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.

5a - 2 = -8 - 9a
5a = -8 - 9a + 2
5a + 9a = -8 + 2
14a = -6
a = \( \frac{-6}{14} \)
a = -\(\frac{3}{7}\)

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.

-8y + 6 > -4 + 5y
-8y > -4 + 5y - 6
-8y - 5y > -4 - 6
-13y > -10
y > \( \frac{-10}{-13} \)
y > \(\frac{10}{13}\)

The first step to solve a quadratic expression that's not set to zero is to solve the equation so that it is set to zero:

x² - 3x - 58 = -4x - 2
x² - 3x - 58 + 2 = -4x
x² - 3x + 4x - 56 = 0
x² + x - 56 = 0

Next, factor the quadratic equation:

x² + x - 56 = 0
(x - 7)(x + 8) = 0

For this expression to be true, the left side of the expression must equal zero. Therefore, either (x - 7) or (x + 8) must equal zero:

If (x - 7) = 0, x must equal 7
If (x + 8) = 0, x must equal -8

So the solution is that x = 7 or -8

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.

-5a - 1 < \( \frac{a}{3} \)
3 x (-5a - 1) < a
(3 x -5a) + (3 x -1) < a
-15a - 3 < a
-15a - 3 - a < 0
-15a - a < 3
-16a < 3
a < \( \frac{3}{-16} \)
a < -\(\frac{3}{16}\)

A quadrilateral is a shape with four sides. The perimeter of a quadrilateral is the sum of the lengths of its four sides.