$$ \left.\begin{array}{l} ext { Question } 3 \ ext { Use the identities for compound angles and simplify } \ ext { without a calculator. } \ 3.1 \cos 2 A \cos A-\sin 2 A \sin A \ 2 \cos A \ 3.2 \sin 3 \alpha \cos \alpha+\cos 3 \alpha \sin \alpha \ 1-2 A\end{array} ight) $$

Question

$$ \left.\begin{array}{l}	ext { Question } 3 \ 	ext { Use the identities for compound angles and simplify } \ 	ext { without a calculator. } \ 3.1 \cos 2 A \cos A-\sin 2 A \sin A \ 2 \cos A \ 3.2 \sin 3 \alpha \cos \alpha+\cos 3 \alpha \sin \alpha \ 1-2 A\end{array}ight) $$

UpStudy AI · Accepted Answer

We begin with the first expression.

### 3.1
We wish to simplify 
$$
\cos 2A \cos A - \sin 2A \sin A.
$$
Recall the cosine addition formula:
$$
\cos(X+Y) = \cos X \cos Y - \sin X \sin Y.
$$
If we let $$X = 2A$$ and $$Y = A$$, then
$$
\cos(2A + A)= \cos 2A \cos A - \sin 2A \sin A.
$$
Thus,
$$
\cos 2A \cos A - \sin 2A \sin A = \cos 3A.
$$

---

### 3.2
Next, we simplify
$$
\sin 3\alpha \cos \alpha + \cos 3\alpha \sin \alpha.
$$
Recall the sine addition formula:
$$
\sin(X+Y) = \sin X \cos Y + \cos X \sin Y.
$$
Let $$X = 3\alpha$$ and $$Y = \alpha$$. Then we have:
$$
\sin(3\alpha + \alpha) = \sin 3\alpha \cos \alpha + \cos 3\alpha \sin \alpha.
$$
Thus,
$$
\sin 3\alpha \cos \alpha + \cos 3\alpha \sin \alpha = \sin 4\alpha.
$$
3.1 simplifies to $$ \cos 3A $$. 3.2 simplifies to $$ \sin 4\alpha $$.

\( \left.\begin{array}{l}\text { Question } 3 \\ \text { Use the identities for compound angles and simplify } \\ \text { without a calculator. } \\ 3.1 \cos 2 A \cos A-\sin 2 A \sin A \\ 2 \cos A \\ 3.2 \sin 3 \alpha \cos \alpha+\cos 3 \alpha \sin \alpha \\ 1-2 A\end{array}\right) \)

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