36 A strange non-linear differential equation【一个奇怪的非线性微分方程】 11:05 One of my favorite integrals (so far)【我最喜欢的积分之一(到目前为止)】 11:37 This double integral will make you love calculus【这个二重积分会让你爱上微积分】 17:38 A fun little integral exploration【一个有趣...
我们要用费曼方法来解决这个问题 13:33 Seperable ordinary differential equations【可分离常微分方程】 06:39 Solving the HW problem int (1(sinx + secx))【解决HW问题】 08:53 An awesome calculus result I cooked up【我编造了一个很棒的微积分结果】 14:36 A strange non-linear differential equation...
One of the reasons why a definite integral becomes an improper integral is when one or both of the limits reach infinity. An Integral calculus calculator can be used tocalculate improper integrals. This integral is then solved by turning it into a problem of limits where c happens to approach...
翻译结果4复制译文编辑译文朗读译文返回顶部 This article points out one of the important theorems in pre-school, and address the obstacles that a 翻译结果5复制译文编辑译文朗读译文返回顶部 This article promotes in integral calculus the important theorem, has solved this barrier ...
Tags Calculus Calculus ii Improper integral Integral In summary, the integral ∫(0 to ∞) [dv/((1+v^2)(1+tan^-1(v))] can be evaluated by using the substitution u = 1 + arctan(v). This will change the bounds of the integral to 1 to ∞, which will result in the correct answe...
I try to understand how to use the integral to solve a problem not to integrate an equation. To solve this problem you have to solve a differential equation, which in this case you can do by integrating twice. The differential equation is . Integrate both sides to get ds/dt, the ...
As integral equations incorporate boundary conditions, they can in certain cases be solved by determining their global extrema through the calculus of variations, which converts the problem into the solution of a local differential equation. Fredholm equations contain an integral with constant limits, ...
We can use definite integrals to find the area under, over, or between curves in calculus. If a function is strictly positive, the area between the curve of the function and the x-axis is equal to the definite integral of the function in the given interval. In the case of a negative ...
The integral can be solved by using the substitution method where we will rearrange the expression and apply the t-substitution and then use the standard result to find the antiderivative. Answer and Explanation:1 To find the problem we will proceed as ...
Integration is an important concept in mathematics and, together with differentiation, is one of the two main operations in calculus. The theorem linking these concepts together is called the fundamental theorem of calculus. This theorem simply asserts that a definite integral can be calculated by ...