Find the exact values of the cosine and sine of the angle. Then find the decimal values. Show your work step by step.

To find the exact values of the cosine and sine of the angle, we will use the unit circle.

Step 1: Convert the angle from degrees to radians.
To convert from degrees to radians, we use the formula: radians = (degrees × π) / 180
For 315°, the radians would be:
radians = (315 × π) / 180 = (7π/4) radians

Step 2: Look at the unit circle and find the point corresponding to (7π/4) radians.
The point on the unit circle that corresponds to (7π/4) radians is located at the angle (135° on the unit circle).

Step 3: Find the cosine and sine values of the angle.
The cosine value is given by the x-coordinate of the point on the unit circle, and the sine value is given by the y-coordinate of the point.

For the angle 135°, the cosine and sine values are:
cos(135°) = -√2/2
sin(135°) = √2/2

Step 4: Convert the exact values to decimal values.
Using a calculator, we can find the decimal values:
cos(135°) ≈ -0.707
sin(135°) ≈ 0.707

Therefore, the exact values of the cosine and sine of the angle 0 = 315° are:
cos(315°) = -√2/2
sin(315°) = √2/2

The decimal values of the cosine and sine of the angle 0 = 315° are approximately:
cos(315°) ≈ -0.707
sin(315°) ≈ 0.707