How do you write the first six terms of the sequence #a_n=n/(n+1)#? Precalculus Sequences Arithmetic Sequences 1 Answer sjc Oct 21, 2016 The #n# subscript tells us which term of the sequence it is. so #u_1# is the first term so #n=1# and we substitute #n=1# into the expression. #u_2,# is when # n=2 # etc. Explanation: we have therefore: #a_n=n/(n+1)# #a_1=1/(1+1)=1/2# #a_2=2/(2+1)=2/3# #a_3=3/(3+1)=3/4# #a_4=4/(4+1)=4/5# #a_5=5/(5+1)=5/6# #a_6=6/(6+1)=6/7# Answer link Related questions What is a descending arithmetic sequence? What is an arithmetic sequence? How do I find the first term of an arithmetic sequence? How do I find the indicated term of an arithmetic sequence? How do I find the #n#th term of an arithmetic sequence? What is an example of an arithmetic sequence? How do I find the common difference of an arithmetic sequence? How do I find the common difference of the arithmetic sequence 2, 5, 8, 11,...? How do I find the common difference of the arithmetic sequence 5, 9, 13, 17,...? What is the common difference of the arithmetic sequence 5, 4.5, 4, 3.5,...? See all questions in Arithmetic Sequences Impact of this question 1904 views around the world You can reuse this answer Creative Commons License