The coordinates of every one of the infinitely many points on the line defined by the equation is a solution.
(5,7)
To determine if an ordered pair ((x, y)) is a solution to the inequality (3y - 1 - 2x \geq 0), we can rearrange it to (3y \geq 2x + 1). For example, if we take the ordered pair ((1, 1)), we substitute (x = 1) and (y = 1): (3(1) \geq 2(1) + 1), which simplifies to (3 \geq 3). Since this is true, ((1, 1)) is a valid solution to the inequality.
{-4,-5}
If 5x plus 3y equals 13, the x equals 2 and y equals 1. This is because 5x2=10 and 3x1=3, and 10+3=13.
10
2x plus 3y
The coordinates of every one of the infinitely many points on the line defined by the equation is a solution.
(5,7)
The ordered pair is (-1, -2).
The ordered pair is (-1, -7).
(-4,-5)
{-4,-5}
(10, 2)
x = 12 y = 2 (12,2) satifies the equation
x = 8y = 6(5x8) + (3x6) = 58(5x8) - (3x6) = 22
If 5x plus 3y equals 13, the x equals 2 and y equals 1. This is because 5x2=10 and 3x1=3, and 10+3=13.