Douglas K. · mason m Jun 10, 2017 \displaystyle{\frac{{{d}}}{{{d}{x}}}}{\left({\frac{{{4}{x}^{{{4}}}-{2}{x}}}{{{4}{x}^{{{4}}}+{2}{x}}}}\right)}= A common factor of \displaystyle\frac{{{2}{x}}}{{{2}{x}}}={1} ...

For convenience let us rewrite x,\partial_x with a,b so [a,b]=x\partial_x-\partial_x x=-1 (in the operator sense on the Schwartz space). Lemma. For all n\in\mathbb N [(a+b)^n,a-b]=2n(a+b)^{n-1} ...

cos(2x) is a chain of two functions f(x)=2x and g(x)=cos(x) You have to calculate the derivate of g(f(x)) and for this, you need the chain rule. The example f(x)=3x^2 can be derivated with ...

The answer sheet uses t for time. Then, rate at which x changes with respect to time is \frac{dx}{dt}, and rate at which \frac{1}{x} changes with respect to time is \frac{d}{dt}\frac{1}{x}. ...

It should be \int{\frac{x}{\sqrt{1+x^2}}*x^2dx} = x^2\sqrt{1+x^2} - 2\cdot \frac{(1+x^2)^{3/2}}{3} + C Use x^2\sqrt{1+x^2}=(x^2+1-1)\sqrt{1+x^2}=(1+x^2)^{3/2}-(1+x^2)^{1/2} to match with the ...

Note that derivating both side and using chain rule for LHS we have (y(x))^n=x\implies n\cdot (y(x))^{n-1}\cdot y'(x)=1\implies y'(x)=\frac1n(y(x))^{1-n}=\frac1n x^{\frac1n-1} and similarly for x^\frac{p}{q} ...