-
trigonometric functions can also be
calculated using power series, as follows. For
arcsine, the
series can be
derived by
expanding its derivative, 1 1 − z 2 {\textstyle...
-
probability theory, the
arcsine distribution is the
probability distribution whose ****ulative
distribution function involves the
arcsine and the
square root:...
- integral,
which is the
quotient of the
arcsine divided by the
identity function - the
cardinalized arcsine. The
arcsine integral is
exactly the
original antiderivative...
- 2\ n\ }}\quad }{\quad 1+{\frac {\ z_{\alpha }^{2}}{n}}\quad }}\ } The
arcsine transformation has the
effect of
pulling out the ends of the distribution...
- In
probability theory, the
arcsine laws are a
collection of
results for one-dimensional
random walks and
Brownian motion (the
Wiener process). The best...
- In
probability theory and statistics, the
binomial distribution with
parameters n and p is the
discrete probability distribution of the
number of successes...
-
Arcsine law may
refer to:
Arcsine distribution Arcsine laws (Wiener process),
describing one-dimensional
random walks Erdős
arcsine law,
concerning the...
- measures, Lévy's constant, the Lévy distribution, the Lévy area, the Lévy
arcsine law, and the
fractal Lévy C
curve are
named after him. Lévy was born in...
-
Approximations for the
mathematical constant pi (π) in the
history of
mathematics reached an
accuracy within 0.04% of the true
value before the beginning...
- to the
arcsine distribution,
meaning that
small and
large values have a high probability. The
result is
therefor also
referred to as the
arcsine law of...
