\displaystyle{r}^{{2}}-{2}{\left({2}{\cos{{\left(\theta\right)}}}+{3}{\sin{{\left(\theta\right)}}}\right)}{r}+{12}={0} Explanation: The pass relationships \displaystyle{x}={r}{\cos{{\left(\theta\right)}}},{y}={r}{\sin{{\left(\theta\right)}}} ...

\displaystyle{r}={3}{\cos{\theta}}+{2}{\sin{\theta}} . Explanation: Use the transformation \displaystyle{\left({x},{y}\right)}={\left({r}{\cos{\theta}},{r}{\sin{\theta}}\right)} . The given ...

Vertex - \displaystyle{\left({3},{0}\right)} Focus - \displaystyle{\left({3},-{4}\right)} Directrix - \displaystyle{y}={4} Explanation: Given - \displaystyle{\left({x}-{3}\right)}^{{2}}=-{16}{y} ...

Knowing the max/min (vertex and direction) and the intercepts, a rough parabolic shape can be drawn connecting them. Explanation: The intercepts (roots of the equation) and vertex (maximum or minimum ...

If I understand correctly your question is why (x-h)^2+(y-k)^2=r^2 represents a circle. Simple. Take (positive) sqrt on both sides, then equation says distance between all points (x,y) from a ...

Solution is x=-2, y=-2. Let us call S(x,y)=x^2+y^2-4x-6y. Let us analyze our condition |x+y|+|x-y|=4. If we now rise this to quadrat : (|x+y|+|x-y|)^2=4^2 x^2+y^2+2xy+x^2+y^2-2xy+2x^2-2y^2=4x^2=4^2 ...