You cannot prove it. It is not always true. But it is true that \displaystyle{\sin{{\left({a}+{b}\right)}}}+{\sin{{\left({a}-{b}\right)}}}={2}{\sin{{a}}}{\cos{{b}}} Explanation: \displaystyle{\sin{{\left({a}+{b}\right)}}}={\sin{{a}}}{\cos{{b}}}+{\cos{{a}}}{\sin{{b}}} ...

Bill K. Apr 5, 2015 This is really a calculus problem, and the principal unit normal vector is not the same as a normal vector to the plane the curve sits in. The velocity vector is \displaystyle\vec{{{v}}}{\left({t}\right)}=\vec{{{r}}}'{\left({t}\right)}=-{3}{\sin{{\left({3}{t}\right)}}}\hat{{{i}}}+{6}{\cos{{\left({3}{t}\right)}}}\hat{{{j}}} ...

First, find the acceleration: \vec a (t)=\ddot {\vec r}(t)=-45\cos (3t) \vec i -45 \sin (3t) \vec k Next, find the direction that is tangent to the parametric curve at time t: \vec \tau (t)= \dot {\vec r}(t)=-15\sin (3t) \vec i +6 \vec j + 15 \cos (3t) \vec k ...

It is known extreme curvatures occur at ends of major/minor axes for each of xy,yz,zx sections.This fact should be used to evaluate only at the 6 principal points. Differentiating x^2/a^2+y^2/b^2=1 ...

You've obtained the cross product correctly (It would have been easier to do the exercise if you would have used the identity \sin^2(u)+\cos^2(u)=1 , an identity one should never forget!): \mathbf{r}'(t)\times \mathbf{r}''(t)=\begin{bmatrix} -294\sin(7t) \\ -294\cos(7t) \\ -343\sin^2(7t)-343\cos^2(7t) \end{bmatrix}=\begin{bmatrix} -294\sin(7t) \\ -294\cos(7t) \\ -343 \end{bmatrix} ...

The differential equation X(f) = 2f, \tag 1 where X is the vector field X = x_1^2 \dfrac{\partial}{\partial x_1} - x_2^2 \dfrac{\partial}{\partial _2}, \tag 2 may also be written in the form \dfrac{\partial f}{\partial t} = 2f, \tag 3 ...