Determine whether the equation below has a one solutions, no solutions, or an infinite number of solutions. Afterwards, determine two values of xx that support your conclusion.
20/x = 0
The equation 20/x = 0 has no solutions.
To see why, we can rearrange the equation to isolate x:
20/x = 0
20 = 0 * x
20 = 0
As we can see, the equation 20 = 0 is not true for any value of x. Therefore, there are no solutions that satisfy the original equation.
In other words, no matter what value we choose for x, the equation 20/x = 0 will never be satisfied.
This means there are no values of x that support the conclusion of the equation.
A value of x that makes the equation false is
, which when substituted into the equation and simplified makes the equation turn into
equals=
.
Apologies for the confusion, but there seems to be an error in the equation given. The equation 20/x = 0 cannot have a value of x that makes it false because dividing any non-zero number by zero is undefined.
When we divide 20 by x, the equation 20/x = 0 implies that the quotient is equal to zero. However, division by zero is undefined, and therefore, the equation does not have a solution.
Hence, there are no values of x that support the conclusion of the equation.
simple number only
I apologize for the confusion. In the equation 20/x = 0, we can solve for x by setting the numerator equal to zero:
20 = 0 * x
Any number multiplied by zero is zero, so the equation simplifies to:
20 = 0
This equation is not true for any value of x. It is a contradiction since 20 does not equal 0. Therefore, there are no values of x that satisfy the equation and there are no solutions.