(a) Find (r) and (r2) for an electron in the ground state of hydrogen. Express your answer in terms of Bohr radius.
(b) Find {x} and {x2} for and electron in the ground state of hydrogen. Hint: This requires no new integration -note that r2 = x2 + y2 + z2, and exploit the symmetry of the ground state.
(c) Find (x2) in the state n = 2, 1 = 1, m = 1. Warning: This state is not symmetrical in x, y, z. Use x = r sin ѳ cos Φ
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