Need help with #4, 5, 6, 7, 8, 9, 10, 11, 12 ( you can briefly explain and say which option is the correct answer) .. thanks

5. v = [( /.' f( x, ") du) da 3. 1 = 6 (12, f(x, u)dx) dy 004 10.0 points A. I - J ( f, "f(x, v) dx) dy Reverse the order of integration in the inte- gral 5. 1 = J (5 F(x, v)dx) dy 1 = [ ] s(, y)dyda, 006 10.0 points but make no attempt to evaluate either inte- Reverse the order of integration in the dou- ble integral gral. 1. I = but make no attempt to evaluate either inte- 2. 1 = f ff( x, y)dx dy gral. 3. I = 6. 6." s(z , ) dady A. I = [ J f(x, y)didy 2. 1 = f (f f( x, v)dx) dy 5. 1 = [ f f( x, u)dady 3. 1 = / ([ f(x, u)dx) dy 6. 1 = [ I f( x, y)dady 5. 1 = 005 10.0 points Reverse the order of integration in the inte- gral 6. 1 = 007 10.0 points Compute the value of but make no attempt to evaluate either inte- 5anon gral lim n +00 4an - 6bm 1. I = when lim an = 6, lim on = -2. 2 00 V7 / 3 2. I = 1. limit = 31 18Find a formula for the general term an of 2. limit = the sequence 3. limit doesn't exist {ann= = ( 2, 7, 12, 17, ...}, assuming that the pattern of the first few 4. limit = terms continues. 5. limit = 31 1. an = 6n -4 18 2. an = n+5 3. an = n+4 008 10.0 points 4. an = 5n - 3 5. an = 4n - 2 If lim an = 4, 011 10.0 points determine the value, if any, of Determine if the sequence {a, } converges, and if it does, find its limit when lim an+9 . n + 00 7n5 - 4n3 +3 an = 1. limit = 4 5n4 + n2+ 2 1. limit = 0 2. limit doesn't exist 2. limit = -4 3. limit = -5 3. the sequence diverges 4. limit : 5. limit = 13 4. limit 9 10.0 points 5. limit = Determine if the sequence {an } converges when 012 10.0 points an = - In 3n + 4, Determine if the sequence {an }, converges when and if it does, find its limit. 5 n an 7n - 5 1. limit = In COIN and if it does, find its limit when 2. the sequence diverges 3. limit = 0 1. the sequence diverges 4. limit = In 5. limit = -In(3) 2. converges with limit = 010 10.0 points 3. converges with limit = 04. converges with limit = 5. converges with limit =