Math 361, Spring 2018, Assignment 11

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Quadratic formula.
Corollary of the quadratic formula concerning the roots of a quadratic polynomial ("If $p\in F[x]$ is quadratic and has roots in $E$ then the roots are contained in...")
Theorem relating constructible numbers to the coordinates of constructible points.
Theorem concerning sums, products, and inverses of constructible numbers ("The set $\mathcal{C}$ of constructible numbers is a...")

Consult a reference on trigonometry (for instance here) and review the trigonometric identities that express $\sin(\alpha+\beta)$ and $\cos(\alpha+\beta)$ in terms of $\sin(\alpha), \cos(\alpha), \sin(\beta),$ and $\cos(\beta)$.
Using the identities you reviewed above, derive the double-angle and triple-angle identities for $\cos(2\theta)$ and $\cos(3\theta)$. (You can look up these identities here.)
Put $\theta=72^{\circ}$. Using a picture if necessary, explain why $\cos(2\theta)=\cos(3\theta)$.
Show that $\cos(72^{\circ})$ is a root of the polynomial $4x^3-2x^2-3x+1$.
Find a root of the above polynomial other than $\cos(72^{\circ})$.
Find an exact expression for $\cos(72^{\circ})$.
Devise a compass and straightedge construction that produces a regular pentagon.

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