Answer:
To create an equation with infinite solutions, we need to make sure that both sides of the equation are equal, regardless of the value of "x".
In the given equation, we have 3/5 + 2x = 3x - x.
To simplify this equation, let's first combine like terms on the right side:
3/5 + 2x = 2x
Now, let's subtract 2x from both sides of the equation to isolate the variable "x":
3/5 + 2x - 2x = 2x - 2x
This simplifies to:
3/5 = 0
Since 3/5 is not equal to 0, we can see that there is no value of "x" that will make this equation true. Therefore, this equation does not have infinite solutions.
In order to have infinite solutions, the equation would need to simplify to an identity, such as 0 = 0, which is always true, regardless of the value of "x".
Explanation: