Question

The period of | sin(3x) | is

Answer 1

Answer:   ⇒ Period of | sin(3x) | is 2π/3

⇒ Period of a Trigonometric Function is the smallest positive Number which, when added to the original circular measure of the angle, gives the same value of the function.

The given function is  | sin(3x) |

We know that Period of SINE is 2π.

⇒ | sin (3x) |  =  | sin (3x + 2π) |

    | sin (3x) |  =  | sin (3x + 3.2π/3) |

     | sin (3x) |  =  | sin 3(x + 2π/3) |

⇒ Period of | sin(3x) | is 2π/3