Intensive form of the production function is just a form where the function has been reduced to a function of (k,1) or simply k by introducing k=K/L.
The properties you need to check would be
1.) f(0)=0 which is true in this case
2.) f'(k)>0 which is not true
3.) f''(k)<0 which is not true
Inada conditions
lim k->0 f'(k) = infinity , not true
lim k->infinity f'(k) =0 , not true
Part b:
The capital growth equation is
(1+n)*k[t+1]= (1-delta)*k[t] + s*( f(k) ) [where s is the savings rate]
One steady state would be at k=0
divide both sides by 0 and rearrange and your equation would boil down to
(n+delta)/s = k3 - 6k2 + 11k -6 = (k-2)(k-1)(k-3)
The curve of the function on the RHS is something like this:
http://s18.postimg.org/k7fy37gx5/20150426_201658.jpgNow if n+delta is positive and is such that n+delta/s has a value that is attained by this curve at the local maximum that lies between 1 and 2,then we have two more solutions(apart from 0). One is the local maximum between 1 and 2 and once it will be attained after 3. So the total number of solutions is then 3.
I'm not entirely sure how to check stability. It's somewhere in these slides but I can't quite remember it.
Look it up if you want to:
http://economics.mit.edu/files/7181
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