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A student is given that point P(a, b) lies on the terminal ray of angle , which is between radians and 2 radians. The student uses the steps below to find cos . Step 1 Find the quadrant in which P(a, b) lies: P(a, b) is in Quadrant IV. Step 2 Use the point and the Pythagorean theorem to determine the value of r: , but since r must be positive, . Step 3 Determine cos . , where a and b are positive. Which of the following explains whether the student is correct? The student made an error in step 3 because a is positive in Quadrant IV; therefore, . The student made an error in step 3 because . The student made an error in step 2 because r is negative in Quadrant IV; therefore, . The student made an error in step 2 because using the Pythagorean theorem gives .

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Answer: A

Step-by-step explanation: Just took the test on edg

The option shows that the place where the student is incorrect in the ray of angle is The student made an error in step 3.

What is a ray of angle?

It should be noted that a ray of angle simply means a part of line that has a single endpoint.

In this case, the place where the student is incorrect in the ray of angle is The student made an error in step 3. The angle should be firmed when the rays are joined together at their starting points.

Learn more about angles on:

https://brainly.com/question/25716982

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