Let f(x) = sin(x) and let po be the starting value for Newton-Raphson iteration such that tan(po) = 2po. Then in this case %3D Select one: a. Pn does not exist for n > 1 • a. • b. The limit of Newton-Raphson iteration is o. • c. If po + 0, then pn = -Po if n is even %3D • d. Pn+1 = Pn +1 for all n %3D • e. If po 0, then p, = po if n is odd. f. The limit of Newton-Raphson iteration is -0o. 9. Pn+1= -Pn for all n20

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numerical analysis

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Let f(x) = sin(r) and let such that tan(Po) = 2po. Then in this case Po be the starting value for Newton-Raphson iteration %3D Select one: does not exist for n 1 a. Pn • b. The limit of Newton-Raphson iteration is oo. c. If po 0, then pn = :-Po if n is even d. Pn+1 = Pn +1 for all n e. If po + 0, then p, = Po if n is odd. f. The limit of Newton-Raphson iteration is -0o. g. Pn+1 Pn for all n2 0