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What is a degree in a differential equation?
A degree of a differential equation is the highest power of highest order of a differential term of the equation. For example, 5(d^4 x/dx^4) - (dx/dx)^2 =7 Here 5(d^4x/dx^2) has the highest order and so the degree will be it's power which is 1.
Explain how to find the terms of Fibonacci sequence?
If the Fibonacci sequence is denoted by F(n), where n is the first term in the sequence then the following equation obtains for n = 0.
Explain the method of translation of historical institutional term?
"Explain the method of translation of historical institutional term?" Institutional term and National institutional term? "Explain the method of translation of historical institutional term?"
What is another name for the y term of a linear equation?
what is anther name for the y term in a linear equation
Is an equation considered a standard form of quadratic equation if the first term or the quadratic term is on the second side?
No, it is not.
What is a degree in a differential equation?
A degree of a differential equation is the highest power of highest order of a differential term of the equation. For example, 5(d^4 x/dx^4) - (dx/dx)^2 =7 Here 5(d^4x/dx^2) has the highest order and so the degree will be it's power which is 1.
Which sociologist used the term differential association?
The sociologist who used the term "differential association" is Edwin Sutherland. He developed the theory as a way to explain how individuals learn deviant behavior through interactions with others.
What does the economical term 'fair value' refer to?
The economical term 'fair value' refers to the financial world. This term means the exact value before inflation is a part of the equation. It is the exact value.
What do you mean by 6 month please explain exact days?
the term 6 months means half of the year. it contains=182 days and exact 182.5 days.
What has the author D J MURRAY written?
J. D. Murray has written: 'Lectures on nonlinear-differential-equation models in biology' -- subject(s): Biology, Differential equations, Nonlinear, Mathematical models, Nonlinear Differential equations
Is this a nonlinear equation y25?
No, it is not even an equation - just a single term!No, it is not even an equation - just a single term!No, it is not even an equation - just a single term!No, it is not even an equation - just a single term!
What Charles Darwin term this differential rate of reproduction?
He called the differential rate of reproduction 'Survival of the Fittest.'
What term describes when individuals leave more offsprings than other individuals?
differential reproduction
Main points of Legendre differential equation?
The Legendre differential equation is the second-order ordinary differential equation(1)which can be rewritten(2)The above form is a special case of the so-called "associated Legendre differential equation" corresponding to the case . The Legendre differential equation has regular singular points at , 1, and .If the variable is replaced by , then the Legendre differential equation becomes(3)derived below for the associated () case.Since the Legendre differential equation is a second-order ordinary differential equation, it has two linearly independent solutions. A solution which is regular at finite points is called a Legendre function of the first kind, while a solution which is singular at is called a Legendre function of the second kind. If is an integer, the function of the first kind reduces to a polynomial known as theLegendre polynomial.The Legendre differential equation can be solved using the Frobenius method by making a series expansion with ,(4)(5)(6)Plugging in,(7)(8)(9)(10)(11)(12)(13)(14)so each term must vanish and(15)(16)(17)Therefore,(18)(19)(20)(21)(22)so the even solution is(23)Similarly, the odd solution is(24)If is an even integer, the series reduces to a polynomial of degree with only even powers of and the series diverges. If is an odd integer, the series reduces to a polynomial of degree with only odd powers of and the series diverges. The general solution for an integer is then given by the Legendre polynomials(25)(26)where is chosen so as to yield the normalization and is ahypergeometric function.The associated Legendre differential equation is(27)which can be written(28)(Abramowitz and Stegun 1972; Zwillinger 1997, p. 124). The solutions to this equation are called the associated Legendre polynomials (if is an integer), or associated Legendre functions of the first kind (if is not an integer). The complete solution is(29)where is a Legendre function of the second kind.The associated Legendre differential equation is often written in a form obtained by setting . Plugging the identities(30)(31)(32)(33)into (◇) then gives(34)(35)
Explain how to find the terms of Fibonacci sequence?
If the Fibonacci sequence is denoted by F(n), where n is the first term in the sequence then the following equation obtains for n = 0.
Explain the method of translation of historical institutional term?
"Explain the method of translation of historical institutional term?" Institutional term and National institutional term? "Explain the method of translation of historical institutional term?"
What is another name for the y term of a linear equation?
what is anther name for the y term in a linear equation
