\(\cos^4x+\sin^2x.cos^2x+sin^2x\)
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Chọn C.
Ta có
C = [ ( sin2x + cos2x) – sin2cos2x]2 - [ ( sin4x + cos4x) 2 - 2sin4x.cos4x]
= 2[ 1-sin2x.cos2x]2 - [ ( sin2x + cos2x) 2 - 2sin2x.cos2x]2 + 2sin4x.cos4x
= 2[ 1-sin2x.cos2x]2 - [1-sin2x.cos2x]2 + 2sin4x.cos4x
= 2( 1 - 2sin2x.cos2x + sin4x.cos4x)- ( 1 - 4sin2xcos2x + 4sin4x.cos4x) + 2sin4x.cos4x
= 1.
\(VT=sin^4x\cdot\dfrac{cos^2x}{sin^2x}+cos^4x\cdot\dfrac{sin^2x}{cos^2x}+sin^4x-sin^2x\cdot cos^2x\)
\(=sin^2x\cdot cos^2x+cos^2x\cdot sin^2x+sin^4x-sin^2x\cdot cos^2x\)
\(=sin^2x\left(sin^2x+cos^2x\right)=sin^2x=VP\)
Chọn C.
Ta có: C = 2( sin4x + cos4x + sin2x.cos2x) 2 - ( sin8x + cos8x)
= 2 [ (sin2x + cos2x) 2 - sin2x.cos2x]2 - [ (sin4x + cos4x)2 - 2sin4x.cos4x]
= 2[ 1 - sin2x.cos2x]2 - [ (sin2x+ cos2x) 2 - 2sin2x.cos2x]2 + 2sin4x.cos4x
= 2[ 1- sin2x.cos2x]2 - [ 1 - 2sin2x.cos2x]2 + 2sin4x.cos4x
= 2( 1 - 2sin2xcos2x+ sin4x.cos4x) –( 1- 4sin2xcos2x+ 4sin4xcos4x) + 2sin4x.cos4x
= 1.
(sin2x - 4cos2x)(sin2x - 2sinx.cosx) = 2cos4x
⇔ (5sin2x - 4)(sin2x - sin2x) = 2cos4x
⇔ \(\left(\dfrac{5-5cos2x}{2}-4\right)\left(\dfrac{1-cos2x}{2}-sin2x\right)\)= 2cos4x
⇔ \(\dfrac{5-5cos2x-8}{2}.\dfrac{1-cos2x-2sin2x}{2}\) = 2cos4x
⇔ (5cos2x + 3)(cos2x + 2sin2x - 1) = 8cos4x
⇔ 5cos22x + 5cos2x.sin2x + 3cos2x + 6sin2x - 3 = 8cos4x
⇔ 5.\(\dfrac{1+cos4x}{2}\) + \(\dfrac{5}{2}sin4x\) + 3cos2x + 6sin2x - 3 = 8cos4x
⇔ \(\dfrac{5}{2}cos4x+\dfrac{5}{2}sin4x+3cos2x+6sin2x-\dfrac{1}{2}\) = 8cos4x
⇔ 5cos4x + 5sin4x + 6cos2x + 12sin2x - 1 = 16cos4x
VP = 16cos4x = 16 . \(\dfrac{\left(1+cos2x\right)^2}{4}\) = 4. (1 + cos2x)2
VP = 4 . (1 + 2cos2x + cos22x)
VP = 4 + 8cos2x + 4 . \(\dfrac{1+cos4x}{2}\)
VP = 6 + 8cos2x+ 2cos4x
Vậy 3cos4x + 5sin4x - 2cos2x + 12sin2x - 7 = 0
Chọn A.
Từ giả thiết suy ra:
A = (cos4x + cos2x sin2x) + sin2x = cos2x(sin2x + cos2x ) + sin2x
A = cos2x.1 + sin2x = 1
Chọn A
y = cos6 x+ sin2xcos2x(sin2x + cos2x) + sin4x - sin2x
= cos6x + sin2x(1 - sin2x) + sin4x - sin2x = cos6x
Do đó : y' = -6cos5xsinx.
\(cos^4x+sin^2x.cos^2x+sin^2x\)
\(=cos^2x.cos^2x+sin^2x.cos^2x+sin^2x\)
\(=cos^2x\left(cos^2x+sin^2x\right)+sin^2x\)
\(=cos^2x.1+sin^2x\)
\(=cos^2x+sin^2x\)
\(=1\)