How do you determine if 15,-5,-25,-45 is an arithmetic or geometric sequence?

1 Answer
Jun 27, 2015

The sequence is an arithmetic sequence.

Explanation:

  • In an Arithmetic sequence there is a common difference #d# between any two consecutive terms
  • In a Geometric sequence there is a common ratio #r# for any two consecutive terms

The sequence given is :

#15, -5 , -25, -45#

1) Checking if the sequence is an arithmetic sequence:

# color(blue)(d _1= a_2 - a_1) = -5 - (15) = color(blue)(-20#
# d_2 = a_3 - a_2 = -25 - (-5) =color(blue)( -20#
# d_3 = a_4 - a_3= -45 - (-25) = color(blue)(-20#

As observed #d_1 = d_2 = d_3# , so there is a common difference #d=-20# maintained in the sequence so it is an arithmetic sequence

2) Checking if the sequence is also a geometric sequence:

# color(blue)(r _1= a_2/ a_1) = -5 / 15 = color(blue)(-1/3#

# color(blue)(r _2 = a_3/ a_2) = (-25 )/ -5 = color(blue)(5#

Since #r_1 # is not equal to #r_2# it doesn't form a geometric sequence.

So the sequence is an arithmetic sequence.