sampling theorem is defined as , the sampling frequency should be greater than or equal to 2*maximum frequency, and the frequency should be bounded..
i,e
fs=2*fmax
where fs= sampling frequency
we can improve the bernoulli equation by adding the head losses at the final flow state and also we account the major (friction loss and viscus loss) losses and Minor losses (pipe bend , pipe contraction , pipe inlet and outlet, pipe fittings , valves etc)... If we account those losses and added to the head losses then the Bernoulli's equation gives the very accurate value....
State? Or phase? It would be a liquid phase. But its state is unknown since the state of a substance includes its pressure, temperature AND phase. Phase is a part of a state, but a state is not a phase.
Yes it is state function
to take them state by state
No, it is 100% owned by the state Government. it is an initiative of the state Government
If the signal is bandwidth to the fm Hz means signal which has no frequency higher than fm can be recovered completely from set of sample taken at the rate
I will give a link that explains and proves the theorem.
kleene's theorem state that those who defined fa
state and prove sampling theory as applied to low pass signal
what is mid point theoram?
..?
(cos0 + i sin0) m = (cosm0 + i sinm0)
The triangle inequality theorem states that any side of a triangle is always shorter than the sum of the other two sides.
The Central Limit Theorem (abbreviated as CLT) states that random variables that are independent of each other will have a normally distributed mean.
To use a theorem to prove statements, you first need to identify the relevant theorem that applies to the situation at hand. Next, you clearly state the hypotheses of the theorem and verify that they hold true for your specific case. Then, you apply the theorem's conclusion to derive the desired result, ensuring that each step in your argument logically follows from the theorem and any established definitions or previously proven results. Finally, you summarize how the theorem provides the necessary justification for your statement.
Fundamental theorem of arithmetic :- Every composite number can be expressed (factorized) as a product of primes, and this factorization is unique . apart from the other in which factors occur.
The impulse momentum theorem states that the change in momentum of an object is equal to the impulse applied to it. Mathematically, it can be expressed as the product of force and time, resulting in a change in momentum.