About Us About Us Careers Contact Us Search Find an Online Tutor Now Ask a Question For Free Login Calculus Derivative Anti Derivative Mr C. asked • 10/21/19 What is an antiderivative of f(x) = x^3 + cos x?Follow • 1 Add comment 1 Expert Answer Best Newest Oldest Brad M. ...
Understand what an antiderivative is and what antiderivative rules are. Use various antiderivative formulas and learn how to do antiderivatives. See the antiderivative chart for common functions and practice solving basic antiderivatives examples.
试题来源: 解析 A 结果一 题目 What is the particular antiderivative of whose x-intercept is 3? ( ) A. B. C. D. 答案 A相关推荐 1What is the particular antiderivative of whose x-intercept is 3? ( ) A. B. C. D. 反馈 收藏 ...
Having an antiderivative {eq}F(y) {/eq} any other function of the form {eq}F(y) + C {/eq} where C is a constant will also be an antiderivative as it also satisfies {eq}(F(y) + C)' = f(y) {/eq}. C is called a constant of integration. That ...
What is the antiderivative of (2e^-x)^2? What is the antiderivative of f(x) = x^4 - 2\sqrt x + \frac{3}{x^3}? What is the antiderivative of (x^2 - 70)/2 ? What is an antiderivative of f (x) = x^3 + cos x?
The antiderivative rules in calculus are basic rules that are used to find the antiderivatives of different combinations of functions.
Inductance is defined as the property of an electric conductor which causes an electromotive force that is generated due to a change in the current flow. There are two types of inductance: self-inductance and mutual inductance.
Adifferentialequationisanyequationcontainingoneormorederivatives. Thesimplestdifferentialequation,therefore,isjustausualintegration problem y′=f(t). Comment:Thesolutionoftheaboveis,ofcourse,theindefiniteintegralof f(t),y=F(t)+C,whereF(t)isanyantiderivativeoff(t)andCisan ...
The force which acts on an object without coming physically in contact with it is called non contact force. Learn about its types i.e. Gravitational Force, Magnetic Force & Electrostatic Force.
Next, note that any Schwartz function of integral zero has an antiderivative which is also Schwartz, and so annihilates all zero-integral Schwartz functions, and thus must be a scalar multiple of the usual integration functional. Using the normalisation (4), we see that must therefore be the ...