Prove that $sin a + sin b + sin(a+b) = 4 sinfrac12(a+b) cos frac12a cosfrac12b$












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Helping my son with his trigonometry review. We know that
$$sin(a+b) = sin a cos b + cos a sin b$$
We also know that
$$sin a cos b = frac12 left(sin(a-b) + sin(a+b)right)$$
And we have
$$sin a + sin b = 2 sinfrac12(a+b)cosfrac12(a-b)$$
From there, we seem to be missing how to get to the right-hand side of the equation.



We first expand
$$sin a + sin b = 2 sinfrac12(a+b) cosfrac12(a-b)$$
Then we add $sin(a+b)$, which is $sin a cos b + cos a sin b$.
We now have:



$$2 sinfrac12(a+b) cosfrac12(a-b) + frac12 left(sin(a-b) + sin (a+b)right) + frac12 left( sin(b-a) + sin (a+b)right)$$



From there, we can't see how to obtain the right-hand side of the equation which is
$$4 sinfrac12(a+b) cosfrac12a cosfrac12b$$










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    2












    $begingroup$


    Helping my son with his trigonometry review. We know that
    $$sin(a+b) = sin a cos b + cos a sin b$$
    We also know that
    $$sin a cos b = frac12 left(sin(a-b) + sin(a+b)right)$$
    And we have
    $$sin a + sin b = 2 sinfrac12(a+b)cosfrac12(a-b)$$
    From there, we seem to be missing how to get to the right-hand side of the equation.



    We first expand
    $$sin a + sin b = 2 sinfrac12(a+b) cosfrac12(a-b)$$
    Then we add $sin(a+b)$, which is $sin a cos b + cos a sin b$.
    We now have:



    $$2 sinfrac12(a+b) cosfrac12(a-b) + frac12 left(sin(a-b) + sin (a+b)right) + frac12 left( sin(b-a) + sin (a+b)right)$$



    From there, we can't see how to obtain the right-hand side of the equation which is
    $$4 sinfrac12(a+b) cosfrac12a cosfrac12b$$










    share|cite|improve this question











    $endgroup$















      2












      2








      2





      $begingroup$


      Helping my son with his trigonometry review. We know that
      $$sin(a+b) = sin a cos b + cos a sin b$$
      We also know that
      $$sin a cos b = frac12 left(sin(a-b) + sin(a+b)right)$$
      And we have
      $$sin a + sin b = 2 sinfrac12(a+b)cosfrac12(a-b)$$
      From there, we seem to be missing how to get to the right-hand side of the equation.



      We first expand
      $$sin a + sin b = 2 sinfrac12(a+b) cosfrac12(a-b)$$
      Then we add $sin(a+b)$, which is $sin a cos b + cos a sin b$.
      We now have:



      $$2 sinfrac12(a+b) cosfrac12(a-b) + frac12 left(sin(a-b) + sin (a+b)right) + frac12 left( sin(b-a) + sin (a+b)right)$$



      From there, we can't see how to obtain the right-hand side of the equation which is
      $$4 sinfrac12(a+b) cosfrac12a cosfrac12b$$










      share|cite|improve this question











      $endgroup$




      Helping my son with his trigonometry review. We know that
      $$sin(a+b) = sin a cos b + cos a sin b$$
      We also know that
      $$sin a cos b = frac12 left(sin(a-b) + sin(a+b)right)$$
      And we have
      $$sin a + sin b = 2 sinfrac12(a+b)cosfrac12(a-b)$$
      From there, we seem to be missing how to get to the right-hand side of the equation.



