-1 is the G N I
n=1 is the the lowest level there is.
P(geom,i,g,n) = [((1+g)/(1+i))^n-1]/(g-i)
Given m equals 3 and n equals 1 then m3n3 equals?m3n3 = m*3*n*3 = 3*3*1*3 = [ 27 ]
m = n/(n-1)
when n = 0 it equals -25 when n = 1 it equals -36 when n = 2 it equals -39 etc
n=1 is the the lowest level there is.
P(geom,i,g,n) = [((1+g)/(1+i))^n-1]/(g-i)
Given m equals 3 and n equals 1 then m3n3 equals?m3n3 = m*3*n*3 = 3*3*1*3 = [ 27 ]
m = n/(n-1)
2 plus n is the true one, but 1 plus n is not?
when n = 0 it equals -25 when n = 1 it equals -36 when n = 2 it equals -39 etc
if n=4 then n+1 would be 4+1 which equals 5
The expression "n n equals g n" typically refers to a mathematical or computational context involving functions or sequences. It suggests that the output of a function ( g(n) ) is equal to ( n^n ), where ( n^n ) represents ( n ) raised to the power of itself. This kind of notation might appear in discussions about growth rates or complexity in algorithms, highlighting how rapidly ( n^n ) increases compared to other functions as ( n ) becomes large.
30 = Jumps in the Grand National
1/100 or 0.01
n = 2
n = 8