Answer:
q<56
Step-by-step explanation:
An inequality is an algebraic expression that consists of two members separated by an inequality. The inequality can be <, ≤,>, ≥.
Solving an inequality consists in finding the value or values that verify it.
An inequality of the first degree is an inequality in which the variable is of degree one, as in this particular case.
In this case, the resolution must first eliminate the parentheses on the left side of the inequality. For that you apply distributive property. This property expresses that the multiplication of a number by a sum is equal to the sum of the multiplications of that number by each of the addends. So you get:
q+12-2*q-2*(-22)>0
q+12-2*q+44>0
Then the terms contained in "q" must be grouped on one side of the inequality and the independent terms on the other. In this case the terms with the variable "q" will remain on the left side of the inequality. The independent terms will be grouped on the right side, remembering that to take them to the other side of the inequality the opposite operations will be used. This is:
So:
q-2q>-12-44
Solving the corresponding addition and subtraction operations you get:
(-1)*q>-56
Since the coefficient that accompanies "q" is negative, it is multiplied by −1 on both sides of the inequality, so the direction of inequality will change.
q<56
Finally, the values for which the inequality is valid are those in which q is less than 56
