I found: \displaystyle\frac{{1}}{{2}} Explanation: If you try the limit directly you'll get the indeterminate form \displaystyle\frac{{0}}{{0}} ; To avoid this I 'd try a little ...

Ok, as it stands the integral is not well defined. To give it a meaning we somehow need to regularize it. One way of doing that is to define the value of the integral as (\delta\rightarrow 0_+) I\equiv\frac{1}{2}\left(\int_0^{\infty+i\delta}e^{-t/g}\frac{1}{\sqrt{1-2 t x}}dt+\int_{\infty-i\delta}^0e^{-t/g}\frac{1}{\sqrt{1-2 t x}}dt\right) ...

In step 4 you left off a +1 in one factor in the denominator. It should be \displaystyle\frac{1+h-1}{h(\sqrt{1+h}+1)}. Then \lim_{h\to 0}\frac{1+h-1}{h(\sqrt{1+h}+1)}=\lim_{h\to 0}\frac{1}{\sqrt{1+h}+1}=\lim_{h\to 0}\frac{1}{\sqrt{1+0}+1}={1\over 2}.

Your teacher has left out some justification, which is probably why you are confused. In general, we have the following identity for all real x: \sqrt{x^2}=|x|.\tag{1} Also, for nonnegative ...

As you differentiate it, the gradient should be -3 =- \frac{mn}2 (1+n)^{-\frac12} Your mistake is you forgot to apply chain rule and omitted a -n factor on the RHS. From the first equation, we ...

Note that \frac {1+i}{1-i}=\frac {(1+i)(1+i)}{(1-i)(1+i)}=\frac {(1+i)^2}{1-i+i-i^2}=\frac {(1+i)^2}{2}\quad\left(=\frac {1+2i+i^2}{2}=i\right). (the further simplification to i does not help ...