Question 2: Estimate the error if cos Vt is approximated by 1 cos Vt dx. 2...
QUESTION 5 The integral 2 1 I= dx x +4 0 is to be approximated numerically. (a) Find the least integer M and the appropriate step size h so that the global error for the composite Trapezoidal rule, given by -haf" (), a< & <b, 12 is less than 10-5 for the approximation of I. b - a (b) Use the two-term Gaussian quadrature formula and 6 decimal place arithmetic to approximate I. (Hint: Parameters are ci = 1, i...
Question 1 1 pts If f(x)dx = 10 and Să f(x) = 3.6, find si f(x)dx. 6.4 Question 2 1 pts Let Só f(x)dx = 6, Sº f(x)dx = -4, So g(x)dx = 12, S g(x)dx = 9 Use these values to evaluate the given definite integral: Si (35(x) + 2g(x))dx —
4. Consider using the Simpson's 1/3 rule to estimate the following integral I[cos(x 3)l dx (a) Find the approximate values of 1 when the step size h-: 2 and h 1 , respectively. (b) Find an upper bound of the step size h in order to guarantee that the absolute error (in absolute value) of the estimate is less than 0.001. Hint: 2 sin x cos x = sin (2x). I cos x I " The arguments of all trigonometric...
Use the fact that Due in 23 minutes cos(w) - cos(w) = 2 (- 1)"w2n (2n)! to evaluate the following integral to within an error 0.01. cos(1.4.)dx. Estimate = Preview How many non-zero terms of the Maclaurin series did you use to approximate this integral? Preview Now estimate the error of the approximation. error < Preview
Evaluate the following integral. 1/2 7 sin ?x -dx 1 + cos x 0 1/2 7 sin 2x dx = V1 + cos x 0 Score: 0 of 1 pt 1 of 10 (0 complete) HW Score: 0%, 0 of 10 pts 8.7.1 A Question Help The integral in this exercise converges. Evaluate the integral without using a table. dx x +49 0 dx X2 +49 (Type an exact answer, using a as needed.) 0
Evaluate the integral. 4) S -2x cos 7x dx Integrate the function. dx (x2+36) 3/2 5) S; 5) Express the integrand as a sum of partial fractions and evaluate the integral. 7x - 10 6) S -dx x² . 44 - 12 6)
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...
Consider the integral 8. eT dx Use Simpson's Rule with n = 6 to estimate the value of the integral. (a) (b) Your friend chose instead to estimate the integral above using the Midpoint Rule with n = 6, Noting that the second derivative: 4x2-4r +3)e z5/2 is an increasing function over the interval [1, 4], determine the maximum possible error in your friend's estimate Consider the integral 8. eT dx Use Simpson's Rule with n = 6 to estimate...
π/2 (6 3 cos x) dx 0 (a) Derive the formula for multi-segment (evenly spaced) left-hand rectangles and then use it to approximate the value of the integral with n=1; n-2; n-4 segments. Calculate the true error and relative true error for each (b) Derive the formula for multi-segment (evenly spaced) right-hand rectangles and then use it to approximate the value of the integral with n=1; n=2; n-4 segments. Calculate the true error and relative true error for each (c)...
(10 marks) Evaluate the integral [*r'e ce-dx; 1. Using Composite Trapezoidal rule with (n=4) 2. Estimate the error for the approximation in (a) 3. Using Composite 1/3 Simpson's Rule (n = 4).