Use the trapezoidal rule with n=4 steps to estimate the integral.   Integral from -1 to 1(x^2+6)dx...

Use the trapezoidal rule with 4 rectangles to estimate the integral of ex^2 dx from 1...

Use the trapezoidal rule with 4 rectangles to estimate the integral of ex^2 dx from 1 to 3

Use the trapezoidal rule with n = 4 to approximate the integral with a upper bound...

Use the trapezoidal rule with n = 4 to approximate the integral with a upper bound of (1/3) and a Lower bound of 0 1/3 ∫ √ (1- 9x^2 )dx ******* by the way square root covers 1- 9x^2 in the integral fully for the entire equation b. ) Use Simpson’s rule with n = 4 to approximate the same integral.

(a) Use the Trapezoidal rule with 4 equal partitions to approximate ? integral (from -1 to...

(a) Use the Trapezoidal rule with 4 equal partitions to approximate ? integral (from -1 to 1) (x^2 +1)dx via the formula Tn =(∆x/2)(y0+2y1+...+2yn−1+yn )with n=4, and ∆x=(b−a)/n (b) Compare the actual error, found by direct integration minus the approximation, with the known error bound for the Trapezoidal rule |ETn| ≤ (f′′(c)/12n^2) (b−a)^3, 12n2 where c is a point at which the absolute value of the second derivative is maximized.

Use the Trapezoidal Rule to approximate 4 on top ∫ on bottom 2 (9x^2+1) dx using...

Use the Trapezoidal Rule to approximate 4 on top ∫ on bottom 2 (9x^2+1) dx using n=4. Round your answer to the nearest tenth. Evaluate the exact value of ∫42(9x2+1) dx and compare the results. Trapezoidal Approximation ≈ Exact Value=

Use the Trapezoidal Rule to approximate 8 on top ∫ on the bottom 5 ln(x^2+4) dx...

Use the Trapezoidal Rule to approximate 8 on top ∫ on the bottom 5 ln(x^2+4) dx using n=3. Round your answer to the nearest hundredth.

Use the Trapezoidal Rule, the Midpoint Rule, and Simpson's Rule to approximate the given integral with...

Use the Trapezoidal Rule, the Midpoint Rule, and Simpson's Rule to approximate the given integral with the specified value of n. (Round your answers to six decimal places.) 4 0 ln(5 + ex) dx, n = 8 (a) the Trapezoidal Rule (b) the Midpoint Rule (c) Simpson's Rule

Use the Midpoint Rule with n = 4 to approximate the integral from 1 to 3...

Use the Midpoint Rule with n = 4 to approximate the integral from 1 to 3 of 1/x dx.

2. Use Simpson’s rule with six rectangles to estimate for using the Fundamental Theorem. ?Integral from...

2. Use Simpson’s rule with six rectangles to estimate for using the Fundamental Theorem. ?Integral from 0-4 x^3 dx

Estimate the minimum number of subintervals to approximate the value of Integral from negative 2 to...

Estimate the minimum number of subintervals to approximate the value of Integral from negative 2 to 2 left parenthesis 4 x squared plus 6 right parenthesis dx with an error of magnitude less than 4 times 10 Superscript negative 4 using a. the error estimate formula for the Trapezoidal Rule. b. the error estimate formula for​ Simpson's Rule.

Use multiple-application Trapezoidal rule with ? = 4 to estimate the value of tan−1(2).

Use multiple-application Trapezoidal rule with ? = 4 to estimate the value of tan−1(2).