Let's solve it.
If we want to prove we can simply differentiate it and we will find the original function.
Evaluate the indefinite integral | 22° cos(952)de Justify your answer.
Evaluate the following indefinite integral. | asin" (a)cos(2) de Do not include "+" in your answer. For example, if you found the antiderivative was 2x + C you would enter 24.
Evaluate the indefinite integral given below. | (7zł +6xå – 72°) de Provide your answer below: s(7x* +6x - 7x2)dx=0
Evaluate the integral. If it is divergent say so, and justify your answer. sin ecos de 0
(3) Evaluate the indefinite integral. tan(t) + cos2 () de Con)
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 point) Evaluate the indefinite integral. cos(/z5) Integral NOTE: Enter arctan(x) for tan-1 z, sin(x) for sin .] to enter all necessary, ( and)!! (1 point) Evaluate the indefinite integral. cos(/z5) Integral NOTE: Enter arctan(x) for tan-1 z, sin(x) for sin .] to enter all necessary, ( and)!!
(3) Evaluate the indefinite integral. ſtan(x) + cos2 (2) dx cos(2)
Evaluate the indefinite integral ∫(tan(x)+〖cos〗^2 (x))/(cos(x)) dx
Evaluate the indefinite integral as an infinite series. A) Evaluate the indefinite integral as an infinite series. 5 ex - 1/8x dx
all of tem (e) sin(30) + cos(20) do 1. Evaluate the indefinite integral. (a) [8x2 – 3x2 + 3+ – 2 dr (b) 1-1 + 7x – 34" da (e) [(3+ + 2)(+ – 2) dt (8) 223/2 - 3/3+ Fadz (n) 23" +22-1 de 2. Solve the initial value problem: g'(x) = 7.76 – 4.23 + 12: g(1) = 24 3. Solve the initial value problem: W'(t) = 6 sin(3t): h() = 6