Hvordan differentierer du y = ln (e ^ x + sqrt (1 + e ^ (2x)))?

Svar:

# (dy) / (dx) = (e ^ x) / (sqrt (1 + e ^ (2x)))

Forklaring:

Brug kædelegemet.

#u (x) = e ^ x + (1 + e ^ (2x)) ^ (1/2) og y = ln (u) #

# (dy) / (du) = 1 / u = 1 / (e ^ x + (1 + e ^ (2x)) ^ (1/2)) #

# (du) / (dx) = e ^ x + d / (dx) ((1 + e ^ (2x)) ^ (1/2)) #

For kvadratroden brug kæde regel igen med

#phi = (1 + e ^ (2x)) ^ (1/2) #

#v (x) = 1 + e ^ (2x) og phi = v ^ (1/2) #

# (dv) / (dx) = 2e ^ (2x) og (dphi) / (dv) = 1 / (2sqrt (v)) #

# (dphi) / (dx) = (dphi) / (dv) (dv) / (dx) = (e ^ (2x)) / (sqrt (1 + e ^ (2x)))

#therefore (du) / (dx) = e ^ x + (e ^ (2x)) / (sqrt (1 + e ^ (2x)))

# (dy) / (dx) = (dy) / (du) (du) / (dx) #

# = 1 / (e ^ x + (1 + e ^ (2x)) ^ (1/2)) * (e ^ x + (e ^ (2x)) / (sqrt (1 + e ^ (2x)))) #

# = e ^ x / (e ^ x + sqrt (1 + e ^ (2x))) + e ^ (2x) / (sqrt (1 + e ^ (2x)) (e ^ x + sqrt ^ (2x))) #

Bringer sammen over LCD:

(e + x ^) (e + x ^) + e ^ (2x)) / (sqrt (1 + e ^ (2x)) (e ^ x + sqrt (1 + e ^ (2x))) #

Tag faktor af # E ^ x # ude af tælleren:

# = (e ^ x (sqrt (1 + e ^ (2x)) + e ^ x)) / (sqrt (1 + e ^ (2x)) (e ^ x + sqrt (1 + e ^ (2x))) #

Annuller ud og få

# = (E ^ x) / (sqrt (1 + e ^ (2x))) #

Hvordan differentierer du sqrt (cos (x ^ 2 + 2)) + sqrt (cos ^ 2x + 2)?

(dy) / (dx) = (xsen (x ^ 2 + 2) + sen (x + 2)) / (sqrtcos (x ^ 2 + 2) + sqrt (cos ^ 2 (x + 2)) ) / (dx) = 1 / (2sqrtcos (x ^ 2 + 2) + sqrt (cos ^ 2 (x + 2)) * sen (x ^ 2 + 2) * 2x + 2sen (x + 2) ) / (dx) = (2xsen (x ^ 2 + 2) + 2sen (x + 2)) / (2sqrtcos (x ^ 2 + 2) + sqrt (cos ^ 2 (x + 2))) (dx) = (annuller2 (xsen (x ^ 2 + 2) + sen (x + 2))) / (annullér2sqrtcos (x ^ 2 + 2) + sqrt (cos ^ 2 (x + 2))) / (dx) = (xsen (x ^ 2 + 2) + sen (x + 2)) / (sqrtcos (x ^ 2 + 2) + sqrt (cos ^ 2 (x + 2)))

Hvordan forenkler du (1 / sqrt (a-1) + sqrt (a + 1)) / (1 / sqrt (a + 1) -1 / sqrt (a-1)) div sqrt (a-1) sqrt (a + 1) - (a + 1) sqrt (a-1)), a> 1?

Kæmpe matematisk formatering ...> farve (blå) ((1 / sqrt (a-1) + sqrt (a + 1)) / (1 / sqrt (a + 1) -1 / sqrt (a-1)) ) / (sqrt (a + 1) / (a-1) sqrt (a + 1) - (a + 1) sqrt (a-1))) = farve (rød) 1) + sqrt (a + 1)) / ((sqrt (a-1) -sqrt (a + 1)) / (sqrt (a + 1) cdot sqrt (a-1))) / +1) / (sqrt (a-1) cdot sqrt (a-1) cdot sqrt (a + 1) -sqrt (a + 1) cdot sqrt (a + 1) sqrt (a-1))) = farve blå) ((1 / sqrt (a-1) + sqrt (a + 1)) / ((sqrt (a-1) -sqrt (a + 1)) / (sqrt (a + 1) cdot sqrt -1)))) (sqrt (a + 1) / (sqrt (a + 1) cdot sqrt (a-1) (sqrt (a-1) -sqrt (a + 1))) = farve / (Sqrt (a-1) -sqrt (a + 1)) / (sqrt (a +

Hvordan differentierer du f (x) = sqrt (ln (1 / sqrt (xe ^ x)) ved hjælp af kædelegemet.?

Bare kæde regel igen og igen. f (x) = e ^ x (1 + x) / 4sqrt (xe ^ x) / (ln (1 / sqrt (xe ^ x)) (xe ^ x) ^ 3)) f (x) = sqrt Ok, det bliver det svært: f '(x) = (sqrt (ln (1 / sqrt (xe ^ x)))) = = 1 / (2sqrt (ln (1 / sqrt (xe ^ x)))) * (ln (1 / sqrt (xe ^ x))) = = 1 / (2sqrt (ln (1 / sqrt (xe ^ x)))) * 1 / (1 / sqrt (xe ^ x)) (1 / sqrt (xe ^ x)) = = 1 / (2sqrt (ln (1 / sqrt (xe ^ x))) * sqrt (xe ^ x) (1 / sqrt (xe ^ x))) (1 / sqrt (xe ^ x)) = = sqrt (xe ^ x) ^ - (1/2)) = = sqrt (xe ^ x) / (2sqrt (ln) (Xe ^ x) ^ - (3/2)) (xe ^ x) '= = sqrt (xe ^ x) / (4sqrt ln (1 / sqrt (xe ^ x)))) (xe ^ x) ^ - (3/2)) (xe ^ x