The following equations from Example 12.4 give the components of M after an α pulse (assuming the system is in equilibrium just before the α pulse):
Suppose that we now excite the sample with a train of α pulses, separated by a time TR. The equilibrium condition is true when TR is long compared with T1 and we can assume that Mz just before the pulse is equal to Mo. Derive a more general formula for Mz (t). You can assume that the transverse magnetization has completely dephased before each RF pulse, that is, Mxy(TR) = 0. (Hint: In this more general formula, Mo will be replaced with the steady-state value of the longitudinal magnetization. Define Mz after the (n + 1)th pulse to be pulse to be . Relate these two quantities with an equation. Derive another (very simple) equation from the steady-state condition. You now have enough information to solve the problem.)
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