Just remember: when you multiply or divide both sides of an inequality by a
positive number, the inequality still holds (and no, it will not "unbalance" the inequality, since you're carrying out the operation on
bothsides). It is only when you multiply or divide both sides by a
negative number that the inequality sign reverses.
Addition/subtraction of ANY number on
both sides does not affect the inequality (ie. it still holds whether you add/subtract a positive OR a negative number).
In your example you're multiplying both sides by 4, a positive number, so the ineuqality still holds. Then just subtract 3x and subtract 22 on both sides to get x is greater than -23, as SoulSearcher has done above.
EDIT: And what pLuvia was talking about was just to sub a random value of x into the inequality and see if it holds. In your example, the result you get is x>-23, so it "splits" the domain of real numbers into two parts: one containing all numbers greater than -23, and one that is less than -23. (The one number that equals -23 is not in consideration as the inequality sign is a "strictly greater than"
) So in order to check if you've got the right range of values, just sub any value in that range into the inequality; if it holds, (and you know you've got the critical point -23, the one that "splits" the domain, right) then you know you've got the right one. pLuvia used 0 (as it often simplifies the arithmetic
), so LHS = 2*0 + 11 = 11, RHS = 3x - 1 = -1. And since 11>-1, x=0 satisfies the original inequality. Because 0 is in the range x > -23, you can convince yourself that your answer is right
