4x+10=__x+__
To find the missing values, we need to set up an equation using the given expression.
4x + 10 = __x + __
To solve for the missing values, we need to simplify the equation.
Combine the like terms on the right-hand side of the equation:
4x + 10 = __x + __
Since we don't have any information about the missing values, we cannot perform further calculations to find the specific values. The equation remains as is.
Complete the equation so that it has infinite solutions.
4x + 10 = __x + __
To set up an equation with infinite solutions, we need both sides of the equation to be equal no matter the value of x. One way to achieve this is by making the coefficients of x on both sides of the equation the same.
In this case, we can make the equation have infinite solutions if we have:
4x + 10 = 4x + 10
This equation states that no matter what value x takes, the left-hand side will always be equal to the right-hand side. Thus, the equation has infinite solutions.
Complete the equation so that it has no solutions.
5x+12=__x+9
To set up an equation with no solutions, we need to make the coefficients of x on both sides of the equation different. This means that there is no value of x that will satisfy the equation.
In this case, we can complete the equation so that it has no solutions by making the coefficients of x on both sides different. Let's choose different coefficients that are not equal to each other:
5x + 12 = -2x + 9
Wrong
Apologies for the incorrect response.
To set up an equation with no solutions, we need to make the equation contradictory. This can be achieved by making the coefficients of x on both sides of the equation equal but altering the constant terms, so they are not equal.
In this case, we can complete the equation so that it has no solutions as follows:
5x + 12 = 5x + 9
No matter what value x takes, the left-hand side of the equation will never be equal to the right-hand side. Therefore, this equation has no solutions.
-7x-12=__x+12
To set up an equation with no solutions, we need to make the equation contradictory. This can be achieved by making the coefficients of x on both sides of the equation equal but altering the constant terms, so they are not equal.
In this case, we can complete the equation so that it has no solutions as follows:
-7x - 12 = -7x + 12
No matter what value x takes, the left-hand side of the equation will never be equal to the right-hand side. Therefore, this equation has no solutions.
Solve for x to determine if the equation has one, none, or infinite solutions.
6(2x+4)-24=12x