      We first expand
      $$sin a + sin b = 2 sinfrac12(a+b) cosfrac12(a-b)$$
      Then we add $sin(a+b)$, which is $sin a cos b + cos a sin b$.
      We now have:



      $$2 sinfrac12(a+b) cosfrac12(a-b) + frac12 left(sin(a-b) + sin (a+b)right) + frac12 left( sin(b-a) + sin (a+b)right)$$



      From there, we can't see how to obtain the right-hand side of the equation which is
      $$4 sinfrac12(a+b) cosfrac12a cosfrac12b$$







      trigonometry






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      edited Dec 27 '18 at 14:41









      Blue

      49.6k870158




      49.6k870158










      asked Dec 27 '18 at 14:31









      Christopher PaggenChristopher Paggen

      111




      111






















          5 Answers
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          Following Thomas Shelby and Dr. Sonnhard Graubner, I provide you a full proof:
          begin{align}sin(a)+sin(b)+sin(a+b)&=2cosleft(frac{a-b}{2}right)sinleft(frac{a+b}{2}right)+2sinleft(frac{a+b}{2}right)cosleft(frac{a+b}{2}right)\&=2sinleft(frac{a+b}{2}right)left[cosleft(frac{a-b}{2}right)+cosleft(frac{a+b}{2}right)right]end{align}
          Since
          begin{align}cosleft(a-bright)+cosleft(a+bright)=2cos(a)cos(b)end{align}
          [see: last page of https://services.math.duke.edu/~leili/teaching/uwm/math222s11/problems/quizzes/trig.pdf or search for An elementary proof of two formulas in trigonometry on google] then,
          begin{align}cosleft(frac{a-b}{2}right)+cosleft(frac{a+b}{2}right)=2cosleft(frac{a}{2}right)cosleft(frac{b}{2}right)end{align}
          Hence,
          begin{align}2sinleft(frac{a+b}{2}right)left[cosleft(frac{a-b}{2}right)+cosleft(frac{a+b}{2}right)right]=&2sinleft(frac{a+b}{2}right)times 2cosleft(frac{a}{2}right)cosleft(frac{b}{2}right)\=&4sinleft(frac{a+b}{2}right)cosleft(frac{a}{2}right)cosleft(frac{b}{2}right)end{align}






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            1












            $begingroup$

            Use that $$sin(A)+sin(B)=2cosleft(frac{A-B}{2}right)sinleft(frac{A+B}{2}right)$$ and $$sin(A+B)=2sinleft(frac{A+B}{2}right)cosleft(frac{A+B}{2}right)$$






            share|cite|improve this answer









            $endgroup$













            • $begingroup$
              thank you - we did not have sin(A+B)=2sinleft(frac{A+B}{2}right)cosleft(frac{A+B}{2}right) in the course material, we just had sin(A+B)=sin(A)cos(B)+cos(A)sin(B).
              $endgroup$
              – Christopher Paggen
              Dec 27 '18 at 15:04



















            1












            $begingroup$

            It may help setting $A=a/2$ and $B=b/2$, so the left-hand side becomes
            $$
            sin2A+sin2B+sin2(A+B)
            $$

            The right-hand side screams “sum-to-product”! OK, let's apply the formula
            $$
            sin2A+sin2B=2sin(A+B)cos(A-B)
            $$

            so the left-hand side becomes
            begin{align}
            sin2A+sin2B+sin2(A+B)
            &=2sin(A+B)cos(A-B)+2sin(A+B)cos(A+B)\
            &=2sin(A+B)bigl(cos(A-B)+cos(A+B)bigr) \
            &=2sin(A+B)(cos Acos B+sin Asin B+cos Acos B-sin Asin B)\
            &=4sin(A+B)cos Acos B
            end{align}






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            $endgroup$





















              0












              $begingroup$

              begin{align}
              sin a + sin b + sin (a+b)&=2 sinleft(frac{a+b}2right) cosleft(frac{a-b}2right)+2 sinleft(frac{a+b}2right) cosleft(frac{a+b}2right)\
              &=2 sinleft(frac{a+b}2right)left(cosleft(frac{a-b}2right)+cosleft(frac{a+b}2right)right)
              end{align}

              Now use the identity $$cos A +cos B=2cos left(frac{A+B}2right)cos left(frac{A-B}2right)$$.






