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Problem 2 [13-points) (a) Consider the integral (I', m'|L_L_11, m) = |C_13, where L. L_ = L2 – 1? + ħLZ. Show that C = /
Posted: Mon May 02, 2022 8:46 pm
by answerhappygod
- Problem 2 13 Points A Consider The Integral I M L L 11 M C 13 Where L L L2 1 Hlz Show That C 1 (26.46 KiB) Viewed 32 times
Problem 2 [13-points) (a) Consider the integral (I', m'|L_L_11, m) = |C_13, where L. L_ = L2 – 1? + ħLZ. Show that C = /[(1 + 1) - m(m - 1). [3-points) - = [4-points) b) Use L1 = Lx ily to evaluate the integral (1,m4|4y|1,m2) -) Let Y220,0) = Aeziøsin0, where A is a constant. Find the normalized Y210,0) = [6-points) Ent: Sstn*ecosode = -cosøe +cos$ 0]