x-5 dx. ) Evaluate the definite integral S 22-3x+2 Determine whether the improper integral S, dx...
Question 2 please 1 and 2, determine whether or not the integral is In exercises improper. If it is improper, explain why 12. (a) 12 x-2/5 dx 「x-2/5 dx 「x2/5 dx (b) (c) I. (a) 0 13. (a 40 1 dx 2 x 14. (a In exercises 3-18, determine whether the integral converges or diverges. Find the value of the integral if it converges. 15. (a (b)人1x-4/3 dr 3, (a) l.lyMdx (b) x43 dx 16. (a 4. (a) 45 dx...
Determine whether the improper integral diverges or converges x?In(x) dx converges diverges Evaluate the integral if it converges, and check your results with the results obtained by using the integration capabilities of a graphing it the quantity divergesenter DIVERGES)
Determine whether the improper integral is convergent or divergent. 18 s dx (x + 1)2 2 Divergent O Convergent
p® 4.0 + 10 (1) (5 points) Determine whether the improper integral diverges. Evaluate the integral if it converges. Jo .2 + 5x + 2 de converges or دم dr converges or di- (2) (5 points) Determine whether the improper integral verges. Evaluate the integral if it converges.
Determine if the improper integral converges or diverges. If it converges, find the value. -dx x? +6x+5
a) Set up the appropriate limit(s) to evaluate the improper integral Do not evaluate the limit(s). Ś 4. 12 - 31 dr. (b) Determine whether the following integrals is proper, improper and convergent, or improper and divergent. Justify your answer. x + arctan(a) x + 3 $ (c) Evaluate the following integral or determine whether it is convergent. 1 S Edi X-V
Determine whether the improper integral x * ln(x) *dx convert or divergent. If it is con please evaluate
Determine if the improper integral converges. integral 0 to 2 π cosx/x dx
(a) Set up the appropriate limit(s) to evaluate the improper integral Do not evaluate the limit(s). = dr. (6) Determine whether the following integrals is proper, improper and convergent, or improper and divergent. Justify your answer. *1 + arctan(1) 10 (c) Evaluate the following integral or determine whether it is convergent.
(1 point) Call an improper definite integral type 1 if it is improper because the interval of integration is infinite. Call it type 2 if it is improper because the function takes on an infinite value within the interval of integration. Classify the type(s) for each of the following improper integrals. ? 1. sec(x) dx 0 ? 2. $x2-3x+6° x2 - 5x + 6 1 ? 3. Loints dx -00 x2 00 ? 4. dx