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              $endgroup$





















                0












                $begingroup$

                An alternative strategy uses $1+cos x=2cos^2tfrac{x}{2}$ to obtain $$sin a+sin b+sin (a+b)=2left(sin acos^2tfrac{b}{2}+sin bcos^2tfrac{a}{2}right).$$To finish, use $sin x=2sintfrac{x}{2}costfrac{x}{2}$ to obtain$$sin a+sin b+sin (a+b)=4costfrac{a}{2}costfrac{b}{2}left(sintfrac{a}{2}costfrac{b}{2}+sintfrac{b}{2}costfrac{a}{2}right)=4costfrac{a}{2} costfrac{b}{2}sintfrac{a+b}{2}.$$






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                  5 Answers
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                  5 Answers
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                  2












                  $begingroup$

                  Following Thomas Shelby and Dr. Sonnhard Graubner, I provide you a full proof:
                  begin{align}sin(a)+sin(b)+sin(a+b)&=2cosleft(frac{a-b}{2}right)sinleft(frac{a+b}{2}right)+2sinleft(frac{a+b}{2}right)cosleft(frac{a+b}{2}right)\&=2sinleft(frac{a+b}{2}right)left[cosleft(frac{a-b}{2}right)+cosleft(frac{a+b}{2}right)right]end{align}
                  Since
                  begin{align}cosleft(a-bright)+cosleft(a+bright)=2cos(a)cos(b)end{align}
                  [see: last page of https://services.math.duke.edu/~leili/teaching/uwm/math222s11/problems/quizzes/trig.pdf or search for An elementary proof of two formulas in trigonometry on google] then,
                  begin{align}cosleft(frac{a-b}{2}right)+cosleft(frac{a+b}{2}right)=2cosleft(frac{a}{2}right)cosleft(frac{b}{2}right)end{align}
                  Hence,
                  begin{align}2sinleft(frac{a+b}{2}right)left[cosleft(frac{a-b}{2}right)+cosleft(frac{a+b}{2}right)right]=&2sinleft(frac{a+b}{2}right)times 2cosleft(frac{a}{2}right)cosleft(frac{b}{2}right)\=&4sinleft(frac{a+b}{2}right)cosleft(frac{a}{2}right)cosleft(frac{b}{2}right)end{align}






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                    2












                    $begingroup$

                    Following Thomas Shelby and Dr. Sonnhard Graubner, I provide you a full proof:
                    begin{align}sin(a)+sin(b)+sin(a+b)&=2cosleft(frac{a-b}{2}right)sinleft(frac{a+b}{2}right)+2sinleft(frac{a+b}{2}right)cosleft(frac{a+b}{2}right)\&=2sinleft(frac{a+b}{2}right)left[cosleft(frac{a-b}{2}right)+cosleft(frac{a+b}{2}right)right]end{align}
                    Since
                    begin{align}cosleft(a-bright)+cosleft(a+bright)=2cos(a)cos(b)end{align}
                    [see: last page of https://services.math.duke.edu/~leili/teaching/uwm/math222s11/problems/quizzes/trig.pdf or search for An elementary proof of two formulas in trigonometry on google] then,
                    begin{align}cosleft(frac{a-b}{2}right)+cosleft(frac{a+b}{2}right)=2cosleft(frac{a}{2}right)cosleft(frac{b}{2}right)end{align}
                    Hence,
                    begin{align}2sinleft(frac{a+b}{2}right)left[cosleft(frac{a-b}{2}right)+cosleft(frac{a+b}{2}right)right]=&2sinleft(frac{a+b}{2}right)times 2cosleft(frac{a}{2}right)cosleft(frac{b}{2}right)\=&4sinleft(frac{a+b}{2}right)cosleft(frac{a}{2}right)cosleft(frac{b}{2}right)end{align}






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                    $endgroup$
















