例句與造句

1. The combination was achieved by John Wallis, Isaac Barrow, and second fundamental theorem of calculus around 1670.
2. An important consequence, sometimes called the " second fundamental theorem of calculus ", allows one to compute integrals by using an antiderivative of the function to be integrated.
3. On the integral side, James Gregory, influenced by Fermat's contributions both to tangency and to quadrature, was then able to prove a restricted version of the second fundamental theorem of calculus in the mid-17th century.
4. The second part of the theorem, sometimes called the "'second fundamental theorem of calculus "', is that the definite integral of a function can be computed by using any one of its infinitely-many antiderivatives.
5. If " F " is differentiable everywhere ( or with countable many exceptions ), the derivative " F " 2 is Henstock Kurzweil integrable, and its indefinite Henstock Kurzweil integral is " F " . ( Note that " F " 2 need not be Lebesgue integrable . ) In other words, we obtain a simpler and more satisfactory version of the second fundamental theorem of calculus : each differentiable function is, up to a constant, the integral of its derivative:
6. It's difficult to find second fundamental theorem of calculus in a sentence. 用second fundamental theorem of calculus造句挺難的