Example:3 The 1st term of an arithmetic sequence is 200 and the common nunmber is -10 What is the formula an? What is the 20th term?

1 Answer
Jun 14, 2018

#a_n = 200+(n-1)*(-10) = 200-10(n-1)#

#a_19 = 10#

Explanation:

An arithmetic sequence starts with an initial value and adds the same constant with every iteration. The terms are thus written like this:

#a_0=x_0#
#a_1=x_0+r#
#a_2 = a_1 + r = (x_0+r)+r=x_0+2r#
#a_3 = a_2 + r = (x_0+2r)+r=x_0+3r#
#...#
#a_n = a_{n-1} + r = (x_0+(n-1)r)+r=x_0+nr#

In your case, the starting number #x_0# is #200#, and the common number that we add every time is #-10#

This means that the formula for the generic term is

#a_n = 200+(n-1)*(-10) = 200-10(n-1)#

To find the #20#th term, just plug #n=19# in the generic equation. In fact, since we're starting from #a_0#, the indices are shifted so that #a_0# is the first term, #a_1# is the second, and so on. We get

#a_19 = 200-10*19 = 200-190=10#