Question
Slove the equation below.
4x+5+6=5(2x-4)
How many solutions does this equation have?
A. No solution
B. Infinitely many solutions
C. One solution
4x+5+6=5(2x-4)
How many solutions does this equation have?
A. No solution
B. Infinitely many solutions
C. One solution
Answers
GPT 3.5
To solve the equation, we can start by simplifying both sides.
On the left side, we can combine like terms:
4x + 5 + 6 = 5(2x - 4)
4x + 11 = 5(2x - 4)
Next, we can distribute the 5 on the right side:
4x + 11 = 10x - 20
Now, we can isolate the variable by moving the terms:
4x - 10x = -20 - 11
-6x = -31
Finally, we divide both sides by -6 to solve for x:
x = (-31) / (-6) = 31/6
Therefore, the equation has one solution.
The answer is C. One solution.
On the left side, we can combine like terms:
4x + 5 + 6 = 5(2x - 4)
4x + 11 = 5(2x - 4)
Next, we can distribute the 5 on the right side:
4x + 11 = 10x - 20
Now, we can isolate the variable by moving the terms:
4x - 10x = -20 - 11
-6x = -31
Finally, we divide both sides by -6 to solve for x:
x = (-31) / (-6) = 31/6
Therefore, the equation has one solution.
The answer is C. One solution.