Values of $x$ satisfying $sin xcdotcos^3 x>sin^3xcdotcos x$












5















For what values of $x$ between $0$ and $pi$ does the inequality $sin xcdotcos^3 x>sin^3xcdotcos x$ hold?




My Attempt
$$
sin xcos xcdot(cos^2x-sin^2x)=frac{1}{2}cdotsin2xcdotcos2x=frac{1}{4}cdotsin4x>0impliessin4x>0\
xin(0,pi)implies4xin(0,4pi)\
4xin(0,pi)cup(2pi,3pi)implies xinBig(0,frac{pi}{4}Big)cupBig(frac{pi}{2},frac{3pi}{4}Big)
$$

But, my reference gives the solution, $xinBig(0,dfrac{pi}{4}Big)cupBig(dfrac{3pi}{4},piBig)$, where am I going wrong with my attempt?










share|cite|improve this question





























    5















    For what values of $x$ between $0$ and $pi$ does the inequality $sin xcdotcos^3 x>sin^3xcdotcos x$ hold?




    My Attempt
    $$
    sin xcos xcdot(cos^2x-sin^2x)=frac{1}{2}cdotsin2xcdotcos2x=frac{1}{4}cdotsin4x>0impliessin4x>0\
    xin(0,pi)implies4xin(0,4pi)\
    4xin(0,pi)cup(2pi,3pi)implies xinBig(0,frac{pi}{4}Big)cupBig(frac{pi}{2},frac{3pi}{4}Big)
    $$

    But, my reference gives the solution, $xinBig(0,dfrac{pi}{4}Big)cupBig(dfrac{3pi}{4},piBig)$, where am I going wrong with my attempt?










    share|cite|improve this question



























      5












      5








      5








      For what values of $x$ between $0$ and $pi$ does the inequality $sin xcdotcos^3 x>sin^3xcdotcos x$ hold?




      My Attempt
      $$
      sin xcos xcdot(cos^2x-sin^2x)=frac{1}{2}cdotsin2xcdotcos2x=frac{1}{4}cdotsin4x>0impliessin4x>0\
      xin(0,pi)implies4xin(0,4pi)\
      4xin(0,pi)cup(2pi,3pi)implies xinBig(0,frac{pi}{4}Big)cupBig(frac{pi}{2},frac{3pi}{4}Big)
      $$

      But, my reference gives the solution, $xinBig(0,dfrac{pi}{4}Big)cupBig(dfrac{3pi}{4},piBig)$, where am I going wrong with my attempt?










      share|cite|improve this question
















      For what values of $x$ between $0$ and $pi$ does the inequality $sin xcdotcos^3 x>sin^3xcdotcos x$ hold?




      My Attempt
      $$
      sin xcos xcdot(cos^2x-sin^2x)=frac{1}{2}cdotsin2xcdotcos2x=frac{1}{4}cdotsin4x>0impliessin4x>0\
      xin(0,pi)implies4xin(0,4pi)\
      4xin(0,pi)cup(2pi,3pi)implies xinBig(0,frac{pi}{4}Big)cupBig(frac{pi}{2},frac{3pi}{4}Big)
      $$

      But, my reference gives the solution, $xinBig(0,dfrac{pi}{4}Big)cupBig(dfrac{3pi}{4},piBig)$, where am I going wrong with my attempt?







      trigonometry inequality






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      edited Dec 1 at 19:10









      TheSimpliFire

      12.1k62258




      12.1k62258










      asked Dec 1 at 18:56









      ss1729

      1,786723




      1,786723






















          3 Answers
          3






          active

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          5














          The given solution is wrong; you are correct. At $x=frac{7pi}8inleft(frac{3pi}4,piright)$, we have that $$frac14sin4x=frac14sinfrac{7pi}2=-frac14<0$$ which is a contradiction.






          share|cite|improve this answer





























            0














            Finishing what you did



            $$sin(4x)>0iff$$



            $$2kpi <4x<(2k+1)pi iff$$



            $$frac{kpi}{2}<x<frac{kpi}{2}+frac{pi}{4}$$



            $k=0$ gives $0<x<frac{pi}{4}$



            and
            $k=1$ gives $frac{pi}{2}<x<frac{3pi}{4}$.






