Rewrite $\sin 57^{\circ}$ in terms of its cofunction.
Answer
Final Answer: \(\boxed{\sin 57^{\circ}}\) can be rewritten as \(\boxed{\cos 33^{\circ}}\).
Step 1 :Rewrite \(\sin 57^{\circ}\) in terms of its cofunction, which is cosine. The cofunction identity states that the sine of an angle is equal to the cosine of its complement.
Step 2 :Find the complement of \(57^{\circ}\), which is \(90^{\circ} - 57^{\circ} = 33^{\circ}\).
Step 3 :Therefore, \(\sin 57^{\circ}\) can be rewritten as \(\cos 33^{\circ}\).
Step 4 :The absolute difference between the two values is less than \(1 \times 10^{-9}\), which is a very small number close to zero. This means that the two values are practically equal.
Step 5 :Final Answer: \(\boxed{\sin 57^{\circ}}\) can be rewritten as \(\boxed{\cos 33^{\circ}}\).
