Examples of 'partial derivative' in a sentence
Meaning of "partial derivative"
Partial derivative: In mathematics, a partial derivative represents how a function changes with respect to one of its variables, keeping the other variables constant. It is used to study the rate of change or slope of a function along a specific direction
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- A derivative with respect to one variable of a function of several variables with the other variables held constant.
How to use "partial derivative" in a sentence
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partial derivative
Plus the partial derivative of x with respect to y.
And that is called the partial derivative.
The partial derivative is not diffeomorphism invariant.
It will start taking the partial derivative.
This is the partial derivative of f with respect to x.
Review the definition of the partial derivative.
Denotes partial derivative with respect to time.
Remember this is just the partial derivative operator.
So the partial derivative of z with respect to y.
So we just calculated the partial derivative at that point.
Solving partial derivative equations using integral transformations.
If you were to take just a partial derivative with respect to x.
The partial derivative of z with respect to x.
Basic concepts of the theory of partial derivative equations.
Partial derivative of minus y with respect to z.
See also
So let us define the partial derivative of r with respect to s.
Partial derivative with respect to z.
So this is equal to the partial derivative of x with respect to x.
Partial derivative of f with respect to x.
How can the partial derivative of.
The partial derivative generalizes the notion of the derivative to higher dimensions.
Where ux is the first partial derivative of u with respect to x.
So hopefully this makes some sense just as a review of taking a partial derivative.
Applying the partial derivative directly gives us.
Here â is a rounded d called the partial derivative symbol.
Is the partial derivative with respect to x.
Not to be confused with the partial derivative operator.
How to define partial derivative of this function with respect to any variable.
We will simply approximate each partial derivative in turn.
I as the first partial derivative of the production function.
Find the indicated third order partial derivative.
Minus the partial derivative of z.
This seminar provides an overview of the working techniques for partial derivative equations.
So when we find the partial derivative of the cost function.
Partial derivative with respect to x is rate of change in the x-direction.
You also expect that the partial derivative mm x.
This partial derivative.
Appropriate for the partial derivative.
In economics the partial derivative is called the marginal utility of free time.
Here ∂ is a rounded d called the partial derivative symbol.
This means that the partial derivative of a spinor is no longer a genuine tensor.
Then, we were interested in a model of pollution described by a parabolic partial derivative equation.
Times the magnitude of the partial derivative of r with respect to s.
The partial derivative with respect to y said what is the slope in the y direction.
This is called a partial derivative.
Remember the partial derivative with respect to x said what is the slope in the x direction.
Calculating the partial derivative.
So the partial derivative of z with respect to x is 2x plus y.
And it also tells us that the partial derivative of capital.
Rs is the partial derivative of R with respect to s.
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Partial allowance for special dangerous goods
They even found a partial on the handcuffs
Partial inspections are done on each shutdown if time allows
Examples of using Derivative
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Derivative values are calculated using notional amounts
Marketable securities and derivative financial instruments
Derivative financial instruments designated as hedging instruments
