Examples of 'antiderivative' in a sentence
Meaning of "antiderivative"
Antiderivative (adjective): a mathematical term referring to the reverse process of differentiation, used in integral calculus
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- A function whose derivative is a given function; an indefinite integral
How to use "antiderivative" in a sentence
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antiderivative
That would just be the antiderivative of x squared.
The antiderivative of this is the natural log.
So it would reappear when we take the antiderivative.
I just took the antiderivative of both sides.
So let us say if we were trying to find the antiderivative.
We found the antiderivative of both of these expressions.
This is going to be tau plus the antiderivative of this.
The antiderivative within the parentheses.
So this is going to be equal to the antiderivative of u to the sixth.
The antiderivative of e to the x is just e to the x.
And therefore we can say that is an antiderivative of.
And then the antiderivative of the second function.
We do not know how to calculate the antiderivative of xcosx.
So the antiderivative of sine of t is negative cosine of t.
And we could take the antiderivative that way.
See also
And the antiderivative of that g of x is also.
So let us see if we can take the antiderivative of this.
Or the antiderivative of cosine of x is just going to be equal to sine of x.
We want to take the antiderivative of g prime of x.
The antiderivative is an important concept in integration.
Find the most general antiderivative of the function.
The antiderivative of e to the x cosine of x dx.
This just equals the antiderivative.
A function is an antiderivative of on an interval if for all in.
Let us think about the antiderivative.
Find an antiderivative of the given function.
And now let me take the antiderivative of this.
So the antiderivative of cosine of x is sine of x.
And this right over here is our antiderivative.
So let us take the antiderivative of x to the fifth power.
All continuous functions have an antiderivative.
We figured out the antiderivative of the natural log of x.
We are now going to use our conditions on the antiderivative to evaluate.
Any primitive or antiderivative of a polynomial function is also a polynomial function.
Integral of the integrand is the antiderivative.
The antiderivative of a function is often called the indefinite integral.
Any continuous function has an antiderivative.
Antiderivative of the natural logarithm.
The most difficult step is usually to find the antiderivative of.
And now you take the antiderivative of this with respect to y.
Welcome to the presentation on the indefinite integral or the antiderivative.
Indefinite integrals are antiderivative functions.
The antiderivative is cosine pi x.
I think you know how to take the antiderivative of this.
It was the antiderivative of cosine of x.
And we are going to take the antiderivative.
I took the antiderivative of it.
We are already familiar with it as an antiderivative.
So we just use the same antiderivative rules we have always used.
So we will add that back when we take the antiderivative.
