Question
6 (7x+2)-8= Finish the equation so that the equation has infinite amount of solutions.
Answers
GPT 3.5
To create an equation with an infinite number of solutions, we need to find a value to replace "x" that satisfies the equation.
Let's start by expanding the equation:
6(7x + 2) - 8 = 42x + 12 - 8 = 42x + 4
Now, to have an infinite number of solutions, the resulting equation should simplify to a true statement, regardless of the value of "x".
Let's make the equation true by eliminating the "x" term on both sides:
42x + 4 = 42x + 4
As you can see, both sides of the equation are now equal regardless of the value of "x". This means that the equation has an infinite number of solutions.
Let's start by expanding the equation:
6(7x + 2) - 8 = 42x + 12 - 8 = 42x + 4
Now, to have an infinite number of solutions, the resulting equation should simplify to a true statement, regardless of the value of "x".
Let's make the equation true by eliminating the "x" term on both sides:
42x + 4 = 42x + 4
As you can see, both sides of the equation are now equal regardless of the value of "x". This means that the equation has an infinite number of solutions.