\(A=\left(cos36-sin36\right)\left(cos37-sin38\right)\left(cos42-sin48\right)\)

=1 bạn nhé

a, sin 27^o = cos 63^o

\(\Rightarrow\) \(\frac{sin27^o}{cos63^o}\) = 1

b, tan 18^o = cot 72^o

\(\Rightarrow\) tan 18^o - cot 72^o = 0

c, sin²30^o + cos²30^o = 1

d, tan 27^o x cos 27^o = sin 27^o \(\approx\) 0,45

Chúc bn học tốt

Ta có \(\cot\alpha=\tan\beta\) ; \(\cos^2\alpha+\sin^2\alpha=1\)

Khi đó \(-\frac{\cot58^{\text{o}}+\tan27^{\text{o}}}{\cot63^{\text{o}}+\tan32^{\text{o}}}+1=\frac{-\cot58^{\text{o}}-\tan27^{\text{o}}+\cot63^{\text{o}}+\tan32^{\text{o}}}{\cot63^{\text{o}}+\tan32^{\text{o}}}\)

\(=\frac{\left(\tan32^{\text{o}}-\cot58^{\text{o}}\right)+\left(\cot63^{\text{o}}-\tan27^{\text{o}}\right)}{\cot63^{\text{o}}+\tan32^{\text{o}}}=0\)

=> \(\frac{\cot58^{\text{o}}+\tan27^{\text{o}}}{\cot63^{\text{o}}+\tan32^{\text{o}}}=1\)

=> \(\cos^255^{\text{o}}-\frac{\cot58^{\text{o}}+\tan27^{\text{o}}}{\cot63^{\text{o}}+\tan32^{\text{o}}}=\cos^255^{\text{o}}-1=-\sin^255\) 

a) Ta có: sin30=cos60, sin50=cos40

    Mà cos30 < cos38 < cos40 < cos60 < cos80

    Nên cos30 < cos38 < sin50 < sin30 < cos80

b) Ta có: tan75=cot15, tan63=cot27 => cot11 < tan75 < cot20 < tan63 (1)

         và: sin49=cos41 => cos30 < sin49 (2)

    Lại có: cot11=tan69 > tan49= sin49:cos49 > sin49 (do cos49<1) (3)

    Từ (1), (2) và (3) suy ra: cos30 < sin49 < cot11 < tan75 < cot20 < tan63

TA CÓ   \(\sin30\)= \(\cos60\)

             \(\sin50=\cos40\)

---->>  \(\cos30< \cos38< \cos40< \cos60< \cos80\)

------>> \(\cos30< \cos38< \sin50< \sin60< \cos80\)

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