                      2












                      2








                      2





                      $begingroup$

                      Following Thomas Shelby and Dr. Sonnhard Graubner, I provide you a full proof:
                      begin{align}sin(a)+sin(b)+sin(a+b)&=2cosleft(frac{a-b}{2}right)sinleft(frac{a+b}{2}right)+2sinleft(frac{a+b}{2}right)cosleft(frac{a+b}{2}right)\&=2sinleft(frac{a+b}{2}right)left[cosleft(frac{a-b}{2}right)+cosleft(frac{a+b}{2}right)right]end{align}
                      Since
                      begin{align}cosleft(a-bright)+cosleft(a+bright)=2cos(a)cos(b)end{align}
                      [see: last page of https://services.math.duke.edu/~leili/teaching/uwm/math222s11/problems/quizzes/trig.pdf or search for An elementary proof of two formulas in trigonometry on google] then,
                      begin{align}cosleft(frac{a-b}{2}right)+cosleft(frac{a+b}{2}right)=2cosleft(frac{a}{2}right)cosleft(frac{b}{2}right)end{align}
                      Hence,
                      begin{align}2sinleft(frac{a+b}{2}right)left[cosleft(frac{a-b}{2}right)+cosleft(frac{a+b}{2}right)right]=&2sinleft(frac{a+b}{2}right)times 2cosleft(frac{a}{2}right)cosleft(frac{b}{2}right)\=&4sinleft(frac{a+b}{2}right)cosleft(frac{a}{2}right)cosleft(frac{b}{2}right)end{align}






                      share|cite|improve this answer











                      $endgroup$



                      Following Thomas Shelby and Dr. Sonnhard Graubner, I provide you a full proof:
                      begin{align}sin(a)+sin(b)+sin(a+b)&=2cosleft(frac{a-b}{2}right)sinleft(frac{a+b}{2}right)+2sinleft(frac{a+b}{2}right)cosleft(frac{a+b}{2}right)\&=2sinleft(frac{a+b}{2}right)left[cosleft(frac{a-b}{2}right)+cosleft(frac{a+b}{2}right)right]end{align}
                      Since
                      begin{align}cosleft(a-bright)+cosleft(a+bright)=2cos(a)cos(b)end{align}
                      [see: last page of https://services.math.duke.edu/~leili/teaching/uwm/math222s11/problems/quizzes/trig.pdf or search for An elementary proof of two formulas in trigonometry on google] then,
                      begin{align}cosleft(frac{a-b}{2}right)+cosleft(frac{a+b}{2}right)=2cosleft(frac{a}{2}right)cosleft(frac{b}{2}right)end{align}
                      Hence,
                      begin{align}2sinleft(frac{a+b}{2}right)left[cosleft(frac{a-b}{2}right)+cosleft(frac{a+b}{2}right)right]=&2sinleft(frac{a+b}{2}right)times 2cosleft(frac{a}{2}right)cosleft(frac{b}{2}right)\=&4sinleft(frac{a+b}{2}right)cosleft(frac{a}{2}right)cosleft(frac{b}{2}right)end{align}







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                      edited Dec 27 '18 at 15:23

























                      answered Dec 27 '18 at 15:10









                      Omojola MichealOmojola Micheal

                      2,068424




                      2,068424























                          1












                          $begingroup$

                          Use that $$sin(A)+sin(B)=2cosleft(frac{A-B}{2}right)sinleft(frac{A+B}{2}right)$$ and $$sin(A+B)=2sinleft(frac{A+B}{2}right)cosleft(frac{A+B}{2}right)$$






                          share|cite|improve this answer









                          $endgroup$













                          • $begingroup$
                            thank you - we did not have sin(A+B)=2sinleft(frac{A+B}{2}right)cosleft(frac{A+B}{2}right) in the course material, we just had sin(A+B)=sin(A)cos(B)+cos(A)sin(B).
                            $endgroup$
                            – Christopher Paggen
                            Dec 27 '18 at 15:04
















                          1












                          $begingroup$

                          Use that $$sin(A)+sin(B)=2cosleft(frac{A-B}{2}right)sinleft(frac{A+B}{2}right)$$ and $$sin(A+B)=2sinleft(frac{A+B}{2}right)cosleft(frac{A+B}{2}right)$$






                          share|cite|improve this answer









                          $endgroup$













                          • $begingroup$
                            thank you - we did not have sin(A+B)=2sinleft(frac{A+B}{2}right)cosleft(frac{A+B}{2}right) in the course material, we just had sin(A+B)=sin(A)cos(B)+cos(A)sin(B).
                            $endgroup$
                            – Christopher Paggen
                            Dec 27 '18 at 15:04














