tham khảo:

a)\(y'=xsin2x+sin^2x\)

\(y'=sin^2x+xsin2x\)

b)\(y'=-2sin2x+2cosx\\ y'=2\left(cosx-sin2x\right)\)

c)\(y=sin3x-3sinx\)

\(y'=3cos3x-3cosx\)

d)\(y'=\dfrac{1}{cos^2x}-\dfrac{1}{sin^2x}\)

\(y'=\dfrac{sin^2x-cos^2x}{sin^2x.cos^2x}\)

\(y=\sin\left(\dfrac{\pi}{2}-2x\right)=\cos2x\Rightarrow y'=\left(\cos2x\right)'=-2\sin2x\)

\(a,y'=\left(f\left(g\left(x\right)\right)\right)'\)

\(=f'\left(g\left(x\right)\right).g'\left(x\right)\)

\(=e^{g\left(x\right)}.\left(2x-1\right)\)

\(=e^{x^2-x}.\left(2x-1\right)\)

\(b,y'=\dfrac{d}{dx}\left(3^{sinx}\right)\)

\(=\dfrac{d}{dx}\left(e^{ln3.sinx}\right)\)

\(=\dfrac{d}{dx}\left(ln3.sinx\right).e^{ln3.sinx}\)

\(=ln3.cosx.3^{sinx}\)

Đặt u = π/2 - x thì u' = -1

Do cos⁡(π/2-x) = sin⁡x

a: \(y=u^2=\left(sinx\right)^2\)

b: \(y'\left(x\right)=\left(sin^2x\right)'=2\cdot sinx\cdot cosx\)

\(y'\left(u\right)=\left(u^2\right)'=2\cdot u\)

\(u'\left(x\right)=\left(sinx\right)'=cosx\)

=>\(y'\left(x\right)=y'\left(u\right)\cdot u'\left(x\right)\)

a) Đặt \(u = 3{\rm{x}}\) thì \(y = \sin u\). Ta có: \(u{'_x} = {\left( {3{\rm{x}}} \right)^\prime } = 3\) và \(y{'_u} = {\left( {\sin u} \right)^\prime } = \cos u\).

Suy ra \(y{'_x} = y{'_u}.u{'_x} = \cos u.3 = 3\cos 3{\rm{x}}\).

Vậy \(y' = 3\cos 3{\rm{x}}\).

b) Đặt \(u = \cos 2{\rm{x}}\) thì \(y = {u^3}\). Ta có: \(u{'_x} = {\left( {\cos 2{\rm{x}}} \right)^\prime } =  - 2\sin 2{\rm{x}}\) và \(y{'_u} = {\left( {{u^3}} \right)^\prime } = 3{u^2}\).

Suy ra \(y{'_x} = y{'_u}.u{'_x} = 3{u^2}.\left( { - 2\sin 2{\rm{x}}} \right) = 3{\left( {\cos 2{\rm{x}}} \right)^2}.\left( { - 2\sin 2{\rm{x}}} \right) =  - 6\sin 2{\rm{x}}{\cos ^2}2{\rm{x}}\).

Vậy \(y' =  - 6\sin 2{\rm{x}}{\cos ^2}2{\rm{x}}\).

c) Đặt \(u = \tan {\rm{x}}\) thì \(y = {u^2}\). Ta có: \(u{'_x} = {\left( {\tan {\rm{x}}} \right)^\prime } = \frac{1}{{{{\cos }^2}x}}\) và \(y{'_u} = {\left( {{u^2}} \right)^\prime } = 2u\).

Suy ra \(y{'_x} = y{'_u}.u{'_x} = 2u.\frac{1}{{{{\cos }^2}x}} = 2\tan x\left( {{{\tan }^2}x + 1} \right)\).

Vậy \(y' = 2\tan x\left( {{{\tan }^2}x + 1} \right)\).

d) Đặt \(u = 4 - {x^2}\) thì \(y = \cot u\). Ta có: \(u{'_x} = {\left( {4 - {x^2}} \right)^\prime } =  - 2{\rm{x}}\) và \(y{'_u} = {\left( {\cot u} \right)^\prime } =  - \frac{1}{{{{\sin }^2}u}}\).

Suy ra \(y{'_x} = y{'_u}.u{'_x} =  - \frac{1}{{{{\sin }^2}u}}.\left( { - 2{\rm{x}}} \right) = \frac{{2{\rm{x}}}}{{{{\sin }^2}\left( {4 - {x^2}} \right)}}\).

Vậy \(y' = \frac{{2{\rm{x}}}}{{{{\sin }^2}\left( {4 - {x^2}} \right)}}\).

\(y'=\left(cosx\right)'\\ =\left(\dfrac{\pi}{2}-x\right)'cos\left(\dfrac{\pi}{2}-x\right)\\ =-cos\left(\dfrac{\pi}{2}-x\right)\\ =-sinx\)

ĐKXĐ:

a. \(cos\left(x-\dfrac{2\pi}{3}\right)\ne0\Rightarrow x-\dfrac{2\pi}{3}\ne\dfrac{\pi}{2}+k\pi\Rightarrow x\ne\dfrac{\pi}{6}+k\pi\)

b. \(sin\left(x+\dfrac{\pi}{6}\right)\ne0\Rightarrow x+\dfrac{\pi}{6}\ne k\pi\Rightarrow x\ne-\dfrac{\pi}{6}+k\pi\)

c. \(\dfrac{1+x}{2-x}\ge0\Rightarrow-1\le x< 2\)

Chọn B.