Integrate \displaystyle{y} from \displaystyle{x}={0} to \displaystyle{x}={k} to get \displaystyle{R}={2}-{2}{e}^{{-{k}}} . Explanation: We know that the area under a curve can be ...

Slicing to cylindrical-shell elements for integration gives approximation only. Circular-annular elements are used. To be continued, in the 2nd answer. Explanation: See graph to see the area that ...

I found: \displaystyle{y}=-{2}{x}-\frac{{1}}{{2}}{\left[{\ln{{\left(\frac{{1}}{{2}}\right)}}}-{1}\right]} Explanation: The tangent line will have slope equal to the derivative of your function: ...

The solution to this equation can be expressed in terms of the Lambert-W function. e^{-x} = x 1 = xe^x x = W(1) \approx 0.567 Note that the last step is by definition.

We do indeed want \int_0^1 -\pi \ln y\,dy.\tag{1} The logarithm blows up as y approaches 0 from the right, so we want to find (if it exists) \lim_{\epsilon\to 0^+} \int_\epsilon^1-\pi\ln y\,dy.\tag{2} ...

First we can rewrite g(x,y) =( x^2+y^2)e^{-x} = x^2e^{-x}+y^2e^{-x}. Now we compute the gradient of g: \nabla g = (2xe^{-x}-x^2e^{-x}-y^2e^{-x},2ye^{-x}) and we are looking for the points (x,y) ...