                          1












                          1








                          1





                          $begingroup$

                          Use that $$sin(A)+sin(B)=2cosleft(frac{A-B}{2}right)sinleft(frac{A+B}{2}right)$$ and $$sin(A+B)=2sinleft(frac{A+B}{2}right)cosleft(frac{A+B}{2}right)$$






                          share|cite|improve this answer









                          $endgroup$



                          Use that $$sin(A)+sin(B)=2cosleft(frac{A-B}{2}right)sinleft(frac{A+B}{2}right)$$ and $$sin(A+B)=2sinleft(frac{A+B}{2}right)cosleft(frac{A+B}{2}right)$$







                          share|cite|improve this answer












                          share|cite|improve this answer



                          share|cite|improve this answer










                          answered Dec 27 '18 at 14:41









                          Dr. Sonnhard GraubnerDr. Sonnhard Graubner

                          78.9k42867




                          78.9k42867












                          • $begingroup$
                            thank you - we did not have sin(A+B)=2sinleft(frac{A+B}{2}right)cosleft(frac{A+B}{2}right) in the course material, we just had sin(A+B)=sin(A)cos(B)+cos(A)sin(B).
                            $endgroup$
                            – Christopher Paggen
                            Dec 27 '18 at 15:04


















                          • $begingroup$
                            thank you - we did not have sin(A+B)=2sinleft(frac{A+B}{2}right)cosleft(frac{A+B}{2}right) in the course material, we just had sin(A+B)=sin(A)cos(B)+cos(A)sin(B).
                            $endgroup$
                            – Christopher Paggen
                            Dec 27 '18 at 15:04
















                          $begingroup$
                          thank you - we did not have sin(A+B)=2sinleft(frac{A+B}{2}right)cosleft(frac{A+B}{2}right) in the course material, we just had sin(A+B)=sin(A)cos(B)+cos(A)sin(B).
                          $endgroup$
                          – Christopher Paggen
                          Dec 27 '18 at 15:04




                          $begingroup$
                          thank you - we did not have sin(A+B)=2sinleft(frac{A+B}{2}right)cosleft(frac{A+B}{2}right) in the course material, we just had sin(A+B)=sin(A)cos(B)+cos(A)sin(B).
                          $endgroup$
                          – Christopher Paggen
                          Dec 27 '18 at 15:04











                          1












                          $begingroup$

                          It may help setting $A=a/2$ and $B=b/2$, so the left-hand side becomes
                          $$
                          sin2A+sin2B+sin2(A+B)
                          $$

                          The right-hand side screams “sum-to-product”! OK, let's apply the formula
                          $$
                          sin2A+sin2B=2sin(A+B)cos(A-B)
                          $$

                          so the left-hand side becomes
                          begin{align}
                          sin2A+sin2B+sin2(A+B)
                          &=2sin(A+B)cos(A-B)+2sin(A+B)cos(A+B)\
                          &=2sin(A+B)bigl(cos(A-B)+cos(A+B)bigr) \
                          &=2sin(A+B)(cos Acos B+sin Asin B+cos Acos B-sin Asin B)\
                          &=4sin(A+B)cos Acos B
                          end{align}






                          share|cite|improve this answer









                          $endgroup$


















                            1












                            $begingroup$

                            It may help setting $A=a/2$ and $B=b/2$, so the left-hand side becomes
                            $$
                            sin2A+sin2B+sin2(A+B)
                            $$

                            The right-hand side screams “sum-to-product”! OK, let's apply the formula
                            $$
                            sin2A+sin2B=2sin(A+B)cos(A-B)
                            $$

                            so the left-hand side becomes
                            begin{align}
                            sin2A+sin2B+sin2(A+B)
                            &=2sin(A+B)cos(A-B)+2sin(A+B)cos(A+B)\
                            &=2sin(A+B)bigl(cos(A-B)+cos(A+B)bigr) \
                            &=2sin(A+B)(cos Acos B+sin Asin B+cos Acos B-sin Asin B)\
                            &=4sin(A+B)cos Acos B
                            end{align}






