How do you write #35times24times23times 22times 4times3times2times1# as a ratio of factorials? Precalculus The Binomial Theorem Factorial Identities 1 Answer George C. Nov 14, 2015 #((35!)(24!)(4!))/((34!)(21!))# or #((23!)(11!)(8!))/((22!)(10!))# Explanation: #35xx24xx23xx22xx4xx3xx2xx1# #=(35!)/(34!)xx(24!)/(21!)xx(4!)=((35!)(24!)(4!))/((34!)(21!))# or #35xx24xx23xx22xx4xx3xx2xx1# #=5xx7xx8xx3xx23xx2xx11xx4xx3xx2xx1# #=23xx11xx8xx7xx6xx5xx4xx3xx2xx1# #=(23!)/(22!)xx(11!)/(10!)xx(8!)=((23!)(11!)(8!))/((22!)(10!))# Answer link Related questions What is a factorial? How do I find the factorial of a given number? How can the factorial of 0 be 1? How do I do factorials on a TI-84? What are factorials used for? What factorial equals 720? What is the factorial of 0? What is the factorial of 10? What is the factorial of 5? What is the factorial of 9? See all questions in Factorial Identities Impact of this question 1494 views around the world You can reuse this answer Creative Commons License