Isulat muli ang kasalanan ^ 4 (x) tan ^ 2 (x) sa mga tuntunin ng unang kapangyarihan ng cosine?

Isulat muli ang kasalanan ^ 4 (x) tan ^ 2 (x) sa mga tuntunin ng unang kapangyarihan ng cosine?
Anonim

Sagot:

# => (1-3cos ^ 2 (x) + 3cos ^ 4 (x) -cos ^ 6 (x)) / cos ^ 2 (x) #

Paliwanag:

# sin ^ 4 (x) tan ^ 2 (x) #

# => (1-cos ^ 2 (x)) ^ 2 (sin ^ 2 (x)) / cos ^ 2 (x) #

# => (1-2cos ^ 2 (x) + cos ^ 4 (x)) (sin ^ 2 (x)) / cos ^ 2 (x) #

(x) cos ^ 2 (x) cos ^

(X)) cos ^ 2 (x) + (1-cos ^ 2 (x)) cos ^ 4 (x) / cos ^ 2 (x) #

# => (1-cos ^ 2 (x) -2cos ^ 2 (x) + 2cos ^ 4 (x) + cos ^ 4 (x) -cos ^ 6 (x)

# => (1-3cos ^ 2 (x) + 3cos ^ 4 (x) -cos ^ 6 (x)) / cos ^ 2 (x) #

Sagot:

# sin ^ 4xtan ^ 2x = - (cos (6x) -6cos (4x) + 15cos (2x) -10) / (16cos (2x) +16) #

Paliwanag:

# sin ^ 4xtan ^ 2x = sin ^ 6x / cos ^ 2x #

#cos (2x) = cos ^ 2x-sin ^ 2x #

#color (white) (cos (2x)) = cos ^ 2x- (1-cos ^ 2x) #

#color (white) (cos (2x)) = 2cos ^ 2x-1 #

# cos ^ 2x = (cos (2x) +1) / 2 #

Gamit ang Theoreom ni De Moivre, maaari naming suriin # sin ^ 6x #:

# 2isin (x) = z-1 / z # (kung saan # z = cosx + isinx #)

# (2isin (x)) ^ 6 = (z-1 / z) ^ 6 #

# -64sin ^ 6 (x) = z ^ 6-6z ^ 4 + 15z ^ 2-20 + 15 / z ^ 2-6 / z ^ 4 + 1 / z ^ 6 #

# -64sin ^ 6 (x) = - 20+ (z ^ 6 + 1 / z ^ 6) -6 (z ^ 4-1 / z ^ 4) +15 (z ^ 2-1 / z ^ 2) #

# (z ^ n-1 / z ^ n) = 2cos (nx) #

# sin ^ 6 (x) = (- 20 + 2cos (6x) -12cos (4x) + 30cos (2x)) / - 64 #

- 2cos (6x) -12cos (4x) + 30cos (2x)) / - 64) / ((cos (2x) +1) + 30cos (2x) -20) / (32cos (2x) +32) #

# sin ^ 4xtan ^ 2x = sin ^ 6x / cos ^ 2x = - (cos (6x) -6cos (4x) + 15cos (2x) -10) / (16cos (2x) +16) #

Sagot:

# sin ^ 4x * tan ^ 2x = 1/16 (10-15cos2x + 6cos4x-cos6x) / (1 + cos2x) #

Paliwanag:

Gagamitin namin, # rarrsin ^ 2x = (1-cos2x) / 2 #

# rarrcos ^ 2x = (1 + cos2x) / 2 #

# rarr4cos ^ 3x = cos3x + 3cosx #

Ngayon, # rArrtan ^ 2x * sin ^ 4x #

# = sin ^ 2x / cos ^ 2x * sin ^ 4x #

# = (sin ^ 2x) ^ 3 / cos ^ 2x #

# = ((1-cos2x) / 2) ^ 3 / ((1 + cos2x) / 2) #

# = 1/4 (1-cos2x) ^ 3 / (1 + cos2x) #

# = 1/4 (1-3cos2x + 3cos ^ 2 (2x) -cos ^ 3 (2x)) / (1 + cos2x) #

# = 4 / (4 * 4) (1-3cos2x + 3cos ^ 2 (2x) -cos ^ 3 (2x)) / (1 + cos2x) #

# = 1/16 (4-3 * 4cos2x + 3 * 2 * {2cos ^ 2 (2x)} - 4cos ^ 3 (2x)) / (1 + cos2x) #

# = 1/16 (4-12cos2x + 3 * 2 * {1 + cos4x} - {cos6x + 3cos2x}) / (1 + cos2x) #

# = 1/16 (4-12cos2x + 6 + 6cos4x-cos6x-3cos2x) / (1 + cos2x) #

# = 1/16 (10-15cos2x + 6cos4x-cos6x) / (1 + cos2x) #