dy/dθ = 2(cos θ - cos 2θ) dx/dθ = 2(sin 2θ - sin θ) use formulae : cos A - cos B = -2sin((A+B)/2)sin((A-B)/2) sin A - sin B = 2cos((A+B)/2)sin((A-B)/2) and finally use: (dy/dθ)/(dx/dθ) = (dy/dx) ...

An inductive hypothesis is: T_n=2^{n-1}x^n+f_n(x) where \deg f\le n-1. Addendum: From T_n=2^{n-1}x^n+f_n(x) we have T_{n+1}=2^nx^{n+1} +2xf_n(x)-2^{n-2}x^{n-1}-f_{n-1}(x) and evidently \deg f_{n+1}(x)\le n ...

The points where the parametric curve described by (x,y) = (r\cos\theta, r\sin\theta) has a vertical tangent line are calculated as the solutions to \frac{dx}{dy} = 0 = \frac{dx/d\theta}{dy/d\theta} \tag{1} ...

You can simply use the standard transformation from Cartesian coordinates to polar coordinate: Given r>0\;\text{and}\;\theta\in [0,2\pi) x=r\cos(\theta),\tag{x} y=r\sin(\theta)\tag{y} ...

(after some wrangling with trying to find a way to eliminate the parameter): I think that, for the region \ x = 0 \ \text{to} \ x = \frac{1}{4} \ , \ you do want a subtractive approach, but it ...

The first one is: \ln(-ei)=\ln(e)+ln(-i)=1+\ln(i^{-1})=1-\ln(i)=1-\ln(e^{-i\pi/2})=1+i\pi/2. The second is \ln\sqrt 2.e^{i.\pi/4}=\ln\sqrt2+\ln e^{i\pi/4}=\dfrac{\ln2}{2}+\dfrac{i\pi}{4}=\dfrac{\ln2+2\pi i}{4} ...