Given, m=5kg,v=20ms−1,θ=60° Vertical component of velocity, vy=vsin60° =20×
√3
2
=10√3ms−1 Time taken to reach the highest point = Time taken to reach the ground from highest point. t=
vsinθ
g
=
vy
g
=
10√3
9.8
=1.77s If the highest point, m splits up into two parts of masses m1=1kg and m2=4kg. If their velocities v1 and v2 respectively, then applying the principle of conservation of linear momentum, we get m1v1+m2v2=mvcosθ v1+v2=5×20×
1
2
[∵θ=60°] v1+4v2=5×10=50 .......(i) Initial KE=
1
2
m(vcosθ)2 =
1
2
×5×(10)2=250J Final KE=2 (initial KE)=2×250=500J ∴
1
2
m1v12+
1
2
m2v22=500 or
1
2
×1×v12+
1
2
×4×v22=500 orv12+4v22=1000 ........(ii) Solving Eqs. (i) and (ii), we get v1=30m∕s,v2=5m∕s Hence, the separation between the two fragments =(v1−v2)×t=(30−5)×1.77m=44.25m