Lt x--> 0
(ln(3x+1)/(2x^2)+7)
Here the way the brakets are put the 7
is not in denominator. Actually 7 is a separate term and the given limit is rewitten as
follows:
Lt x--> 0 {ln(3x+1)/2x^2 + 7
.
Then Lt x--> 0 ln(3x+1)/2x^2 +
7
But lt x--> 0 ln(3x+1)/2x^2 is 0/0 form
indeterminate.
So we go for L'Hospital's rule of
defferentiating numerator and denominator and then taking the
limit.
Therfore (ln(3x+1)'/(2x^2)' =
3/(3x+1)(4x).
Therefore Ltx--> 0 ln(3x+1)/(2x^2) =
Lt 3/(3x+1)(4x) = 1/(3*0+1)(4*0) =
infinity.
2)
Lt x--> 0
(ln(3x+1)/x^2 divided by ((2x^2+7)/x^2) . Here the 7 is taken inside the braket. Thus
this is different expression.
Therefore lt x-->
0 (ln(3x+1))/x^2 / (2x^2+7)/x^2) = Ltx--> 0 ln(3x+1)/(2x^2+7) = 0/ (0+7) = 0/7 =
0 and this not an indeterminate form . So we can get the limit by just substituting x= 0
in the expression.
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