                            share|cite|improve this answer









                            $endgroup$
















                              1












                              1








                              1





                              $begingroup$

                              It may help setting $A=a/2$ and $B=b/2$, so the left-hand side becomes
                              $$
                              sin2A+sin2B+sin2(A+B)
                              $$

                              The right-hand side screams “sum-to-product”! OK, let's apply the formula
                              $$
                              sin2A+sin2B=2sin(A+B)cos(A-B)
                              $$

                              so the left-hand side becomes
                              begin{align}
                              sin2A+sin2B+sin2(A+B)
                              &=2sin(A+B)cos(A-B)+2sin(A+B)cos(A+B)\
                              &=2sin(A+B)bigl(cos(A-B)+cos(A+B)bigr) \
                              &=2sin(A+B)(cos Acos B+sin Asin B+cos Acos B-sin Asin B)\
                              &=4sin(A+B)cos Acos B
                              end{align}






                              share|cite|improve this answer









                              $endgroup$



                              It may help setting $A=a/2$ and $B=b/2$, so the left-hand side becomes
                              $$
                              sin2A+sin2B+sin2(A+B)
                              $$

                              The right-hand side screams “sum-to-product”! OK, let's apply the formula
                              $$
                              sin2A+sin2B=2sin(A+B)cos(A-B)
                              $$

                              so the left-hand side becomes
                              begin{align}
                              sin2A+sin2B+sin2(A+B)
                              &=2sin(A+B)cos(A-B)+2sin(A+B)cos(A+B)\
                              &=2sin(A+B)bigl(cos(A-B)+cos(A+B)bigr) \
                              &=2sin(A+B)(cos Acos B+sin Asin B+cos Acos B-sin Asin B)\
                              &=4sin(A+B)cos Acos B
                              end{align}







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                              answered Dec 27 '18 at 15:55









                              egregegreg

                              186k1486208




                              186k1486208























                                  0












                                  $begingroup$

                                  begin{align}
                                  sin a + sin b + sin (a+b)&=2 sinleft(frac{a+b}2right) cosleft(frac{a-b}2right)+2 sinleft(frac{a+b}2right) cosleft(frac{a+b}2right)\
                                  &=2 sinleft(frac{a+b}2right)left(cosleft(frac{a-b}2right)+cosleft(frac{a+b}2right)right)
                                  end{align}

                                  Now use the identity $$cos A +cos B=2cos left(frac{A+B}2right)cos left(frac{A-B}2right)$$.






                                  share|cite|improve this answer











                                  $endgroup$


















                                    0












                                    $begingroup$

                                    begin{align}
                                    sin a + sin b + sin (a+b)&=2 sinleft(frac{a+b}2right) cosleft(frac{a-b}2right)+2 sinleft(frac{a+b}2right) cosleft(frac{a+b}2right)\
                                    &=2 sinleft(frac{a+b}2right)left(cosleft(frac{a-b}2right)+cosleft(frac{a+b}2right)right)
                                    end{align}

                                    Now use the identity $$cos A +cos B=2cos left(frac{A+B}2right)cos left(frac{A-B}2right)$$.






                                    share|cite|improve this answer











                                    $endgroup$
















                                      0












                                      0








                                      0





                                      $begingroup$

                                      begin{align}
                                      sin a + sin b + sin (a+b)&=2 sinleft(frac{a+b}2right) cosleft(frac{a-b}2right)+2 sinleft(frac{a+b}2right) cosleft(frac{a+b}2right)\
                                      &=2 sinleft(frac{a+b}2right)left(cosleft(frac{a-b}2right)+cosleft(frac{a+b}2right)right)
                                      end{align}

                                      Now use the identity $$cos A +cos B=2cos left(frac{A+B}2right)cos left(frac{A-B}2right)$$.






