Question 75963
Your answer to (a) looks correct.
As to (b), the only way the men and women can alternate is if
women are at both ends. If you try putting a man at one end, you
end up putting 2 women together. So it goes
W M W M W M W M W
There are 5 possible ways to put a woman in the 1st position
There are 4 possible ways to put a man in the 2nd position
There are 4 possible ways to put a woman in the 3rd position
There are 3 possible ways to put a man in the 4th position
There are 3 possible ways to put a woman in the 5th position
There are 2 possible ways to put a man in the 6th position
There are 2 possible ways to put a woman in the 7th position
There is 1 possible way to put a man in the 8th position
There is 1 possible way to put a woman in the 9th position
The product of all the possibilities is the answer
{{{5*4*4*3*3*2*2*1*1 = 2880}}} answer
(c) If the women and men are grouped together, It looks like
{{{4*3*2*1 = 24}}} possible ways to arrange the men and
{{{5*4*3*2*1 = 120}}} possible ways to arrange the women
All the possible combos is the product {{{24*120 = 2880}}}
But this isn't the final answer. For every combo, the group
of men can be on the left or the right, so I think the
correct answer is {{{2*24*120 = 5760}}}
And (d) is the {{{24*120 = 2880}}} because you can't interchange the 
groups of men and women.