Microsoft Math Solver

The change in centripetal force is \displaystyle={69.1}{N} Explanation: The centripetal force is \displaystyle{F}={m}{r}\omega^{{2}} The mass is \displaystyle{m}={4}{k}{g} The radius ...

You have forgotten that the x y^2 term requires a product rule when differentiating

The answer they gave \left(\frac {5 \sqrt{26}}{26}\right) is the value for \sin \dfrac {\theta}{2} = \pm \sqrt {\dfrac {1-\cos \theta}{2}} however they're looking for \cos \dfrac {\theta}{2} = \pm \sqrt {\dfrac {1+\cos \theta}{2}} ...

The conditions of the equation are x+3>0 and 12x+1>0. which could be replaced by x>\frac {-1}{12} but \frac {-61}{12}<\frac {-1}{12} and is not a solution.

Powers of z, right? One of them being a constant times z^{-1}, right? Just use geometric series: (z-1)^{-1}=-1/(1-z)=-\sum_{n\ge0}z^n, so that the troublesome part is -\sum_{n\ge-1}z^n, and ...

I don't see a mistake in your solution. I think your solution is right: Let \frac{x}{x^2-5x+9}=y. Hence, the equation yx^2-(5y+1)x+9y=0 has real roots. For y=0 we get x=0. But, for y\neq0 ...