(6, n) is a solution to the inequality #y+3<= (x-4)#. Is 3 a possible value for n? Algebra Linear Inequalities and Absolute Value Inequality Expressions 1 Answer Somebody N. Jul 22, 2018 #color(blue)("No")# Explanation: #y+3<=x-4# #y<=x-4-3# #y<=x-7# Plugging in #x=6# #y<=6-7# #y<=-1# If #x=6# the possible values of #n# are in the interval: #(-oo,-1]# So #3# is not a possible value for #n#: Answer link Related questions What are Inequalities? How does a linear inequality different from a linear equation? How do you graph an inequality on a number line? What are the different inequality notations? What is the difference between > and #>=#? What is the difference between set notation and interval notation? How do you graph #t>3# on a number line? What does #[3, oo)# mean? How do you graph #x \le 8#? How do you write #x > -17# as a set notation and interval notation? See all questions in Inequality Expressions Impact of this question 3565 views around the world You can reuse this answer Creative Commons License