Question #4e891

1 Answer
Jan 26, 2018

1

Explanation:

#lim (x^2-7x+10)/|x^2-4|#
#x->oo#

As #x# tends to #oo# , therefore #|x^2-4|# can be replaced by #x^2-4#

#lim (x^2-7x+10)/(x^2-4)#
#x->oo#

This is #oo/oo# indeterminate form,
This can be easily solved by dividing the numerator and denominator by highest power of #x# in the expression (Here, #x^2#)

#lim ((x^2)/x^2-(7x)/x^2+(10)/x^2)/((x^2)/x^2-4/x^2)#
#x->oo#

#lim (1-(7)/x+(10)/x^2)/(1-4/x^2)#
#x->oo#

As #x# tends towards #oo# , #1/x# as well as #1/x^2# tends towards #0#.

#lim (1)/(1)#
#x->oo#

Answer:# 1#