Evaluate the Maclaurin series representing the integral.
Evaluate the Maclaurin series representing the integral. 0.1 0 )-1 cos 2x dx 0.1 0 )-1 cos 2x dx
Evaluate the integral: ∫ sin5 2x cos 2x dx
1. Evaluate the indefinite integral sen (2x) – 7 cos(9x) – sec°(3x) dx = 2. Evaluate the indefinite integral | cor(3x) – sec(x) tant(x) + 9 tan(2x) dx = 3. Calculate the indefinite integral using the substitution rule | sec?0 tan*o do =
1. Evaluate the integral S77® (sins 2x)(cos 2x) dx by substitutior method.
Evaluate the integral 5*7* (sins 2x)(cos 2x) dx by substitution method.
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)
Evaluate a) integral 0 to pi (dx/5-4 cos x) b) integral 0 to infinity (dx/(1+x^2)^3)
(a) Evaluate the integral ſ V1 + 2x dx. 0 1 (b) If f()dx 5 and ) FCD)dz – 3. find i f(z)dr.
2. Since it is difficult to evaluate the integral / e dx exactly, we will approximate it using Maclaurin 0 polynomials (a) Determine Pa(x), the 4th degree Maclaurin polynomial of the integrand e (b) Obtain an upper bound on the error in the integrand for a in the range 0 S x 1/2, when the integrand is approximated by Pi (r) (c) Find an approximation to the original integral by integrating Pa(x) (d) Obtain an upper bound on the error...
Use MacLaurin series to evaluate the following limits. Do not use L'Hospital's rule. (a) lim, 0 2x+cos 2-3 sino 1+36x3-1 (b) lim;-+0 sin(60)(et-1-2)