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Coterminal  angles have a difference of 360° or its multiples.

To find the coterminal angle add to it 360° or (360n)°, where n is a positive or negative integer.

Part (a)

Given angle is 100°.

Its coterminal angles are:

  • 100° + 360° = 460°, 100° + 720° = 820°,    positive
  • 100° - 360°  = - 260°, 100° -720° = - 620°, negative

Part (b)

Given angle is 145°.

Its coterminal angles are:

  • 145° + 360° = 505°, 145° + 720° = 865°,
  • 145° - 360°  = - 215°, 145° -720° = - 575°.

Part (c)

Given angle is  - 10°.

Its coterminal angles are:

  • -10° + 360° = 350°, -10° + 720° = 710°,
  • -10° - 360°  = - 370°, -10° -720° = - 730°.

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Answer:

(a)  Positive:  460° and 820°

      Negative:  -260° and -620°

(b)  Positive:  505° and 865°

      Negative:  -215° and -575°

(c)  Positive:  350° and 710°

      Negative:  -370° and -730°

Step-by-step explanation:

Coterminal angles:  Angles that have the same initial side and the same terminal sides.

To find the coterminal angles of angle θ:

  • θ ± 360n,  if θ is measured in degrees.
  • θ ± 2πn,  if θ is measured in radians.

Part (a)

Given angle:

  • θ = 100°

Positive angles:

⇒ 100° + 360° = 460°

⇒ 100° + 360° × 2 = 820°

Negative angles:

⇒ 100° - 360° = -260°

⇒ 100° - 360° × 2 = -620°

Part (b)

Given angle:

  • θ = 145°

Positive angles:

⇒ 145° + 360° = 505°

⇒ 145° + 360° × 2 = 865°

Negative angles:

⇒ 145° - 360° = -215°

⇒ 145° - 360° × 2 = -575°

Part (c)

Given angle:

  • θ = -10°

Positive angles:

⇒ -10° + 360° = 350°

⇒ -10° + 360° × 2 = 710°

Negative angles:

⇒ -10° - 360° = -370°

⇒ -10° - 360° × 2 = -730°

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