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Importance of anti-differentiation in integral calculus?
If F(x) is a function, and F ‘(x) = f(x), then F(x) is the antiderivative (or indefinite integral) of f(x) It is the cornerstone of integral calculus and is used for areas, volumes, lengths and so much more!
How do you solve this question Integrate sinz from z 1 i to 20 30i?
1) First you get the anti-derivative of sin z. This one is easy; you can look it up in the most basic standard tables of integrals. 2) Use the fundamental theorem of calculus: a. Calculate the antiderivative function for the upper limit. b. Calculate the antiderivative function for the lower limit. c. Subtract the answer of part "a" minus the answer of part "b".
What is an antiderivative?
It is an inverse function of a derivative, also known as an integral.
What you say if a function whose derivative and antiderivative is same?
That means that either the function is equal to zero everywhere (y = 0), or it is the exponential function (y = ex).
What is composite function in calculus?
composite of a function is fog(x)=f(g(x))
What is the fundamental theory of calculus?
The fundamental theorum of calculus states that a definite integral from a to b is equivalent to the antiderivative's expression of b minus the antiderivative expression of a.
What is an antidifferentiation?
An antidifferentiation is a process of calculating the antiderivative in calculus.
What is the antiderivative of zero?
The antiderivative of a function which is equal to 0 everywhere is a function equal to 0 everywhere.
Importance of anti-differentiation in integral calculus?
If F(x) is a function, and F ‘(x) = f(x), then F(x) is the antiderivative (or indefinite integral) of f(x) It is the cornerstone of integral calculus and is used for areas, volumes, lengths and so much more!
How integration is reverse process of differentiation?
For example, the derivate of x2 is 2x; then, an antiderivative of 2x is x2. That is to say, you need to find a function whose derivative is the given function. The antiderivative is also known as the indifinite integral. If you can find an antiderivative for a function, it is fairly easy to find the area under the curve of the original function - i.e., the definite integral.
How do you solve this question Integrate sinz from z 1 i to 20 30i?
1) First you get the anti-derivative of sin z. This one is easy; you can look it up in the most basic standard tables of integrals. 2) Use the fundamental theorem of calculus: a. Calculate the antiderivative function for the upper limit. b. Calculate the antiderivative function for the lower limit. c. Subtract the answer of part "a" minus the answer of part "b".
What is an antiderivative?
It is an inverse function of a derivative, also known as an integral.
Let f be an odd function with antiderivative F. Prove that F is an even function. Note we do not assume that f is continuous or even integrable.?
An antiderivative, F, is normally defined as the indefinite integral of a function f. F is differentiable and its derivative is f.If you do not assume that f is continuous or even integrable, then your definition of antiderivative is required.
Can a function have more than one antiderivative?
yes, look at the function f(x)=3x^2 The antiderivative is x^3+C where C is the constant and is more than one value for C. In fact, 3x^2 will have an infinite number of antiderivatives.
What you say if a function whose derivative and antiderivative is same?
That means that either the function is equal to zero everywhere (y = 0), or it is the exponential function (y = ex).
What is the antiderivative of 2x?
The antiderivative of 2x is x2.
What is integral in math?
There are two main definitions. One defines the integral of a function as an "antiderivative", that is, the opposite of the derivative of a function. The other definition refers to an integral of a function as being the area under the curve for that function.
