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What is the maximum of f(x) = sin(x)?

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3 votes
Sinx= 1(maximum value) 
User Jeff Paquette
by
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3 votes

Answer:

The Maximum value of f(x)=sin(x) is 1 , when
\theta = 90^(\circ)

Explanation:

Property of Sine function:


  • \sin \theta =0 when
    \theta = 0^(\circ) ,180^(\circ), 360^(\circ)
  • Maximum value of
    \sin \theta is 1 , when
    \theta = 90^(\circ)
  • Minimum value of
    \sin \theta is -1 , when
    \theta = 180^(\circ)
  • Range of values of
    \sin \theta is
    -1\leq \sin \theta \leq 1

Given: f(x) = sin(x)

Then, by the property of sine function:

Maximum value of f(x) is 1 , when
\theta = 90^(\circ)

User Given
by
8.6k points

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