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if sinA/3=3/5, prove that sinA=117/125

Sagot :

Dashataranidn

Step-by-step explanation:

[tex]\noindent\rule{12cm}{0.4pt}[/tex]

   1.  Given:

        [tex]\sin\bigg(\dfrac{A}{3}\bigg)=\dfrac{3}{5}[/tex]

[tex]\noindent\rule{12cm}{0.4pt}[/tex]

   2.  We know from trigonometric identity:

        [tex]\cos^2\bigg(\dfrac{A}{3}\bigg)=1-\sin^2\bigg(\dfrac{A}{3}\bigg)[/tex]

       [tex]\cos^2\bigg(\dfrac{A}{3}\bigg)=1-\bigg(\dfrac{3}{5}\bigg)^2[/tex]

       [tex]\cos^2\bigg(\dfrac{A}{3}\bigg)=1-\dfrac{9}{25}[/tex]

       [tex]\cos^2\bigg(\dfrac{A}{3}\bigg)=\dfrac{16}{25}[/tex]

       [tex]\cos\bigg(\dfrac{A}{3}\bigg)=\dfrac{4}{5}\ \ \ \text{\bigg[Taking the positive value of $\dfrac{A}{3} $ since it is in the 1st}[/tex]

                                  [tex]\text{quadrant]}[/tex]

[tex]\noindent\rule{12cm}{0.4pt}[/tex]

   3. We need to find sinA using the sub-multiple angle formula:

        [tex]\sin A=3\sin \dfrac{A}{3}-4\sin^3\dfrac{A}{3}[/tex]

       [tex]\text{Substituting $\sin \dfrac{A}{3}=\dfrac{3}{5}:$}[/tex]

       [tex]\sin A=3\bigg(\dfrac{3}{5}\bigg)-4\bigg(\dfrac{3}{5}\bigg)^3[/tex]

       [tex]\sin A=3\times\dfrac{3}{5}-4\times\dfrac{27}{125}[/tex]

       [tex]\sin A=\dfrac{9}{5}-\dfrac{108}{125}[/tex]

       [tex]\sin A=\dfrac{225}{125}-\dfrac{108}{125}[/tex]

       [tex]\boxed{\sin A=\dfrac{117}{125}}[/tex]

                                                                                                    proved

       

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