Discrete Math Course.
On Z, let B be the set of subsets A of Z where either A is
finite or A complement is finite. Define + and * as union and
interception. Show whether or not B is a boolean algebra.
This question for Discrete Math course. All of them about the
same topic!!
Give me a simple definition of each one:
1) Neigbhor of a vertex
2) A connected graph
3) Length of cycle
4) Euler walk
5) Planar graph
6) Chromatic member of graph
7) X(G)
Discrete math : Show your work please.
Consider a set X of 10 positive integers, none of which is
greater than 100. Show that it has two distinct subsets whose
elements have the same sum.