Guide: \begin{align}\int_0^{100} \left[\sqrt{x} \right]\, dx &= \sum_{i=1}^{10} \int_{(i-1)^2}^{i^2} \left[\sqrt{x} \right]\,dx \\ &=\sum_{i=1}^{10}(i^2-(i-1)^2)\sqrt{(i-1)^2}\\ &= \sum_{i=1}^{10} ( ...

One important property of the action of vector fields on functions is that it is local : the value of X(f) at p depends only on the value of X at p. (This is a consequence of the C^\infty(M) ...

I will consider the unit sphere (a=1). Let w:=\tfrac{v}{\|v\|}. As p \perp w, the curve defined by \tag{1}s(t)=\cos(t)p+\sin(t)w goes, at t=0, through point p (s(0)=\cos(0)p+\sin(0)w=p ...

-\int_0^1 \frac{1}{\sqrt{x}} \phi' dx = - \bigg(\frac{1}{\sqrt{x}}\bigg) (\phi - \phi(0))\bigg|_0^1 + \int_0^1 \frac{-1}{2x^{3/2}}(\phi(x) - \phi(0)) dx =\\ =-(\phi(1) - \phi(0)) + \int_0^1 \frac{-1}{2x^{3/2}}(\phi(x) - \phi(0)) dx

I think your parametrisation must be y=t and x=t^{3}! The curve will hence be r(t) = (t^{3},t) and you want to find the work of the vector field (t^{2},t^{3}). Hence the integral \int\limits{-1}^{1} (t^{2},t^{3}) \cdot (3t^{2},1) dt = \int\limits_{-1}^{1} 3t^{4}dt=\frac{6}{5}

We have f^{-1}(t)=\beta^{1/(\beta+1)}t^{-1/(\beta+1)}, so \dfrac{d}{dt}f^{-1}(t)=-\beta^{1/(\beta+1)}\dfrac{1}{\beta+1}t^{-1/(\beta+1)-1}, there is a negative sign here, so \begin{align*} ...