Which of the following four equations has the solution of the lowest value? (1 point)
Answer choices:
x+19=-5
x-6=-16
x+25=2
x-7=28
To find the solution of each equation, we can solve for x.
1. x + 19 = -5
Subtract 19 from both sides:
x = -24
2. x - 6 = -16
Add 6 to both sides:
x = -10
3. x + 25 = 2
Subtract 25 from both sides:
x = -23
4. x - 7 = 28
Add 7 to both sides:
x = 35
Out of the four equations, the equation x = -24 has the solution with the lowest value.
To determine which equation has the solution of the lowest value, we need to solve each equation and compare the solutions.
1. x + 19 = -5
To solve this equation, we can isolate x by subtracting 19 from both sides:
x = -5 - 19
x = -24
2. x - 6 = -16
To solve this equation, we can isolate x by adding 6 to both sides:
x = -16 + 6
x = -10
3. x + 25 = 2
To solve this equation, we can isolate x by subtracting 25 from both sides:
x = 2 - 25
x = -23
4. x - 7 = 28
To solve this equation, we can isolate x by adding 7 to both sides:
x = 28 + 7
x = 35
From the solutions, we can see that the equation x = -24 has the lowest value. So, the equation x + 19 = -5 has the solution of the lowest value.
To determine which of the equations has the solution of the lowest value, we need to solve each equation and compare the solutions. Here's how you can solve each equation:
1. x + 19 = -5:
Subtract 19 from both sides: x = -5 - 19 = -24
2. x - 6 = -16:
Add 6 to both sides: x = -16 + 6 = -10
3. x + 25 = 2:
Subtract 25 from both sides: x = 2 - 25 = -23
4. x - 7 = 28:
Add 7 to both sides: x = 28 + 7 = 35
Now that we have the solutions for each equation, we can see that the equation x = -24 has the lowest value for x. Therefore, the equation "x + 19 = -5" has the solution with the lowest value.