A right angle measures 90 degrees and is the intersection of two perpendicular lines. In diagrams, a right angle is indicated by a small box completing a square with the perpendicular lines.

To factor a quadratic expression, apply the FOIL (First, Outside, Inside, Last) method in reverse.

To solve this equation, repeatedly do the same thing to both sides of the equation until the variable is isolated on one side of the equal sign and the answer on the other.

-2b - 7 = \( \frac{b}{9} \)
9 x (-2b - 7) = b
(9 x -2b) + (9 x -7) = b
-18b - 63 = b
-18b - 63 - b = 0
-18b - b = 63
-19b = 63
b = \( \frac{63}{-19} \)
b = -3\(\frac{6}{19}\)

To solve this equation, repeatedly do the same thing to both sides of the equation until the variable is isolated on one side of the > sign and the answer on the other.

-3b - 2 > \( \frac{b}{-5} \)
-5 x (-3b - 2) > b
(-5 x -3b) + (-5 x -2) > b
15b + 10 > b
15b + 10 - b > 0
15b - b > -10
14b > -10
b > \( \frac{-10}{14} \)
b > -\(\frac{5}{7}\)

Parallel lines are lines that share the same slope (steepness) and therefore never intersect. A transversal occurs when a set of parallel lines are crossed by another line. All of the angles formed by a transversal are called interior angles and angles in the same position on different parallel lines equal each other (a° = w°, b° = x°, c° = z°, d° = y°) and are called corresponding angles. Alternate interior angles are equal (a° = z°, b° = y°, c° = w°, d° = x°) and all acute angles (a° = c° = w° = z°) and all obtuse angles (b° = d° = x° = y°) equal each other. Same-side interior angles are supplementary and add up to 180° (e.g. a° + d° = 180°, d° + c° = 180°).