1.0636 U.S. dollars ==
Marginal product of labour is no of quantity u can get by increasing labour by one quantity i.e in simple term suppose u have N labour initially and they r manufacturing P product and then u r hiring one more labour for your work keeping all other factore constant so now your production is P' so P'-P is called marginal product of labour and if u r multiplying it with price of one product u will get value of marginal product of labor.
no value if u wish to what in 300-500 u just enjoy a movie for 3 hours and finish but priceless if u keep it for the sake of memory and history dont think of selling
umm....i think u shud choose maths, english 'n' watevaa u wish 2 bcum
umm i think that that is something that u do so that we can gain stull n yea stull like that
Do u mean peso it is from Nepal
From the answer to: I ask U Y U R N S.
n shaped
It is a formula, used in sequences, in which the value of the nth term is described in relation to one or more of the earlier terms. A classic example is the Fibonacci sequence: u(1) = 1 u(2) = 1 u(n) = u(n-1) + u(n-2) for n = 3, 4, 5, ...
A quadratic can be drawn as a graph and it is either "U" shaped or "n" shaped. If it were "U" shaped, the minimum value qould be the lowest point of the "U". If "n" shaped, maximum would be the top.
You find the position-to-value rule for the sequence. This takes the form: U(n) = a + n*d where a is a constant [ = U(0), a term calculated by moving BACK one term from the first], d is the common difference between terms, and n is the counter or index. Since both a and d are known, plugging in the value of n gives the nth term. Beware, though, that some courses teach the rule as U(n) = a' + d*(n-1) where a' is the first term.
It's about 4.2 u$s in the black market
1.0636 U.S. dollars ==
Palmerstown U-S-A- - 1980 Palmerstown U-S-A 1-1 was released on: USA: 20 March 1980
In an arithmetic progression the difference between each term (except the first) and the one before is a constant. In a geometric progression, their ratio is a constant. That is, Arithmetic progression U(n) - U(n-1) = d, where d, the common difference, is a constant and n = 2, 3, 4, ... Equivalently, U(n) = U(n-1) + d = U(1) + (n-1)*d Geometric progression U(n) / U(n-1) = r, where r, the common ratio is a non-zero constant and n = 2, 3, 4, ... Equivalently, U(n) = U(n-1)*r = U(1)*r^(n-1).
U-Foes was created in 1980.
U Škripcu was created in 1980.