Examples of 'derivative of x' in a sentence
Meaning of "derivative of x"
derivative of x - This mathematical phrase refers to the rate of change of a function at a given point. It is commonly used in calculus to find the slope of a tangent line to a curve at a specific point
How to use "derivative of x" in a sentence
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derivative of x
Plus the partial derivative of x with respect to y.
So we can rewrite this as mass times the second derivative of x.
Let us take the derivative of x to the n.
So the derivative of x is 1 times v plus x times the derivative of v with respect to x.
So this is equal to the partial derivative of x with respect to x.
The derivative of x with respect.
But here we did not take the derivative of x the fifth.
Partial derivative of x with respect to z.
So this is just the derivative of x.
The derivative of x.
And then, plus the second derivative of x.
What is the derivative of x to the x with respect to x?
Specifically, Aμ is found by taking the directional covariant derivative of X along T twice,.
Then we compute the derivative of x with respect to time.
The derivative of x is 1, the derivative of y with respect to x, well that 's just dy dx.
See also
We know the derivative of x.
OK, derivative of x square with respect to x is 2x.
That 's just the second derivative of x as a function of t.
The derivative of x here is 1, so I can not do anything here.
Now what is the partial derivative of x with respect to a?
The derivative of x to the 0 is just 1, so the derivative is 0.
And then it 's going to be that times the derivative of x minus y with respect to x.
Well the derivative of x squared with respect to x is 2x.
Well, this is 3 times the derivative of x squared.
It 's the derivative of x with respect to t.
Because we took the derivative, and clearly the derivative of x squared is 2x.
So what the derivative of x minus y with respect to x?
Well, derivative of natural log of x is 1 over x plus derivative of x minus 1 over x.
So notice the derivative of x squared plus any constant is 2x.
Cross out its row and column, the partial derivative of x with respect to 0.
We know that the derivative of x to the eighth is 8x to the seventh.
So f prime of x is equal to 5 times, and what 's the derivative of x squared?
Because we just took the derivative of x squared and we figured out 2x.
The derivative of x to the minus 2 is minus 2x to the minus 3.
I know that if I take the derivative of x squared, that simplifies it.
The derivative of X f with respect to time thus is Q / ( φA ).
So then what 's the derivative of x to the fifth?
So the derivative of x is 1 . times y to the negative 1 plus the derivative of y -- so.
So that 's 2x times the derivative of x with respect to time.
Well, the derivative of x with respect to x is just 1.
With regards to derivatives, the derivative of x to the k, is k * x to the k-1.
Well, the derivative of x squared is still 2x.
That 's super easy . The derivative of x is just 1.
The derivative of x is 1.
And what 's the derivative of x with respect to t?
Because the derivative of x to the fifth is 5x to the fourth, right?
Well, velocity is this derivative of x with respect to time, right?
Well the derivative of x squared plus 2 once again is 2x plus 0.
And what 's the derivative of x squared with respect to x?
And the derivative of x is just 1.
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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
