So the acute angle between the vectors is \displaystyle{7.122}° (3sf) Explanation: The angle \displaystyle\theta between two vectors \displaystyle\vec{{A}} and \displaystyle\vec{{B}} ...

u is not a scalar multiple of v. So, they are not parallel, The scalar product \displaystyle{u}.{v}={0} . Therefore, they are orthogonal. Explanation: \displaystyle{u}={<}{2},-{2}{>}{\quad\text{and}\quad}{v}={<}-{1},-{1}{>} ...

How can you do that when Vs and Vd are two different parameters? One must keep track of the variables. The power delivered to a resistor is P_R = V_R \cdot I_R = V_R \left( \frac{V_R}{R} \right) = \frac{V^2_R}{R} ...

There is a very simple explanation for this confusion. It is called a typo, although it leads to a very teachable moment: When you doubt the result in a textbook or a paper, the very first thing you ...

\pi^2 t^{-2} need clarification as to what units these are in. I am going to assume units are seconds and meters and so Angular momementum = \pi^2 m/sec^2 = v^2/r Length of lap = Circumference = 2 \pi r ...

To answer my own question, after looking at Convergence of the improper integral \int_{0}^{\pi/2}\tan^{p}(x) \; dx I tried the substitution u = i-r and got \int_{a + bt^2}^{i} \frac{r \left(i-r\right)^{\frac{3}{2}\left(i-1\right)}}{\left(j+i-R-r\right)^{\frac{3}{2}\left(j+i-1\right)}}\mathrm{d} r =\\\frac{2\left(-a-b t^2+i\right)^{\frac{3 i}{2}-\frac{1}{2}}}{\left(9 i^2-1\right) \left(-\frac{a+b t^2-i-j+R}{j-R}\right)^{3/2}} \\ \left(\left(\frac{1}{-a-b t^2+i+j-R}\right)^{\frac{3}{2} (i+j-1)} \left(1-\frac{a+b t^2-i}{j-R}\right)^{\frac{3 (i+j)}{2}} \\ \left(i (3 i+1) \, _2F_1\left(\frac{1}{2} (3 i-1),\frac{3}{2} (i+j-1);\frac{1}{2} (3 i+1);\frac{b t^2+a-i}{j-R}\right) \\ +(3 i-1) \left(a+b t^2-i\right) \, _2F_1\left(\frac{1}{2} (3 i+1),\frac{3}{2} (i+j-1);\frac{3 (i+1)}{2};\frac{b t^2+a-i}{j-R}\right)\right)\right) ...