Question
Rewrite with only sin x and cos x.
sin 3x
sin 3x
Asked by: USER9662
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55 Answers
Answer (55)
[tex]\bf \textit{triple angle identities}\\\\
sin(3\theta )=3sin(\theta )-4sin^3(\theta )\\\\
-------------------------------[/tex]
[tex]\bf \begin{array}{llll} 3sin(\theta )&-2sin^3(\theta )&-2sin^3(\theta )\\\\ &-2\underline{sin^2(\theta )} sin(\theta )\\\\ &-2[\underline{1-cos^2(\theta )}]sin(\theta )\\\\ &[-2+2cos^2(\theta )]sin(\theta )\\\\ &-2sin(\theta )+2cos^2(\theta )sin(\theta ) \end{array} \\\\\\ 3sin(\theta )\boxed{-2sin(\theta )+2cos^2(\theta )sin(\theta )}-2sin^3(\theta ) \\\\\\ sin(\theta )+2cos^2(\theta )sin(\theta )-2sin^3(\theta ) \\\\\\ 2cos^2(\theta )sin(\theta )+sin(\theta )-2sin^3(\theta )[/tex]
[tex]\bf \begin{array}{llll} 3sin(\theta )&-2sin^3(\theta )&-2sin^3(\theta )\\\\ &-2\underline{sin^2(\theta )} sin(\theta )\\\\ &-2[\underline{1-cos^2(\theta )}]sin(\theta )\\\\ &[-2+2cos^2(\theta )]sin(\theta )\\\\ &-2sin(\theta )+2cos^2(\theta )sin(\theta ) \end{array} \\\\\\ 3sin(\theta )\boxed{-2sin(\theta )+2cos^2(\theta )sin(\theta )}-2sin^3(\theta ) \\\\\\ sin(\theta )+2cos^2(\theta )sin(\theta )-2sin^3(\theta ) \\\\\\ 2cos^2(\theta )sin(\theta )+sin(\theta )-2sin^3(\theta )[/tex]