KADAMBALA VAMSIApproved Tutor Answer13 Years ago ∫(sinx)/(sin4x) dx =∫1/4cosxcos2x dx =1/4 ∫cosx dx /cos2xcos2x ==1/4 ∫cosx dx /(1-sin2x)(1-2sin2x) let sinx =t cosx dx =dt =1/4 ∫dt /(1-t2)(1-2t2) use partial fraction =-1/4 ∫dt /(1-t2) + 1/8 ∫dt /(1-2t2) now onwards it is easily calculated