Assignments:
Assignments
from textbook
6.1 311 odd 1-15; 21,23, 25, 27, 31, 33, 37
6.2 320 odd 1-15; 23, 27 29, 31, 35, 37
6.3 326 odd 1-9, odd 13-23, 27, 29
6.4 331 1, 3, 5, 9, 11, 15
6.5 348 odd 1-9, 13, 29, 33, 37
6.6 348 1, 3, 5, 7, 8, (3450 ft-lbs) 9, 11, 13, 16, (96125 ft-lbs), 19, 23
6.7 357 odd 1-11; 15
7.1 381 odd 1-7; 15, 17
7.2 381 odd 1-47; 53
7.3 397 odd 1-37; 47, 53
7.4 406 odd 1-41; 47
7.5 414 odd 1-45
7.6 421 1, 2 (q(t) = 20 (½)t /140; q(19) = 20 (½)1 /10 ≈
18.66 mg.), 3, 5, 7, 19
8.1 432 odd 1-21; 20, 22, 33
8.2 438 odd 1-27; 29-44 (odd and even); 45
9.1 462 odd 1-19; odd 23-39; 43
9.2 467 1, 3, 5, odd 9-29
9.3 472 odd 1-15; 30
9.4 478 odd 1-13; 18 (2/3 ln|x| + 3/x + 5/3 ln (x2
+ 9) + k ), 19, 21
9.5 481 odd 1-11
9.6 485 1, 3, 5, 9, 27
9.7 488 1, 3, 5, 7, 13, 17, 25
10.1 498 odd 1-29; 41, 49
10.2 503 odd 1-37
10.3 508 odd 1-19; 20 (DNE), 27, 28
10.4 515 odd 1-11, 15, 17, 19
11.1 531 odd 1-41
11.2 541 odd 1-47; 55, 60 a), 60 b) [k
≤ 375]
11.3 552 odd 1-37; 41, 43
11.4 557 odd 1-31; 39
11.5 358 odd 1-19; 23, 27, 29, 31, 33, 35, 39
11.6 572 odd 1-29
11.7 579 odd 1-11; odd 15-21; 27, 31, 33; Approximate the definite integral of (ex –1)/x from 0 to 0.1
using the first 3 nonzero terms of the series (0.1 +
0.01/4 + 0.001/18 ≈ 0.1026)
11.8 589 odd 1-11; 15, 19, 23, 25, 29, 35, 37
11.9 595 3, 9; use P3 to approximate and
, 11, 19 use P4
to approximate ln(0.7) and ln(1.2), 21.
Use P3 from the Maclarin series for
ex to approximate e0.3. Also use R3 to estimate
the error of the
approximation.