Giải phương trình
$4cos^3x - 4sin^3x+ 3\sin x - 3\cos x = -1$
$4cos^3x-4sin^3x+3sinx-3cosx=-1$

$<=>4(cos^3x-sin^3x)-3(cosx-sinx)+1=0$

$<=>4(cosx-sinx)(cos^2x+sin^2x+sinxcosx)-3(cosx-sinx)+1=0$

$<=>4(cosx-sinx)(1+sinxcosx)-3(cosx-sinx)+1=0$

đặặt$t=cosx-sinx=>t^2=cos^2x+sin^2x-2sinxcosx=>sinxcosx=\frac{1-t^2}{2}$

phương tìinh có dạng $4t(1+\frac{1-t^2}{2})-3t+1=0$


HÌNH NHƯ XẾP ĐANG RẢNH NÊN POST CHƠI THÌ PHẢI :D
neu e pit.hj –  ♥♥♥ Panda Sơkiu Panda Mập ♥♥♥ 29-07-14 08:44 PM
thiệt chứ em :) hnao a đăng lên thì nhớ giải giúp a luôn nhé :) –  Đức Vỹ 28-07-14 03:58 PM
thiet hơm do a. :D hay la k co co nao di choi cung nen ranh roi sinh nong noi the :)) –  ♥♥♥ Panda Sơkiu Panda Mập ♥♥♥ 28-07-14 02:37 PM
đang bận lắm- :) có đứa em nó hỏi ấy mà ^^! –  Đức Vỹ 28-07-14 02:32 PM
pt  $\Leftrightarrow (4cos^{3}x-3cosx)+(3sinx-4sin^{3}x)=-1$
  $\Leftrightarrow cos3x+sin3x=-1$
  $\Leftrightarrow sin(3x+\frac{\pi}{4})=-\frac{1}{\sqrt{2}}$
 
ngan gon hon chi day. co tien bo :)) –  ♥♥♥ Panda Sơkiu Panda Mập ♥♥♥ 29-07-14 08:44 PM

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