How do you determine if (0,3) is a solution to #y<abs(3x-4)#? Precalculus Solving Rational Inequalities Polynomial Inequalities 1 Answer Binayaka C. Apr 24, 2018 #(0,3)# is a solution of # y <|3 x-4| # Explanation: # y <|3 x-4| ; (0,3)# Putting # x=0 , y=3# on the equation we get #3 < | 3*0-4| or 3 < |-4| or 3 < 4 # (True) Therefore #(0,3)# is a solution of # y <|3 x-4| # [Ans] Answer link Related questions What are common mistakes students make when solving polynomial inequalities? How do I solve a polynomial inequality? How do I solve the polynomial inequality #-2(m-3)<5(m+1)-12#? How do I solve the polynomial inequality #-6<=2(x-5)<7#? How do I solve the polynomial inequality #1<2x+3<11#? How do I solve the polynomial inequality #-12<-2(x+1)<=18#? How do you solve the inequality #6x^2-5x>6#? How do you solve #x^2 - 4x - 21<=0# A) [-3, 7] B) (-∞, -3] C) (-∞, -3] [7, ∞) D) [7, ∞)? How do you solve quadratic inequality, graph, and write in interval notation #x^2 - 8x + 15 >0#? How do you solve #-x^2 - x + 6 < 0#? See all questions in Polynomial Inequalities Impact of this question 1215 views around the world You can reuse this answer Creative Commons License