            share|cite|improve this answer





























              0














              As an alternative for a full solution we can consider two cases





              • $sin x cos x >0$ that is $xin(0,pi/2)cup(pi,3pi/2)$


              $$sin xcdotcos^3 x>sin^3xcdotcos x iffcos^2x>sin^2x iff2sin^2 x<1$$



              $$-frac{sqrt 2}2<sin x<0 ,land, 0<sin x<frac{sqrt 2}2 iff color{red}{xin(0,pi/4)}cup(pi,5pi/4)$$





              • $sin x cos x <0$ that is $xin(pi/2,pi)cup(3pi/2,2pi)$


              $$sin xcdotcos^3 x>sin^3xcdotcos x iffcos^2x<sin^2x iff2sin^2 x>1$$



              $$-1<sin x<-frac{sqrt 2}2,land, frac{sqrt 2}2<sin x <1 iff color{red}{xin(pi/2,3pi/4)}cup(3pi/2,7pi/4)$$



              and then your solution is correct.






              share|cite|improve this answer





















                Your Answer





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                3 Answers
                3






                active

                oldest

                votes








                3 Answers
                3






                active

                oldest

                votes









                active

                oldest

                votes






                active

                oldest

                votes









                5














                The given solution is wrong; you are correct. At $x=frac{7pi}8inleft(frac{3pi}4,piright)$, we have that $$frac14sin4x=frac14sinfrac{7pi}2=-frac14<0$$ which is a contradiction.






                share|cite|improve this answer


























                  5














                  The given solution is wrong; you are correct. At $x=frac{7pi}8inleft(frac{3pi}4,piright)$, we have that $$frac14sin4x=frac14sinfrac{7pi}2=-frac14<0$$ which is a contradiction.






                  share|cite|improve this answer
























                    5












                    5








                    5






                    The given solution is wrong; you are correct. At $x=frac{7pi}8inleft(frac{3pi}4,piright)$, we have that $$frac14sin4x=frac14sinfrac{7pi}2=-frac14<0$$ which is a contradiction.






                    share|cite|improve this answer












                    The given solution is wrong; you are correct. At $x=frac{7pi}8inleft(frac{3pi}4,piright)$, we have that $$frac14sin4x=frac14sinfrac{7pi}2=-frac14<0$$ which is a contradiction.







                    share|cite|improve this answer












                    share|cite|improve this answer



                    share|cite|improve this answer










                    answered Dec 1 at 19:00









                    TheSimpliFire

                    12.1k62258




                    12.1k62258























                        0














                        Finishing what you did



                        $$sin(4x)>0iff$$



                        $$2kpi <4x<(2k+1)pi iff$$



                        $$frac{kpi}{2}<x<frac{kpi}{2}+frac{pi}{4}$$



                        $k=0$ gives $0<x<frac{pi}{4}$



                        and
                        $k=1$ gives $frac{pi}{2}<x<frac{3pi}{4}$.






                        share|cite|improve this answer


























                          0














                          Finishing what you did



                          $$sin(4x)>0iff$$



                          $$2kpi <4x<(2k+1)pi iff$$



                          $$frac{kpi}{2}<x<frac{kpi}{2}+frac{pi}{4}$$



                          $k=0$ gives $0<x<frac{pi}{4}$



                          and
                          $k=1$ gives $frac{pi}{2}<x<frac{3pi}{4}$.






                          share|cite|improve this answer
























                            0












                            0








                            0






                            Finishing what you did



                            $$sin(4x)>0iff$$



                            $$2kpi <4x<(2k+1)pi iff$$



                            $$frac{kpi}{2}<x<frac{kpi}{2}+frac{pi}{4}$$



                            $k=0$ gives $0<x<frac{pi}{4}$



                            and
                            $k=1$ gives $frac{pi}{2}<x<frac{3pi}{4}$.






                            share|cite|improve this answer












                            Finishing what you did



                            $$sin(4x)>0iff$$



                            $$2kpi <4x<(2k+1)pi iff$$



                            $$frac{kpi}{2}<x<frac{kpi}{2}+frac{pi}{4}$$



                            $k=0$ gives $0<x<frac{pi}{4}$



                            and
                            $k=1$ gives $frac{pi}{2}<x<frac{3pi}{4}$.







