Which of the following four equations has the solution of the lowest value?(1 point)

Question

Create an image of four equations visualized in a visually appealing way. The equations are as follows: Equation 1 - 'x plus 25 equals 2', shown with a possible value of x plotted on a graph. Equation 2 - 'x minus 6 equals negative 16', displayed again with a possible value of x traced on same graph. Equation 3 - 'x plus 19 equals negative 5,' explained graphically. And finally, Equation 4 - 'x minus 7 equals 28', depicted on the graph for consistency. The scene should not contain any text and be aesthetically pleasing.

Which of the following four equations has the solution of the lowest value?(1 point)

Responses

x + 25 = 2
x plus 25 equals 2

x − 6 = −16
x minus 6 equals negative 16

x + 19 = −5
x plus 19 equals negative 5

x − 7 = 28

Answer 1

To find the equation with the lowest solution value, we need to solve each equation and compare the values of x. Let's solve each equation step by step:

1. x + 25 = 2:
Subtract 25 from both sides to isolate x:
x = 2 - 25
x = -23

2. x - 6 = -16:
Add 6 to both sides to isolate x:
x = -16 + 6
x = -10

3. x + 19 = -5:
Subtract 19 from both sides to isolate x:
x = -5 - 19
x = -24

4. x - 7 = 28:
Add 7 to both sides to isolate x:
x = 28 + 7
x = 35

Now we have the solutions for each equation:

-23, -10, -24, 35

The lowest value is -24, so the equation x + 19 = -5 has the solution with the lowest value.

Answer 2

The solutions are:

x + 25 = 2

Subtract 25 to both sides.

x = - 23

x - 6 = - 16

Add 6 to both sides.

x = - 10

x + 19 = - 5

Subtract 19 to both sides.

x = - 24

x - 7 = 28

Add 7 to both sides.

x = 35

x = - 24 is lowest value

so equation x + 19 = - 5 has the solution of the lowest value

Answer 3

Well, well, well, let's find the solution with the lowest value here.

For equation 1: x + 25 = 2, to isolate x, we simply subtract 25 from both sides. So, x = -23.

For equation 2: x - 6 = -16, we add 6 to both sides to find x = -10.

For equation 3: x + 19 = -5, subtract 19 from both sides and we get x = -24.

Lastly, for equation 4: x - 7 = 28, add 7 to both sides and voila, x = 35.

So, the equation with the lowest solution value is equation 3, x + 19 = -5 with x = -24. And no, it's not because -24 threw a party and invited all the other solutions.

Answer 4

To find the equation with the solution of the lowest value, you need to solve each equation and compare the solutions.

Let's solve each equation step by step to find the value of x.

1. x + 25 = 2:
Subtract 25 from both sides of the equation:
x + 25 - 25 = 2 - 25
x = -23

2. x - 6 = -16:
Add 6 to both sides of the equation:
x - 6 + 6 = -16 + 6
x = -10

3. x + 19 = -5:
Subtract 19 from both sides of the equation:
x + 19 - 19 = -5 - 19
x = -24

4. x - 7 = 28:
Add 7 to both sides of the equation:
x - 7 + 7 = 28 + 7
x = 35

Now, let's compare the values of x for each equation:

x = -23
x = -10
x = -24
x = 35

From these values, we can see that the equation with the solution of lowest value is x = -24 (from the equation x + 19 = -5).