What is the limit of #(1/2x+sinx)# as x goes to infinity?

1 Answer
Jim H
Oct 22, 2015

#lim_(xrarroo)(1/2x+sinx) = oo#

Explanation:

Explanation 1

As #x# increases without bound, so does #1/2x#. Meanwhile #sinx# is bounded by #-1# and #1#. We have an increasing quantity plus a bounded quantity. The sun increases without bound.

Explanation 2

Note that #lim_(xrarroo)sinx/x = 0# (Use the squeeze theroem.)

#1/2x+sinx = x(1/2+sinx/x)#

#lim_(xrarroo)(1/2x+sinx) = lim_(xrarro)(x(1/2+sinx/x))#

The first factor goes to #oo# and the second to #1/2#, so the product goes to #oo#.

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