A shell explodes into three fragments of equal mass, with two fragments traveling at right angles to each other at speed 'v'. The conservation of momentum is the key principle applied to determine the speed and direction of the third fragment. The velocity of the third fragment is calculated using the formula vthird = √(v²(m1² + m2²)) / m3, and the angle of its trajectory is given by tan-1(m2/m1). All fragments have equal mass, simplifying the calculations.
PREREQUISITESStudents studying physics, particularly those focusing on mechanics and conservation laws, as well as educators looking for examples of momentum conservation in explosive events.
BruceW said:Travel at right angles means there is 90 degrees between their paths. For example, one might travel vertically, while the other travels horizontally.
For the question, think about what quantity will be conserved.
BruceW said:Yes, that's the one! You might also think of energy, but when the shell explodes it turns an unknown amount of chemical energy into kinetic energy, so energy conservation doesn't help us here.
So you're right to think of momentum conservation. After the shell explodes, there are 3 pieces, so you need to think of the equation for the total momentum due to several objects.
jasonbans said:i got the velocity to be v2= root square of v^2(m1^2+m2^2) / m3
and the angle to be tan^-1 ( m2/m1)
am i right?