Question #19cb9

1 Answer
Bobert
Oct 19, 2017

The answer is #-sin(2)approx-0.035#.

Explanation:

One way to evaluate this limit is to use L'Hosptial's Rule.

You can use L'Hospital's Rule whenever a limit is equal to #0/0# or #oo/oo#. The rule states that #lim_(x->a)f(x)/g(x)=lim_(x->a)(f'(x))/(g'(x))#. Take note that this is NOT the quotient rule. Simply take the derivative of the numerator and the derivative of the denominator separately.

Applying the rule for this problem gives:

#lim_(x->1)-sin(1+x)/1#

#d/dx(cos(1+x))=-sin(1+x)#

#d/dx(cos(2))=0# because #cos(2)# is a constant.

#d/dx(x-1)=1#

Simplifying the limit gives:

#lim_(x->1) -sin(1+x)=-sin(2)#

#approx-0.035#

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