\displaystyle{h}{\left({f{{\left(-{3}\right)}}}\right)}\stackrel{\sim}{=}{0.000017} Explanation: When we evaluate a function, we substitute in a value. \displaystyle{h}{\left({f{{\left({x}\right)}}}\right)} ...

Presumably I can assume that a\neq0. Yes, the splitting field of h is included in the splitting field of g. The key is that the polynomial f(x)=x^p-ax= xh(x)=g(x)+b is a so called ...

Your idea is correct. With a bit different notation we have: f(x)=x^2+1 \qquad g(x)=-2x^2-3 As you noted a common tangent is a line that passes thorough the points: (x_1,f(x_1)) \qquad (x_2,g(x_2)) ...

Let us put t=x-1 or x=t+1, thus e^{3x^2}=e^{3t^2+6t+3} =e^3e^{3t^2+6t} =e^3.(1+3t^2+6t+O(t^2)) =e^3.(1+6t+O(t^2)) =e^3(1+6(x-1))+O((x-1)^2). so no error.

Consider the following example \begin{align} a(x) = \begin{pmatrix} h(x) \\ 1 \end{pmatrix} \end{align} where h(x) is the heavside function. Take f(x) = (0, x)^T, then we see \begin{align} ...

From (x-2)^2\cdot(x+3)^2=2(x^2+x+6) you do (x-2)(x+3)=x^2+x-6 twice on the left to get what you want. Without knowing the answer I am not sure I would see that.