                                      share|cite|improve this answer











                                      $endgroup$



                                      begin{align}
                                      sin a + sin b + sin (a+b)&=2 sinleft(frac{a+b}2right) cosleft(frac{a-b}2right)+2 sinleft(frac{a+b}2right) cosleft(frac{a+b}2right)\
                                      &=2 sinleft(frac{a+b}2right)left(cosleft(frac{a-b}2right)+cosleft(frac{a+b}2right)right)
                                      end{align}

                                      Now use the identity $$cos A +cos B=2cos left(frac{A+B}2right)cos left(frac{A-B}2right)$$.







                                      share|cite|improve this answer














                                      share|cite|improve this answer



                                      share|cite|improve this answer








                                      edited Dec 27 '18 at 14:52

























                                      answered Dec 27 '18 at 14:46









                                      Thomas ShelbyThomas Shelby

                                      4,7362727




                                      4,7362727























                                          0












                                          $begingroup$

                                          An alternative strategy uses $1+cos x=2cos^2tfrac{x}{2}$ to obtain $$sin a+sin b+sin (a+b)=2left(sin acos^2tfrac{b}{2}+sin bcos^2tfrac{a}{2}right).$$To finish, use $sin x=2sintfrac{x}{2}costfrac{x}{2}$ to obtain$$sin a+sin b+sin (a+b)=4costfrac{a}{2}costfrac{b}{2}left(sintfrac{a}{2}costfrac{b}{2}+sintfrac{b}{2}costfrac{a}{2}right)=4costfrac{a}{2} costfrac{b}{2}sintfrac{a+b}{2}.$$






                                          share|cite|improve this answer









                                          $endgroup$


















                                            0












                                            $begingroup$

                                            An alternative strategy uses $1+cos x=2cos^2tfrac{x}{2}$ to obtain $$sin a+sin b+sin (a+b)=2left(sin acos^2tfrac{b}{2}+sin bcos^2tfrac{a}{2}right).$$To finish, use $sin x=2sintfrac{x}{2}costfrac{x}{2}$ to obtain$$sin a+sin b+sin (a+b)=4costfrac{a}{2}costfrac{b}{2}left(sintfrac{a}{2}costfrac{b}{2}+sintfrac{b}{2}costfrac{a}{2}right)=4costfrac{a}{2} costfrac{b}{2}sintfrac{a+b}{2}.$$






                                            share|cite|improve this answer









                                            $endgroup$
















                                              0












                                              0








                                              0





                                              $begingroup$

                                              An alternative strategy uses $1+cos x=2cos^2tfrac{x}{2}$ to obtain $$sin a+sin b+sin (a+b)=2left(sin acos^2tfrac{b}{2}+sin bcos^2tfrac{a}{2}right).$$To finish, use $sin x=2sintfrac{x}{2}costfrac{x}{2}$ to obtain$$sin a+sin b+sin (a+b)=4costfrac{a}{2}costfrac{b}{2}left(sintfrac{a}{2}costfrac{b}{2}+sintfrac{b}{2}costfrac{a}{2}right)=4costfrac{a}{2} costfrac{b}{2}sintfrac{a+b}{2}.$$






                                              share|cite|improve this answer









                                              $endgroup$



                                              An alternative strategy uses $1+cos x=2cos^2tfrac{x}{2}$ to obtain $$sin a+sin b+sin (a+b)=2left(sin acos^2tfrac{b}{2}+sin bcos^2tfrac{a}{2}right).$$To finish, use $sin x=2sintfrac{x}{2}costfrac{x}{2}$ to obtain$$sin a+sin b+sin (a+b)=4costfrac{a}{2}costfrac{b}{2}left(sintfrac{a}{2}costfrac{b}{2}+sintfrac{b}{2}costfrac{a}{2}right)=4costfrac{a}{2} costfrac{b}{2}sintfrac{a+b}{2}.$$







                                              share|cite|improve this answer












                                              share|cite|improve this answer



                                              share|cite|improve this answer










                                              answered Dec 27 '18 at 14:56









                                              J.G.J.G.

                                              33.3k23252




                                              33.3k23252






























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