Let f(x) = and let I = dx. Given that $\le$ 12 for 0 $\le$ x $\le$ 1, what is the smallest value of n for which the Simpson's Rule approximation I ? S_2n will have error less than 0.0005 in absolute value? Hence, what is the value of I rounded to 3 decimal places? A) n = 2, I $\approx$ S₄ $\approx$ 0.747 B) n = 1, I $\approx$ S₂ $\approx$ 0.747 C) n = 4, I $\approx$ S₈ $\approx$ 0.747 D) n = 3, I $\approx$ S₆ $\approx$ 0.747 E) n = 3, I $\approx$ S₈ $\approx$ 0.747

Question

Quizplus · Accepted Answer

The Answer of Let f(x) = and let I = dx. Given that $\le$ 12 for 0 $\le$ x $\le$ 1, what is the smallest value of n for which the Simpson's Rule approximation I ? S_2n will have error less than 0.0005 in absolute value? Hence, what is the value of I rounded to 3 decimal places? A) n = 2, I $\approx$ S₄ $\approx$ 0.747 B) n = 1, I $\approx$ S₂ $\approx$ 0.747 C) n = 4, I $\approx$ S₈ $\approx$ 0.747 D) n = 3, I $\approx$ S₆ $\approx$ 0.747 E) n = 3, I $\approx$ S₈ $\approx$ 0.747

Let F(x) = and Let I = Dx ≤\le≤

Let F(x) = and Let I = Dx $\le$