Inequalities with Multiplication and Division
Exploring the realm of mathematical inequalities involving multiplication and division unveils a crucial dimension in the understanding of numerical relationships. As fundamental principles in algebra, these inequalities offer insights into the relative size and order of quantities. Whether deciphering inequalities in equations or grappling with real-world scenarios, a mastery of the interplay between multiplication and division is essential. This exploration delves into the nuanced dynamics, providing a concise yet comprehensive introduction to the multifaceted world of inequalities shaped by these two fundamental arithmetic operations.
Questions
- Given #-2x-5 < -2# I got #-2x < 3#. Is this correct? How do I solve from here?
- How do you solve #-13> - 5u - 43#?
- How do you solve #0.6x < - 24#?
- How do you solve #4p<32#?
- How do you solve and graph #-8r < 16 #?
- How do you solve #1/2 < n/6#?
- How do you solve and graph #-v/2>=3.5#?
- How do you solve #6( 3x - 4) > - 6#?
- How do you solve #-4 (-4+x)>56#?
- How do you solve and graph #-3n > 9#?
- How do you solve and graph #5z<-90#?
- How do you solve: #(x^2-9)/(x^2-1) < 0#?
- How do you solve #1/2z<20#?
- For what x an y is #y / ( x + 3 )^2 > 2/(x-y-3)#?
- How do you solve #-1/6n<=-18#?
- How do you solve #2/3h>14#?
- What should both sides of #2/3n>5/6# be multiplied by to get #n>5/4#?
- How do you solve #18\leq x \div 6#?
- How do you solve and graph #a/9>=-15#?
- How do you solve #-2>=-d/34#?