during the 1800s, there was about 2n5 million aprox population in British North America
2n5 = 1 000 000 n5 = 500 000 n = 5√500 000) n = (500 000)1/5 n = 13.8
18 t(n) = (2n5 - 35n4 + 230n3 - 715n2 + 1178n - 600)/60 for n = 1, 2, 3, ...
Given ANY number it is possible to find a polynomial of order 6 such that it will predict it as the next number in the pattern. The position to value rule:Un= (2n5- 37n4+ 260n3-851n2+ 1274n + 624)/24 for n = 1, 2, 3, ... predicts 23.Given ANY number it is possible to find a polynomial of order 6 such that it will predict it as the next number in the pattern. The position to value rule:Un= (2n5- 37n4+ 260n3-851n2+ 1274n + 624)/24 for n = 1, 2, 3, ... predicts 23.Given ANY number it is possible to find a polynomial of order 6 such that it will predict it as the next number in the pattern. The position to value rule:Un= (2n5- 37n4+ 260n3-851n2+ 1274n + 624)/24 for n = 1, 2, 3, ... predicts 23.Given ANY number it is possible to find a polynomial of order 6 such that it will predict it as the next number in the pattern. The position to value rule:Un= (2n5- 37n4+ 260n3-851n2+ 1274n + 624)/24 for n = 1, 2, 3, ... predicts 23.
Boltzmanns constant
There are infinitely many possible answers. The following is a solution as a polynomial of the lowest order: Un = (2n5 - 35n4 +230n3 - 699n2 +996n - 456)/4 for n = 1, 2, 3, ...
It is the e mathematical constant, Euler's constant.
no the spring constant is not constant on moon because there is no restoring force there
There doesn't seem to be one for Donkey Kong 3, but for Donkey kong, say "ther things, say code" to Tom Knook and give him the code 2n5@N%8JUjE5fj ljcGr4%ync5EUp
The answer depends on what the constant is: the y-intercept in a linear graph, constant of proportionality, constant of integration, physical [universal] constant.
F=ma, if F is constant and m is constant, then a is constant... its acceleration.
A [real] constant.