I'm assuming you're coming from single variable calculus. You can rearrange the equation of the line to be y = -x - 7. You know the slope is of the tangent line is -1. Now you simply need to find ...

For \displaystyle{y}=\frac{{x}^{{2}}}{{{2}{x}+{2}}} , there are no inflection points, but there is a vertical asymptote at \displaystyle{x}=-{1.} Explanation: Inflection points are the ...

\frac{dz}{dx} = 1+\frac{z^2}{2} 2\int \frac{dz}{2 + z^2} = x The LHS can be integrated with a tangent sub after a little manipulation.

The transform equations to use for rotating any curve are x' = (x \cos θ - y \sin θ) y' =(x \sin θ + y \cos θ) (These basically rotate the axes, but when we view them with static axes the ...

When you apply indefinite integration, you need to add a "{}+C\," (or whatever letter you want) at the end; this is rather infamous for tripping up students. In your problem this gives -\frac{1}{y}=\frac{x^2}{2}+C~~\implies~~ y=\frac{1}{-(x^2/2+C)}=\frac{2}{-x^2-2C}. ...

There are infinitely many solutions, of course. Indeed, all the functions of the form y_s(x) = \left\{ \begin{aligned} &0 &&\text{ if } x\leq s\\ &(x-s)^3 &&\text{ if } x > s \end{aligned} \right. ...