Answer to Question #156137 in Quantum Mechanics for Anand

Question #156137

A particle of mass 3m initially moving with a speed u in the positive x-direction

collides with a second particle of mass m moving in the opposite direction with an

unknown speed v. After collision the mass 3m moves along the negative y-direction

with a speed u/2 and the mass m moves with a speed v in a direction making an angle

of 45˚ with the positive x-direction. Determine v and v in units of u. Is the collision

elastic?

Expert's answer

(1)

"3m\\cdot\\frac{u}{2}=mv'\\cdot\\sin45\u00b0\\to v'=\\frac{3u}{\\sqrt{2}}" . Answer

(2)

"3m\\cdot u-mv=mv'\\cdot\\cos45\u00b0"

"3m\\cdot u-mv=m\\cdot \\frac{3u}{\\sqrt{2}}\\cdot\\cos45\u00b0\\to v=\\frac{3u}{2}" . Answer

(3)

before collide

"KE=\\frac{3mu^2}{2}+\\frac{mv^2}{2}=\\frac{3mu^2}{2}+\\frac{m(3u\/2)^2}{2}=\\frac{21}{8}mu^2"

after collide

"KE=\\frac{3m\\cdot (u\/2)^2}{2}+\\frac{m\\cdot(3u\/\\sqrt{2})^2}{2}=\\frac{21}{8}mu^2"

So, the collision is elastic. Answer

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