\(A=sin42^0-cos48^0=cos\left(90^0-42^0\right)-cos48^0=cos48^0-cos48^0=0\)

\(B=cot56^0-tan34^0=tan\left(90^0-56^0\right)-tan34^0=tan34^0-tan34^0=0\)

\(C=sin30^0-cot50^0-cos60^0+tan40^0\)

\(=cos\left(90^0-30^0\right)-tan\left(90^0-50^0\right)-cos60^0+tan40^0\)

\(=cos60^0-tan40^0-cos60^0+tan40^0=0\)

\(A=\sin42^0-\cos48^0=\sin42^0-\sin42^0=0\)

\(B=\cot56^0-\tan34^0=\tan34^0-\tan34^0=0\)

a: \(cos32=sin58;cos53=sin37;cos8=sin82\)

18<37<44<58<82

=>\(sin18< sin37< sin44< sin58< sin82\)

=>\(sin18< cos53< sin44< cos32< cos8\)

b: 20<45

=>\(sin20< tan20\)

\(cot8=tan82;cot37=tan53\)

20<40<53<82

=>\(tan20< tan40< tan53< tan82\)

=>\(tan20< tan40< cot37< cot8\)

=>\(sin20< tan20< tan40< cot37< cot8\)

a: \(A=sin^210^0+sin^280^0+cos^220^0+sin^270^0\)

\(=sin^210^0+cos^210^0+sin^270^0+sin^270^0\)

\(=2\cdot sin^270^0+1\)

b: \(=sin^215^0+sin^275^0+sin^235^0+sin^255^0\)

\(=sin^215^0+cos^215^0+sin^235^0+cos^235^0\)

=1+1

=2

\(A=sin^210^0+sin^280^0+cos^220^0+sin^270^0\)

\(=sin^210^0+cos^210^0+sin^270^0+sin^270^0\)

\(=2sin^270^0+1\)

\(B=sin^215^0+sin^275^0+sin^235^0+sin^255^0\)

\(=sin^215^0+cos^215^0+sin^235^0+cos^235^0\)

=1+1

=2

a: \(cos70=sin20\)

20<25

=>\(sin20< sin25\)

=>\(cos70< sin25\)

b: \(\dfrac{sin50}{cos40}=\dfrac{cos\left(90-50\right)}{cos40}=\dfrac{cos40}{cos40}=1\)

a) Ta có: 

\(cos70^o=sin\left(90^o-70^o\right)=sin20^o\)

Ta so sánh \(sin25^o\) và \(sin20^o\)

\(25^o>20^o\Rightarrow sin25^o>sin20^o\)

\(\Rightarrow sin25^o>cos70^o\)

b) \(\dfrac{sin50^o}{cos40^o}\)

Ta có: 

\(cos40^o=sin\left(90^o-40^o\right)=sin50^o\)

\(\Rightarrow\dfrac{sin50^o}{cos40^o}=\dfrac{sin50^o}{sin50^o}=1\)

C.

C

C.

\(A=sin^210^o+cos^220^o+sin^280^o+cos^270^o\)

\(A=\left(sin^210^o+sin^280^o\right)+\left(cos^220^o+cos^270^o\right)\)

\(A=0+0\)

\(A=0\)