Math

QuestionFind 3 angles coterminal with 201201^{\circ}, including at least one negative and one positive angle.

Studdy Solution

STEP 1

Assumptions1. Coterminal angles are angles that share the same terminal side in the standard position. . To find coterminal angles, we can add or subtract multiples of 360360^{\circ} (a complete revolution in degrees) from the given angle.

STEP 2

First, let's find a positive angle that is coterminal with 201201^{\circ}. We can do this by adding 360360^{\circ} to 201201^{\circ}.
PositiveCoterminalAngle=201+360Positive\, Coterminal\, Angle =201^{\circ} +360^{\circ}

STEP 3

Calculate the positive coterminal angle.
PositiveCoterminalAngle=201+360=561Positive\, Coterminal\, Angle =201^{\circ} +360^{\circ} =561^{\circ}

STEP 4

Next, let's find a negative angle that is coterminal with 201201^{\circ}. We can do this by subtracting 360360^{\circ} from 201201^{\circ}.
NegativeCoterminalAngle=201360Negative\, Coterminal\, Angle =201^{\circ} -360^{\circ}

STEP 5

Calculate the negative coterminal angle.
NegativeCoterminalAngle=201360=159Negative\, Coterminal\, Angle =201^{\circ} -360^{\circ} = -159^{\circ}

STEP 6

Finally, let's find another positive angle that is coterminal with 201201^{\circ}. We can do this by adding two multiples of 360360^{\circ} to 201201^{\circ}.
AnotherPositiveCoterminalAngle=201+2×360Another\, Positive\, Coterminal\, Angle =201^{\circ} +2 \times360^{\circ}

STEP 7

Calculate the other positive coterminal angle.
AnotherPositiveCoterminalAngle=201+2×360=921Another\, Positive\, Coterminal\, Angle =201^{\circ} +2 \times360^{\circ} =921^{\circ}So the three different angles that are coterminal with 201201^{\circ} are 561561^{\circ}, 159-159^{\circ}, and 921921^{\circ}.

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