Prove the following
Let
with
Then:
i)
if and only if
where the double inequality
means
and
ii) If
,
if and only if
.
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Prove the following Let with Then: i) if and only if where the double inequality means...
Let X be a banach space such that X= C([a,b]) where - ab+ with the sup
norm. Let x and f X. Show
that the non linear integral equation
u(x) = (sin
u(y) dy + f(x) ) has a solution u X. (the integral is
from a to b).
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Let
and
be two finite measures on
.
Prove that
if and only if the condition
implies
, for each
.
Thank you for your explanations.
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Suppose that
is a bounded function with following Lower and Upper
Integrals:
and
a) Prove that for every
, there exists a partition
of
such that the difference between the upper and lower sums
satisfies
.
b) Furthermore, does there have to be a subdivision such that
. Either prove it or find a counterexample and show to the
contrary.
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Complex Analysis.
Let
Where
is open unite disc.
Where g is a holomorphic function. Suppose there are distinct
points
such that:
.
Show that
NOTE: We need to show strictly less than
inequality
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If
are commutative rings, define their direct product
by induction on
( it is the set of n- tuples (
) with
for all i). Prove that the ring
where
is the set with
is the direct product of
copies of
.
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A Pareto distribution is often used in economics to explain a
distribution of wealth. Let a random variable X have a Pareto
distribution with parameter θ so that its probability distribution
function is
for
and 0 otherwise. The parameters and
are
known and fixed; is a constant to
be determined.
a) Assuming that
find the expected value and variance of ?
b) Show that for 3 ≥ θ > 2 the Pareto distribution has a
finite mean but infinite variance,...
Negative binomial probability function:
is the mean
is the dispersion
parameter
Let there be two groups with numbers and means of
1) Write down the log-likelihood for the full model
2) Calculate the likelihood equations and find the general form
of the MLE for and
3) Write down the likelihood function in the reduced model (ie.
assuming )
and derive the MLE for in general
terms
4) Using the above answers only, give the MLE and standard error
for where...
Partial Differential Equations:
Calculate the eigenvalues and eigenfunctions for the eigenvalue
problem associated with the vibrating string problem with
homogeneous boundary conditions. i.e.,
,
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Prove, or give a counter example to disprove the following
statements.
a)
b)
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Let f(x)=
if
,
if
if
a) What is the fomain of f(x)? Write in interval notation.
b) Determine the y-intercept of the function, if any. Make sure
to justify your answer.
c) Determine the x-intercepts of the function, if any. Justify
your answer.
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