Question: When the variation function ( = c1(1 + c2(2 is applied to a certain quantum-mechanical problem, one finds Where ( and b are known positive

When the variation function ( = c1(1 + c2(2 is applied to a certain quantum-mechanical problem, one finds

Where ( and b are known positive constants. Use this ( to find (in terms of ( and b) upper bounds to the lowest two energies, and for each W, find c1 and c2 for the normalized (.

(fAAA)%3D44, (fi||f2) (f||f2) = 6a, (filfi) = 2b, (fal f2) = 3b, (filf2) = b, = a.

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