\displaystyle{R}={2}\sqrt{{3}}{\quad\text{and}\quad}\alpha=\frac{\pi}{{6}}\in{\left({0},\frac{\pi}{{2}}\right)} . Explanation: Let, \displaystyle{f{{\left(\theta\right)}}}={2}{\cos{\theta}}+{2}{\cos{{\left(\theta+\frac{\pi}{{3}}\right)}}} ...

The book is not saying that the maximum value is 10, it's only saying the maximum value is no greater than 10. Similarly, the minimum isn't necessarily -4, it's just no less than that. ...

the slope of the tangent is \displaystyle{2.57} Explanation: \displaystyle{r}={2}\theta+{3}{\cos{{\left(\frac{\theta}{{2}}-\frac{{{2}\pi}}{{3}}\right)}}} \displaystyle\frac{{{d}{r}}}{{{d}\theta}}={2}-\frac{{3}}{{2}}{\sin{{\left(\frac{\theta}{{2}}-\frac{{{2}\pi}}{{3}}\right)}}} ...

Equation of tangent line \displaystyle{y}=-{3.248347}{x}-{18.107412} Explanation: \displaystyle{\frac{{{\left.{d}{y}\right.}}}{{{\left.{d}{x}\right.}}}}={\frac{{{\frac{{{\left.{d}{y}\right.}}}{{{d}\theta}}}}}{{{\frac{{{\left.{d}{x}\right.}}}{{{d}\theta}}}}}} ...

The slope \displaystyle{m}\approx-{1.34} Explanation: The reference Tangents with Polar Coordinates gives us the equation: \displaystyle\frac{{\left.{d}{y}\right.}}{{\left.{d}{x}\right.}}=\frac{{\frac{{{d}{r}}}{{{d}\theta}}{\sin{{\left(\theta\right)}}}+{r}{\cos{{\left(\theta\right)}}}}}{{\frac{{{d}{r}}}{{{d}\theta}}{\cos{{\left(\theta\right)}}}-{r}{\sin{{\left(\theta\right)}}}}}\ \text{ [1]} ...

To solve this conditional trigonometric equation 2cos[θ – (π/3)] = cos[θ + (π/2)], we’ll begin by utilizing some trigonometric identities. Utilizing the “Difference of Two Angles” and the “Sum of ...