What is the antiderivative of the equation \int \left ( \frac{x}{ln}(x) \right ) ? What is the antiderivative dy / dx = x / (x^2 + 36 )? Find the antiderivative of the function: f(x) = e^x + 3x - x^2 Find the antiderivative of the function. g(x) ...
How to find c in an anti-derivative? What is Anti-derivative of \frac{1}{y^2}? What is the anti-derivative of 2 sin x - tan 3x? What is the anti-derivative, R(t) for this equation? What is the anti-derivative of \sqrt{\cosh^{2}(x)}?
The antiderivative rules in calculus are basic rules that are used to find the antiderivatives of different combinations of functions. As the name suggests, antidifferentiation is the reverse process of differentiation. These antiderivative rules help us to find the antiderivative of sum or difference ...
Question: What is the most general antiderivative of the function shown below?g(x)=1+x+x2x2G(x)=2x12+23x32+25x52G(x)=x12+x32+x52+cG(x)=2x12+23x32+25x52+c: g(x)=1+x+x2x2 G(x)=2x12+23x32+25x52 G(x)=x12+x32+x52+c G(x...
In summary, an indefinite integral is the antiderivative of a given function and is represented as ∫f(x) dx. The indefinite integral of cos x is sin x + C, while the indefinite integral of sin x is -cos x + C. To integrate a fraction with trigonometric functions...
To find integration easily there is a table of integration containing all the standard formulas and one of them is the power rule of integration, which says: ∫xn dx=xn+1n+1; n≠−1 With the help of this standard integration formula we will solve the given problem....
Question: What is the exact value of {eq}\int_0^4 e^x \,dx {/eq}? Definite Integral: The definite integral of a function {eq}f(x) {/eq} over the interval {eq}[a,b] {/eq} {eq}\displaystyle \int_{a}^{b} f(x) \; dx {/eq} ...
The value of log e is equal to 0.4342944819. Log e is a constant term that gives the value of the logarithmic function log x, when the value of x is equal to e.
This paper defines what the continuous nonlinear numbers is and discusses the existence of nonlinear zeroes. The variation of continuous nonlinear numbers is explored with examples. In general, we need multiple graphical expressions to explain the variation of continuous nonlinear numbers. The nonlinear ...
Change in direction The Force has different effects, and here are some of them. Force can make a body that is at rest to move. It can stop a moving body or slow it down. It can accelerate the speed of a moving body. It can also change the direction of a moving body along with ...