A body of mass initially at rest explodes and breaks into three fragments of masses in the ratio . The two pieces of equal masses fly off perpendicular to each other with a speed of each. The velocity of the heavier fragment is _____ .
- A
- B
- C
- D
A body of mass initially at rest explodes and breaks into three fragments of masses in the ratio . The two pieces of equal masses fly off perpendicular to each other with a speed of each. The velocity of the heavier fragment is _____ .
Correct answer:A
Standard Method
Given: Total mass is and the masses are in the ratio . So the three fragment masses are , , and . The two equal fragments move perpendicular to each other with speed each.
Find: The velocity of the heavier fragment.
Since the body was initially at rest, total initial momentum is zero. Therefore, by conservation of momentum,
For the two equal fragments,
Hence,
Its magnitude is
Now for the heavier fragment of mass ,
Therefore, the velocity of the heavier fragment is . The correct option is A.
Using resultant momentum directly
Given: Two equal fragments each have momentum magnitude and move perpendicular to each other.
Find: The speed of the heavier fragment.
The resultant of two perpendicular equal momentum vectors of magnitude is
Since total momentum must remain zero, the heavier fragment must have momentum of the same magnitude in the opposite direction.
Now divide by its mass :
Therefore, the correct option is A.
Taking the fragment masses directly as , , and is wrong because is only a ratio, not the actual masses. First scale the ratio so that the total becomes , giving , , and .
Adding the two momenta as is wrong because the two equal fragments move perpendicular to each other. Their resultant must be found using vector addition: .
Using conservation of velocity instead of conservation of momentum is wrong. In an explosion, momentum is conserved, not velocity. First find the heavier fragment's momentum from vector balance, then divide by its mass to get the speed.
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