The left, right, Trapezoidal, and Midpoint Rule approximations were used to estimate f(x) dx, whe...
The left, right, Trapezoidal, and Midpoint Rule approximations were used to estimate r(x) dx, where f is the function whose graph is shown. The estimates were 0.7819, 0.8664, 0.8631, and 0.9510, and the same number of subintervals were used in each case. y=f(x) (a) Which rule produced which estimate? Ln - Rn- To- Mn- fx) dx lie? (b) Between which two approximations does the true value of (smaller value) (larger value) The left, right, Trapezoidal, and Midpoint Rule approximations were...
please check my work if all correct i will give up rating Given fx)> 0 with f"(x) <0, and f"x)> 0 for all x in the interval [0, 2] with f0) - 1 and f2) -0.2, the left, right, trapezoidal, and midpoint rule approximations were used to estimate jfx)dx. The estimates were 0.7811,0.8675, 0.8650, 08632 and 0.9540, and the same number of subintervals were used in each case. Match the rule to its estimate. a. left endpoint b. right endpoint...
Estimate 5 cos(x2) dx using the Trapezoidal Rule and the Midpoint Rule, each with n = 4. (Round your answers to six decimal places.) (a) the Trapezoidal Rule 4.476250 x (b) the Midpoint Rule 4.544562 x From a graph of the integrand, decide whether your answers are underestimates or overestimates. T4 is an underestimate O T4 is an overestimate O M4 is an underestimate O M4 is an overestimate
Find the midpoint rule approximations to the following integral. 3 X dx using n 1, 2, and 4 subintervals. 1 M(1)- (Simplify your answer. Type an integer or a decimal.) Find the midpoint rule approximations to the following integral. 3 X dx using n 1, 2, and 4 subintervals. 1 M(1)- (Simplify your answer. Type an integer or a decimal.)
Let f(x) = cos(x2). Use (a) the Trapezoidal Rule and (b) the Midpoint Rule to approximate the integral ſo'f(x) dx with n = 8. Give each answer correct to six decimal places. To Mg = (c) Use the fact that IF"(x) = 6 on the interval [0, 1] to estimate the errors in the approximations from part (a). Give each answer correct to six decimal places. Error in Tg = Error in Mg = (d) Using the information in part...
(a) Estimate So sin(x + 1) dx by using either Simpson's Rule or Trapezoidal Rule with n= 6 (Round the answer to 6 decimal places). (b) Estimate the minimum number of subintervals needed to approximate the integrals with an error of magnitude less than 10-4 by the rule you used in part (a).
trapezoidal rule, simpson's rule or the midpoint rule should be used. I figured out n=147 but using these rules will take a really long time. b) Estimate S, 3x4 – 1 dx to within .01, using one of the error estimates.
Given the integral below, do the following. 2 cos(x2) dx Exercise (a) Find the approximations T4 and M4 for the given interval. Step 1 The Midpoint Rule says that b f(x) dx = Mn Ax[f(+1) + f(22) + ... + f(n)] with ax = . b - a + n a 1 We need to estimate 6 2 cos(x2) dx with n = 4 subintervals. For this, 1 - 0 Ax = 4 = 1/4 1/4 Step 2 Let žų...
Given the following table of data: 0.00 0.250.500.751.00 f(x) 0.39890.38670.35210.30110.2420 Estimate f(x) dx Estimate Jo f (Q) dx (i) by composite trapezoidal rule (ii) by Romberg integration of 0(h6), R33 Given the following table of data: 0.00 0.250.500.751.00 f(x) 0.39890.38670.35210.30110.2420 Estimate f(x) dx Estimate Jo f (Q) dx (i) by composite trapezoidal rule (ii) by Romberg integration of 0(h6), R33
10. Trapezoidal Rule is used to approximate the integral f(a) dx using 1- (yo +2y1 + 2y2 + x-na b-a + 2yn-1 +%),where Use this approximation technique to estimate the area under the curve y = sinx over。 a. π with n 4 partitions. x A 0 B: @ Δy B-A b. The error formula for the trapezoidal rule is RSL (12ba)1 where cischosen on the interval [a, b] to maximize lf" (c)l. Use this to compute the error bound...