Hvordan integrerer du int dx / (x ^ 2 + 1) ^ 2 ved hjælp af trig-substitutioner?

Svar:

# x dx / (x ^ 2 + 1) ^ 2 = (1/2) (tan ^ -1 (x) + x / (1 + x ^ 2)) #

Forklaring:

#int dx / (x ^ 2 + 1) ^ 2 #

Brug # X = tan (a) #

# Dx = sec ^ 2 (a) da #

# intdx / (x ^ 2 + 1) ^ 2 = int (sec ^ 2 (a) da) / (1 + tan ^ 2a) ^ 2 #

Brug identiteten # 1 + tan ^ 2 (a) = sec ^ 2 (a) #

# intdx / (x ^ 2 + 1) ^ 2 = int (sec ^ 2 (a) da) / sec ^ 4 (a) #

# = int (da) / sec ^ 2 (a) #

# = int cos ^ 2 (a) da #

# = int ((1 + cos (2a)) / 2) da #

# = (1/2) (int (da) + int cos (2a) da) #

# = (1/2) (a + sin (2a) / 2) #

# = (1/2) (a + (2sin (a) cos (a)) / 2) #

# = (1/2) (a + sin (a).cos (a)) #

vi ved det # A = tan ^ -1 (x) #

#sin (a) = x / (sqrt (1 + x ^ 2) #

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

#int dx / (x ^ 2 + 1) ^ 2 = (1/2) (tan ^ -1 (x) + synd (sin ^ -1 (x / (sqrt (1 + x ^ 2)) cos cos ^ -1 (1 / (sqrt (1 + x ^ 2)))) #

# = (1/2) (tan ^ -1 (x) + (x / (sqrt (1 + x ^ 2)) 1 / sqrt (1 + x ^ 2)) #

# = (1/2) (tan ^ -1 (x) + x / (1 + x ^ 2)) #

Svar:

#int dx / (x ^ 2 + 1) ^ 2 = 1/2 (arctan (x) + x / (x ^ 2 + 1)) #

Forklaring:

#int dx / (x ^ 2 + 1) ^ 2 # udfører substitutionen

#x = tan (y) # og dermed

#dx = dy / (cos (y) ^ 2) #

vi har

#int dx / (x ^ 2 + 1) ^ 2 ækvnt int dy / (cos (y) ^ 2 (1 / cos (y) ^ 4)) = int cos (y) ^ 2dy #

men

# d / (dy) (sin (y) cos (y)) = cos (y) ^ 2-sin (y) ^ 2 = 2 cos (y) ^ 2-1 #

derefter

#int cos (y) ^ 2 dy = 1/2 (y + sin (y) cos (y)) #

Endelig minder om #y = arctan (x) # vi har

#int dx / (x ^ 2 + 1) ^ 2 = 1/2 (arctan (x) + x / (x ^ 2 + 1)) #