How do you write the first five terms of the sequence #a_n=(n!)/n#? Precalculus Sequences Infinite Sequences 1 Answer Ratnesh Bhosale Mar 11, 2017 #sequence rArr 1,1,2,6,24,....# Explanation: We have given the #n^(th)# term of the sequence: #a_n = (n!)/n# #a_1 = (1!)/1 = 1# #a_2 = (2!)/2 = 1# #a_3 = (3!)/3=2# #a_4 = (4!)/4 = 6# #a_5 = (5!)/5 =24# #sequence rArr 1,1,2,6,24,....# Answer link Related questions What is a sequence? How does the Fibonacci sequence relate to Pascal's triangle? What is the Fibonacci sequence? How do I find the #n#th term of the Fibonacci sequence? How do you find the general term for a sequence? How do find the #n#th term in a sequence? What is the golden ratio? How does the golden ratio relate to the Fibonacci sequence? How do you determine if -10,20,-40,80 is an arithmetic or geometric sequence? How do you determine if 15,-5,-25,-45 is an arithmetic or geometric sequence? See all questions in Infinite Sequences Impact of this question 1409 views around the world You can reuse this answer Creative Commons License