Lim _ {n tot infty} sum _ {i = 1} ^ n frac {3} {n} [( frac {i} {n}) ^ 2 + 1] ...... ... ??

Lim _ {n tot infty} sum _ {i = 1} ^ n frac {3} {n} [( frac {i} {n}) ^ 2 + 1] ...... ... ??
Anonim

Antwoord:

#4#

Uitleg:

# = lim_ {n-> oo} (3 / n ^ 3) sum_ {i = 1} ^ {i = n} i ^ 2 + (3 / n) sum_ {i = 1} ^ {i = n} 1 #

# "(Formule van Faulhaber)" #

# = lim_ {n-> oo} (3 / n ^ 3) (n (n + 1) (2n + 1)) / 6 + (3 / n) n #

# = lim_ {n-> oo} (3 / n ^ 3) n ^ 3/3 + n ^ 2/2 + n / 6 + (3 / n) n #

# = lim_ {n-> oo} 1 + ((3/2)) / n + ((1/2)) / n ^ 2 + 3 #

# = lim_ {n-> oo} 1 + 0 + 0 + 3 #

#= 4#

Antwoord:

# 4#.

Uitleg:

Hier is een ander weg naar oplossen de Probleem:

Herhaal dat, # int_0 ^ 1f (x) dx = lim_ (n tot oo) sum_ (i = 1) ^ n1 / nf (i / n) … (ster) #.

#:. "The Reqd. Lim. =" Lim_ (n to oo) sum_ (i = 1) ^ n3 / n {(i / n) ^ 2 + 1} #, # = 3 lim_ (n to oo) sum_ (i = 1) ^ n1 / n {(i / n) ^ 2 + 1} #, # = 3int_0 ^ 1 {(x) ^ 2 + 1} dx ………… omdat, (ster) #,

# 3 = x ^ 3/3 x + _0 ^ 1 #, # = X ^ 3 + 3x _0 ^ 1 #, # = 1 ^ 3 + 3xx1- (0 ^ 3 + 3xx0) #, #rArr "The Reqd. Lim. =" 4 #.