Question

Find coterminal angles with 420° and 370° in radians.

A. (a) 60°; (b) 1.22π
B. (a) 60°; (b) 0.22π
C. (a) 240°; (b) 1.22π
D. (a) 240°; (b) 0.22π

Answer 1

To find coterminal angles with 420° and 370° in radians, convert the degrees to radians and find angles with the same terminal side. The coterminal angles are approximately 2.32π and 2.04π radians.

Step-by-step explanation:

To find the coterminal angles with 420° and 370° in radians, we need to convert these angles to radians and then find angles that have the same terminal side.

To convert degrees to radians, we use the formula:

radians = (degrees × π) / 180

Using this formula, we can find:

420° in radians = (420 × π) / 180 ≈ 2.32π

370° in radians = (370 × π) / 180 ≈ 2.04π

Therefore, the coterminal angles with 420° and 370° in radians are approximately 2.32π and 2.04π respectively.