How can we use addition or subtraction formulas to find the exact value of sin 255°?

To find the exact value of sin 255°, we can utilize the sine addition formula. First, let’s express 255° in terms of angles for which we know the sine values. We can rewrite 255° as:

255° = 180° + 75°

Now, we can apply the sine addition formula:

sin(A + B) = sin A cos B + cos A sin B

Here, A = 180° and B = 75°.

From trigonometric values, we know:

• sin 180° = 0
• cos 180° = -1
• sin 75° = sin(45° + 30°) = sin 45° cos 30° + cos 45° sin 30°
• (From known values: sin 45° = √2/2, cos 30° = √3/2, cos 45° = √2/2, sin 30° = 1/2)
• sin 75° = (√2/2)(√3/2) + (√2/2)(1/2) = (√6 + √2)/4
• cos 75° = cos(45° + 30°) = cos 45° cos 30° – sin 45° sin 30°
• cos 75° = (√2/2)(√3/2) – (√2/2)(1/2) = (√6 – √2)/4

Now substituting the values back into our formula, we have:

sin 255° = sin(180° + 75°) = sin 180° cos 75° + cos 180° sin 75°

Plugging in the values:

sin 255° = 0 * cos 75° + (-1) * sin 75°

sin 255° = 0 – (√6 + √2)/4 = -(√6 + √2)/4

Thus, the exact value of sin 255° is:

sin 255° = -rac{√6 + √2}{4}