s=0.36m
Answer:
The part c land 0.48m apart from the part a.
Explanation:
This can be solve using conservation of linear momentum. The explosion can be considered as an explosive collision, in which the internal forces are far stronger than the external ones. therefore we can consider the external forces as insignificant. In this case, the linear momentum before and after the explosion is the same. Therefore:
[tex]\vec{P}_{tot0}=\vec{P}_{a}+\vec{P}_{b}+\vec{P}_{c}[/tex]
The final speed of the firework was 0m/s (maximum height), therefore its momentum P was null before the explosion. This means:
[tex]0N/s=\vec{P}_{a}+\vec{P}_{b}+\vec{P}_{c}[/tex]
[tex]\left \{ {{P_{ya}+P_{yc}=0} \atop {P_{xb}+P_{xc}=0}} \right.[/tex]
The total mass of the firework was 9.8kg, therefore the mass of part c is:
mc=Mtot-ma-mb=8.8kg
Now we have to calculate the initial speed of part a and part b. For both, we can use Vertical Projectile Motion equations:
For A:
[tex]Y=y_0+v_{ay0}t-\frac{g}{2}t^2\\ 0m=32m+v_{b0}(0.27s)-\frac{g}{2}(0.27s)^2\\v_{ay0}=-117.19m/s[/tex]
For B:
[tex]Y=y_0+v_{yb0}t-\frac{g}{2}t^2\\ 0m=32m+0m/s(t_b)-\frac{g}{2}(t_b)^2\\t_{b}=2.554s\\X=x_0+v_{xb0}t_b\\6.5m=0m+v_{xb0}\cdot 2.554s\\v_{xb0}=2.54m/s[/tex]
Using the conservation of linear momentum, we calculate the speed of C:
[tex]\left \{ {{P_{ya}+P_{yc}=0} \atop {P_{xb}+P_{xc}=0}} \right.\\P_{ya}+P_{yc}=m_av_{ay0}+m_cv_{cy0}=0 \rightarrow v_{cy0}=6.66m/s\\P_{xb}+P_{xc}=0=m_bv_{bx0}+m_cv_{cx0} \rightarrow v_{cx0}=-0.1445m/s[/tex]
Using now Vertical Projectile Motion for part C:
[tex]Y=y_0+v_{yc0}t-\frac{g}{2}t^2\\ 0m=32m+6.66m/s(t_c)-\frac{g}{2}(t_c)^2\\t_{c}=3.3218s\\X=x_0+v_{xc0}t_c\\X_{b}=-0.48m[/tex]
