7.1 Modules
1.
a. 0x = (0 + 0)x = 0x + 0x, so 0x = 0.
c. Using (a), x + (− 1)x = (1 + (− 1))x = 0x = 0 = x + (− x) . Now “subtract” x from both sides by adding −x to both sides.
2.
a. If α : M → N is onto and R-linear, and if M = Rx1 + 
+ Rxn, then N = Rα(x1) + + Rα(xn) . Since some of the α(xi) may be zero, the result follows.
+ Rxn, then N = Rα(x1) + + Rα(xn) . Since some of the α(xi) may be zero, the result follows.
c. Let K = Rx1 + + Rxm and let M/K = R(y1 + K) + + R(yn + K) where the xi and yj are in M. If x 
M let
+ Rxm and let M/K = R(y1 + K) + + R(yn + K) where the xi and yj are in M. If x M let
with ri R for each i. Then x − (r1y1 + + rnyn) is in K, so
R for each i. Then x − (r1y1 + + rnyn) is in K, so
where sj R for each j. Hence {x1, . . ., xm, y1, . . ., yn} generates M.
3. If Re is an ideal ...
Get Introduction to Abstract Algebra, Solutions Manual, 4th Edition now with the O’Reilly learning platform.
O’Reilly members experience books, live events, courses curated by job role, and more from O’Reilly and nearly 200 top publishers.
