Asked by LoveLokiMarvel
Solve for x: 9x+16=6x+1.
Answers
Answered by
LoveLokiMarvel
Solve for x: 4x−3=3x−9.
Answered by
LoveLokiMarvel
Solve for x: 13x+26=3x−34.
Answered by
LoveLokiMarvel
Solve ax−12=9.
Answered by
LoveLokiMarvel
The area of a rectangle is calculated with the formula A=lw. If the area of a rectangle is 52.5 m2 and the width is 5 m, what is the length? Explain the solution to the real-world problem.(1 point)
Responses
l=10.5
The length is 262.5 m2.
The length is 10.5 m.
The length is 262.5 m.
Responses
l=10.5
The length is 262.5 m2.
The length is 10.5 m.
The length is 262.5 m.
Answered by
GPT 3.5
To solve for x, we can start by isolating the variable terms on one side of the equation.
First, let's subtract 6x from both sides:
(9x + 16) - 6x = (6x + 1) - 6x
This simplifies to:
3x + 16 = 1
Next, let's subtract 16 from both sides:
(3x + 16) - 16 = 1 - 16
This simplifies to:
3x = -15
Finally, we can solve for x by dividing both sides by 3:
(3x)/3 = (-15)/3
This simplifies to:
x = -5
So the solution for x is x = -5.
First, let's subtract 6x from both sides:
(9x + 16) - 6x = (6x + 1) - 6x
This simplifies to:
3x + 16 = 1
Next, let's subtract 16 from both sides:
(3x + 16) - 16 = 1 - 16
This simplifies to:
3x = -15
Finally, we can solve for x by dividing both sides by 3:
(3x)/3 = (-15)/3
This simplifies to:
x = -5
So the solution for x is x = -5.
Answered by
GPT 3.5
To solve for x, we can start by isolating the variable terms on one side of the equation.
First, let's subtract 3x from both sides:
(4x - 3) - 3x = (3x - 9) - 3x
This simplifies to:
4x - 3 = -9
Next, let's add 3 to both sides:
(4x - 3) + 3 = -9 + 3
This simplifies to:
4x = -6
Finally, we can solve for x by dividing both sides by 4:
(4x)/4 = (-6)/4
This simplifies to:
x = -3/2
So the solution for x is x = -3/2 or x = -1.5.
First, let's subtract 3x from both sides:
(4x - 3) - 3x = (3x - 9) - 3x
This simplifies to:
4x - 3 = -9
Next, let's add 3 to both sides:
(4x - 3) + 3 = -9 + 3
This simplifies to:
4x = -6
Finally, we can solve for x by dividing both sides by 4:
(4x)/4 = (-6)/4
This simplifies to:
x = -3/2
So the solution for x is x = -3/2 or x = -1.5.
Answered by
GPT 3.5
To solve for x, we need to isolate the variable terms on one side of the equation.
First, let's subtract 3x from both sides:
(13x + 26) - 3x = (3x - 34) - 3x
This simplifies to:
10x + 26 = -34
Next, let's subtract 26 from both sides:
(10x + 26) - 26 = -34 - 26
This simplifies to:
10x = -60
Finally, we can solve for x by dividing both sides by 10:
(10x)/10 = (-60)/10
This simplifies to:
x = -6
So the solution for x is x = -6.
First, let's subtract 3x from both sides:
(13x + 26) - 3x = (3x - 34) - 3x
This simplifies to:
10x + 26 = -34
Next, let's subtract 26 from both sides:
(10x + 26) - 26 = -34 - 26
This simplifies to:
10x = -60
Finally, we can solve for x by dividing both sides by 10:
(10x)/10 = (-60)/10
This simplifies to:
x = -6
So the solution for x is x = -6.
Answered by
GPT 3.5
To solve for x, we want to isolate the variable term on one side of the equation.
First, let's add 12 to both sides of the equation:
(ax - 12) + 12 = 9 + 12
This simplifies to:
ax = 21
Next, we can solve for x by dividing both sides by a:
(ax)/a = 21/a
This simplifies to:
x = 21/a
Therefore, the solution for x is x = 21/a.
First, let's add 12 to both sides of the equation:
(ax - 12) + 12 = 9 + 12
This simplifies to:
ax = 21
Next, we can solve for x by dividing both sides by a:
(ax)/a = 21/a
This simplifies to:
x = 21/a
Therefore, the solution for x is x = 21/a.
Answered by
GPT 3.5
To find the length of the rectangle, we can rearrange the formula for area A = lw to solve for length l.
Given that the area of the rectangle is 52.5 m² and the width is 5 m, we have:
52.5 = l * 5
To isolate the length l, we divide both sides of the equation by 5:
52.5/5 = l
That simplifies to:
l = 10.5
Therefore, the length of the rectangle is 10.5 m.
Given that the area of the rectangle is 52.5 m² and the width is 5 m, we have:
52.5 = l * 5
To isolate the length l, we divide both sides of the equation by 5:
52.5/5 = l
That simplifies to:
l = 10.5
Therefore, the length of the rectangle is 10.5 m.
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