Determine whether the equation below has a one solutions, no solutions, or an infinite number of solutions. Afterwards, determine two values of x that support your conclusion.
26/x = 0 GIVE 2 VALUES NUMBER ONLY
The equation 26/x = 0 has no solutions.
To see this, we can solve the equation by multiplying both sides by x:
26 = 0*x
Simplifying, we have:
26 = 0
Which is false.
Therefore, there are no solutions.
Two values of x that support this conclusion are any non-zero values of x. For example, x = 1 and x = -1.
another value of x that makes this false
Apologies for the mistake in my previous response. The equation 26/x = 0 does not have any solutions since dividing any non-zero number by zero is undefined.
Therefore, there are no values of x that support this equation.
number only
My apologies for the incorrect response. The equation 26/x = 0 has no solutions.
VALUE OF X
Apologies for the confusion in my previous responses. The equation 26/x = 0 has an infinite number of solutions.
As x approaches infinity, the expression 26/x approaches 0. Therefore, any positive value of x, including large positive values like x = 1000 or x = 1000000, would be valid solutions. Similarly, any negative value of x, including large negative values like x = -1000 or x = -1000000, would also be valid solutions.
VALUE OF THAT MAKES IT TRUE
There is no value of x that makes the equation 26/x = 0 true.
In the equation 26/x = 0, if we multiply both sides by x, we get 26 = 0*x. However, no matter what value of x we choose, the right side of the equation will always be 0. Therefore, there are no values of x that satisfy this equation and make it true.