A certain subatomic particle is discovered. It is comprised of a charm quark and an anti-bottom quark.
A certain subatomic particle is discovered. It is comprised of a charm quark and an anti-bottom...
A certain subatomic particle is discovered. It is comprised of a charm quark and an anti-bottom quark. Answer the three questions below. How would this new particle be categorized? (It would be a what?) meson klingon baryon lepton fermion What would be the charge of this particle? +2 +1 0 (neutral) -1 -2 Consider the four forces listed below. Which of them has the least effect on the two quarks? Electromagnetic force Gravitational force
Extra 15 pts) The double charmed Xi (Ξ ) has a charge of +2 and charm of +2. This particle decays into a charmed lambda (A,*) with a charge of +1 and a charm of +1, and a K and 2 ,'. Л,' + K +x' + a". Write this reaction explicitly showing its quark components and reduce it to one of the following 3 charm quark decay paths (circle the correct decay path below and show the full quark...
Question 1 2 pts The subatomic particle that accounts for the most volume of an atom is: Proton Neutron O Electron O Quark
A subatomic particle created in an experiment exists in a certain state for a time of Δt = 9.2 × 10-20 s before decaying into other particles. Apply both the Heisenberg uncertainty principle and the equivalence of energy and mass (see Section 28.6) to determine the minimum uncertainty involved in measuring the mass of this short-lived particle.
A newly discovered particle, the SPARTYON, has a mass 895 times that of an electron. If a SPARTYON at rest absorbs an anti-SPARTYON, what is the frequency of each of the emitted photons (in 1020 Hz)? The mass of an electron is 9.11×10-31 kg Could you please show all steps on how to get the answer? Thank you so much for your time and help!
A team discovered an m-mass tetron, an 8-quark particle decaying into four identical muons in a symmetrical tetrahedral pattern. The tetron is stationary until it decays. The four daughter muons carry the same total energy and have a resting mass of 0.149M 1). M, determine the magnitude of the energy E and the momentum p0 meson. Conservation laws may at least partially apply to this problem. 2). suppose that the four muons of relativistic momentum decayed by the doppler are:...
Suppose that a tank containing a certain liquid has an outlet near the bottom. Let h(t) denote the height of the liquid's surface above the outlet. Torricelli's principle states that the outflow velocity v at the outlet is equal to the velocity of a particle falling freely (with no drag) from the height h (a) Show that v2gh, where g is the acceleration due to gravity. (b) By equating the rate of outflow to the rate of change of liquid...