Resol (2 + sqrt3) cos theta = 1-pecat theta?

Resposta:

# rarrx = (6n-1) * (pi / 3) #

# rarrx = (4n + 1) pi / 2 # On? # nrarrZ #

Explicació:

#rarr (2 + sqrt (3)) cosx = 1-sinx

# rarrtan75 ^ @ * cosx + sinx = 1 #

#rarr (sin75 ^ @ * cosx) / (cos75 ^ @) + sinx = 1 #

# rarrsinx * cos75 ^ @ + cosx * sin75 ^ @ = cos75 ^ @ = sin (90 ^ @ - 15 ^ @) = sin15 ^ @ #

#rarrsin (x + 75 ^ @) - sin15 ^ @ = 0 #

# rarr2sin ((x + 75 ^ @ - 15 ^ @) / 2) cos ((x + 75 ^ @ + 15 ^ @) / 2) = 0 #

#rarrsin ((x + 60 ^ @) / 2) * cos ((x + 90 ^ @) / 2) = 0

Qualsevol #rarrsin ((x + 60 ^ @) / 2) = 0

#rarr (x + 60 ^ @) / 2 = npi #

# rarrx = 2npi-60 ^ @ = 2npi-pi / 3 = (6n-1) * (pi / 3) #

o, #cos ((x + 90 ^ @) / 2) = 0

#rarr (x + 90 ^ @) / 2 = (2n + 1) pi / 2 #

# rarrx = 2 * (2n + 1) pi / 2-pi / 2 = (4n + 1) pi / 2 #

Resposta:

Si, # costheta = 0 => sintheta = 1 => theta = (4k + 1) pi / 2, kinZ #

# theta = 2kpi-pi / 3, kinZ #,

Explicació:

# (2 + sqrt3) costheta = 1-sintheta #

#andcostheta! = 0 #, dividint els dos costats per # costheta #

# 2 + sqrt3 = sectheta-tantheta => sectheta-tantheta = 2 + sqrt3 a (I) #

#:. 1 / (sectheta-tantheta) = 1 / (2 + sqrt3) ## => (sec ^ 2theta-tan ^ 2theta) / (sectheta-tantheta) = 1 / (2 + sqrt3) * (2-sqrt3) / (2-sqrt3) #

# => sectheta + tantheta = 2-sqrt3 a (II) #

S'està afegint # (I) i (II) #,obtenim.# 2sectheta = 4 => sectheta = 2 #

#color (vermell) (costheta = 1/2> 0) #, A partir de l’equn donat.

# costheta = 1/2 => (2 + sqrt3) (1/2) = 1-sintheta ## => 1 + sqrt (3) / 2 = 1-sintheta => color (vermell) (sintheta = -sqrt (3) / 2 <0) #

# theta = 2kpi-pi / 3, kinZ #,………. # (IV ^ (th) #quadrant)

Mostrar que cos²π / 10 + cos²4π / 10 + cos² 6π / 10 + cos²9π / 10 = 2. Estic una mica confós si fa Cos²4π / 10 = cos² (π-6π / 10) & cos²9π / 10 = cos² (π-π / 10), es tornarà negatiu com cos (180 ° -theta) = - costheta a el segon quadrant. Com puc provar la pregunta?

Si us plau mireu més a baix. LHS = cos ^ 2 (pi / 10) + cos ^ 2 ((4pi) / 10) + cos ^ 2 ((6pi) / 10) + cos ^ 2 ((9pi) / 10) = cos ^ 2 (pi / 10) + cos ^ 2 ((4pi) / 10) + cos ^ 2 (pi- (4pi) / 10) + cos ^ 2 (pi- (pi) / 10) = cos ^ 2 (pi / 10) + cos ^ 2 ((4pi) / 10) + cos ^ 2 (pi / 10) + cos ^ 2 ((4pi) / 10) = 2 * [cos ^ 2 (pi / 10) + cos ^ 2 ((4pi) / 10)] = 2 * [cos ^ 2 (pi / 2- (4pi) / 10) + cos ^ 2 ((4pi) / 10)] = 2 * [sin ^ 2 ((4pi) / 10) + cos ^ 2 ((4pi) / 10)] = 2 * 1 = 2 = RHS

Trobeu el valor de theta, si, Cos (theta) / 1 - sin (theta) + cos (theta) / 1 + sin (theta) = 4?

Theta = pi / 3 o 60 ^ @ bé. Tenim: costheta / (1-sintheta) + costheta / (1 + sintheta) = 4 Ara ignorarem el RHS. costheta / (1-sintheta) + costheta / (1 + sintheta) (costheta (1 + sintheta) + costheta (1-sintheta)) / ((1-sintheta) (1 + sintheta)) (costheta ((1-sintheta) ) + (1 + sintheta))) / (1-sin ^ 2theta) (costheta (1-sintheta + 1 + sintheta)) / (1-sin ^ 2theta) (2costheta) / (1-sin ^ 2theta) Segons la identitat pitagòrica, sin ^ 2theta + cos ^ 2theta = 1. Així: cos ^ 2theta = 1-sin ^ 2theta Ara que sabem que, podem escriure: (2costheta) / cos ^ 2theta 2 / costheta = 4 costheta / 2 = 1/4 costheta = 1/2 t

Mostrar que, (1 + cos theta + i * sin theta) ^ n + (1 + cos theta - i * sin theta) ^ n = 2 ^ (n + 1) * (cos theta / 2) ^ n * cos ( n * theta / 2)?

Si us plau mireu més a baix. Sigui 1 + costheta + isintheta = r (cosalpha + isinalpha), aquí r = sqrt ((1 + costheta) ^ 2 + sin ^ 2theta) = sqrt (2 + 2costheta) = sqrt (2 + 4cos ^ 2 (theta / 2 ) -2) = 2cos (theta / 2) i tanalpha = sintheta / (1 + costheta) == (2sin (theta / 2) cos (theta / 2)) / (2cos ^ 2 (theta / 2)) = tan (theta / 2) o alpha = theta / 2 llavors 1 + costheta-isintheta = r (cos (-alpha) + isin (-alpha)) = r (cosalpha-isinalpha) i podem escriure (1 + costheta + isintheta) ^ n + (1 + costheta-isintheta) ^ n usant el teorema de DE MOivre com r ^ n (cosnalpha + isinnalpha + cosnalpha-isinnalpha) = 2r