How do you solve cos^2(x)+sin=1cos2(x)+sin=1?

2 Answers
Shwetank Mauria
Feb 29, 2016

Possible solution within the domain [0,2pi][0,2π] are {0, pi/2, pi, 2pi}{0,π2,π,2π}

Explanation:

cos^2(x)+sinx=1cos2(x)+sinx=1 can be written as sinx=1-cos^2x=sin^2xsinx=1cos2x=sin2x

(I have assumed that by cos^2(x)+sin=1cos2(x)+sin=1, one meant cos^2(x)+sinx=1cos2(x)+sinx=1

or sin^2x-sinx=0sin2xsinx=0 or

sinx(sinx-1)=0sinx(sinx1)=0

Hence either sinx=0sinx=0 or sinx=1sinx=1

Hence, possible solution within the domain [0,2pi][0,2π] are

{0, pi/2, pi, 2pi}{0,π2,π,2π}

Arunraju Naspuri
Feb 29, 2016

Under limit [0,2piπ], x=0,pi,2pix=0,π,2π or x=pi/2x=π2

Explanation:

given that

cos^2x + sin x =1cos2x+sinx=1

=>sinx=1-cos^2xsinx=1cos2x

=>sinx=sin^2xsinx=sin2x

=> sin^2x-sinx=0sin2xsinx=0

=>sinx(sinx-1)=0sinx(sinx1)=0

=>sinx=0 (or) sinx-1=0sinx=0(or)sinx1=0

IF Sin(x) =0 :-

Then x=0,pi,2pi,3pi......

IF sin(x)=1 :-

Then x=pi/2,(5pi)/2......

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