Integrating with Trigonometric Substitution
3. Use the trigonometric substitution r = a sin(0) to evaluate the following indefinite integral: da
Find the indefinite integral. (Use C for the constant of integration.) Evaluate the integral using the given integration limits and the limits obtained by trigonometric substitution.
Evaluate the integral using an appropriate trigonometric substitution dt V2 - 6t + 13 Evaluate the integral using an appropriate trigonometric substitution
Evaluate the indefinite integral\ sec^2 t sqrt 1 + tant t dt
Use the previous answer to
evaluate between t=0 and t = pi / 4
1. Evaluate the indefinite integral ſ secº (t)/1+tan(t) dt (7 pts) 2. Use the previous answer to evaluate betweent O and t = 4 TT (3 pts)
Evaluate the indefinite integral ∫((1 + t/10)^3) dt using substitution. Step 1). u=g(t)= Step 2). du= Step 3-5). ∫((1+ t / 10)^3) dt=
Complete the square and find the indefinite integral (Note: using Trigonometric Substitution);
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 =
Evaluate the indefinite integral as an infinite series.
A)
Evaluate the indefinite integral as an infinite series. 5 ex - 1/8x dx
Evaluate the following indefinite integral. 3 + 3√x dx dx = 0 Determine the following indefinite integral. Check your work by differentiation. 5m (9m2 - 5m) dm 5m (9m2 - 5m) dm = Determine the following indefinite integral. Check your work by differentiation. Sur dr dr = Find the indefinite integralf f(-7 - 7 sec x tan x - 8 sec? x) dx. SC- -7 sec x tan x -8 sec? x) dx = | Determine the following indefinite integral....
12. DETAILS Find the indefinite integral using the method of trigonometric substitution. (Use C for the constant of integration.) S instructor to receive credit. There will be no credit if your work is not submitted. l 36 - 4x2 dx