[" The equation "x^(3)-(3)/(4)x=-(sqrt(3...

[" The equation "x^(3)-(3)/(4)x=-(sqrt(3))/(8)" is not satisficd by "],[[" 1) "x=cos((5 pi)/(18)),],[" B) "x=cos((7 pi)/(18)),],[" (9"x=cos17 pi]]

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The equation x^(3)-(3)/(4)x=-(sqrt(3))/(8) is satisfied by x=cos((5 pi)/(18))( b) x=cos((7 pi)/(18))x=cos((23 pi)/(18))( d) x=cos((17 pi)/(18))

The equation x^3=3/4x=-(sqrt(3))/8 is satisfied by x=cos((5pi)/(18)) (b) x=cos((7pi)/(18)) x=cos((23pi)/(18)) (d) x=cos((17pi)/(18))

The equation x^3=3/4x=-(sqrt(3))/8 is satisfied by x=cos((5pi)/(18)) (b) x=cos((7pi)/(18)) x=cos((23pi)/(18)) (d) x=cos((17pi)/(18))

cos((3pi)/(4)+x)-cos ((3pi)/(4)-x)=-sqrt(2) sin x

sin ((5 pi) / (18)) - cos ((4 pi) / (9)) = sqrt (3) sin ((pi) / (9))

cos((3pi)/(4)+x)-cos((3pi)/(4)-x) = -sqrt(2)sinx

cos((3pi)/(4)+x)-cos((3pi)/(4)-x) = -sqrt(2)sinx

Prove that: cos((3 pi)/(4)+x)-cos((3 pi)/(4)-x)=sqrt(2)sin x

Prove that: cos((3 pi)/(4)+x)-cos((3 pi)/(4)-x)=-sqrt(2)sin x

Prove that: cos((3 pi)/(4)+x)-cos((3 pi)/(4)-x)=-sqrt(2)sin x

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