                            share|cite|improve this answer












                            share|cite|improve this answer



                            share|cite|improve this answer










                            answered Dec 1 at 19:12









                            hamam_Abdallah

                            37.9k21634




                            37.9k21634























                                0














                                As an alternative for a full solution we can consider two cases





                                • $sin x cos x >0$ that is $xin(0,pi/2)cup(pi,3pi/2)$


                                $$sin xcdotcos^3 x>sin^3xcdotcos x iffcos^2x>sin^2x iff2sin^2 x<1$$



                                $$-frac{sqrt 2}2<sin x<0 ,land, 0<sin x<frac{sqrt 2}2 iff color{red}{xin(0,pi/4)}cup(pi,5pi/4)$$





                                • $sin x cos x <0$ that is $xin(pi/2,pi)cup(3pi/2,2pi)$


                                $$sin xcdotcos^3 x>sin^3xcdotcos x iffcos^2x<sin^2x iff2sin^2 x>1$$



                                $$-1<sin x<-frac{sqrt 2}2,land, frac{sqrt 2}2<sin x <1 iff color{red}{xin(pi/2,3pi/4)}cup(3pi/2,7pi/4)$$



                                and then your solution is correct.






                                share|cite|improve this answer


























                                  0














                                  As an alternative for a full solution we can consider two cases





                                  • $sin x cos x >0$ that is $xin(0,pi/2)cup(pi,3pi/2)$


                                  $$sin xcdotcos^3 x>sin^3xcdotcos x iffcos^2x>sin^2x iff2sin^2 x<1$$



                                  $$-frac{sqrt 2}2<sin x<0 ,land, 0<sin x<frac{sqrt 2}2 iff color{red}{xin(0,pi/4)}cup(pi,5pi/4)$$





                                  • $sin x cos x <0$ that is $xin(pi/2,pi)cup(3pi/2,2pi)$


                                  $$sin xcdotcos^3 x>sin^3xcdotcos x iffcos^2x<sin^2x iff2sin^2 x>1$$



                                  $$-1<sin x<-frac{sqrt 2}2,land, frac{sqrt 2}2<sin x <1 iff color{red}{xin(pi/2,3pi/4)}cup(3pi/2,7pi/4)$$



                                  and then your solution is correct.






                                  share|cite|improve this answer
























                                    0












                                    0








                                    0






                                    As an alternative for a full solution we can consider two cases





                                    • $sin x cos x >0$ that is $xin(0,pi/2)cup(pi,3pi/2)$


                                    $$sin xcdotcos^3 x>sin^3xcdotcos x iffcos^2x>sin^2x iff2sin^2 x<1$$



                                    $$-frac{sqrt 2}2<sin x<0 ,land, 0<sin x<frac{sqrt 2}2 iff color{red}{xin(0,pi/4)}cup(pi,5pi/4)$$





                                    • $sin x cos x <0$ that is $xin(pi/2,pi)cup(3pi/2,2pi)$


                                    $$sin xcdotcos^3 x>sin^3xcdotcos x iffcos^2x<sin^2x iff2sin^2 x>1$$



                                    $$-1<sin x<-frac{sqrt 2}2,land, frac{sqrt 2}2<sin x <1 iff color{red}{xin(pi/2,3pi/4)}cup(3pi/2,7pi/4)$$



                                    and then your solution is correct.






                                    share|cite|improve this answer












                                    As an alternative for a full solution we can consider two cases





                                    • $sin x cos x >0$ that is $xin(0,pi/2)cup(pi,3pi/2)$


                                    $$sin xcdotcos^3 x>sin^3xcdotcos x iffcos^2x>sin^2x iff2sin^2 x<1$$



                                    $$-frac{sqrt 2}2<sin x<0 ,land, 0<sin x<frac{sqrt 2}2 iff color{red}{xin(0,pi/4)}cup(pi,5pi/4)$$





                                    • $sin x cos x <0$ that is $xin(pi/2,pi)cup(3pi/2,2pi)$


                                    $$sin xcdotcos^3 x>sin^3xcdotcos x iffcos^2x<sin^2x iff2sin^2 x>1$$



                                    $$-1<sin x<-frac{sqrt 2}2,land, frac{sqrt 2}2<sin x <1 iff color{red}{xin(pi/2,3pi/4)}cup(3pi/2,7pi/4)$$



                                    and then your solution is correct.







                                    share|cite|improve this answer












                                    share|cite|improve this answer



                                    share|cite|improve this answer










                                    answered Dec 1 at 20:02









                                    gimusi

                                    1




                                    1






























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