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DIVIDE BY ZERO ERROR

Is an equation with no solution's answer.

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It also depends on the domain of the variable(s).

For example

x + 3 = 2 has no solution if the domain for x is the counting numbers, Z.

x*3 = 2 has no solution if the domain for x is the natural numbers, N.

x2 = 2 has no solution if the domain for x is the rational numbers, Q.

x2 = -2 has no solution if the domain for x is the real numbers, R.

Q: What is an equation with no solutions?

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To determine whether a polynomial equation has imaginary solutions, you must first identify what type of equation it is. If it is a quadratic equation, you can use the quadratic formula to solve for the solutions. If the equation is a cubic or higher order polynomial, you can use the Rational Root Theorem to determine if there are any imaginary solutions. The Rational Root Theorem states that if a polynomial equation has rational solutions, they must be a factor of the constant term divided by a factor of the leading coefficient. If there are no rational solutions, then the equation has imaginary solutions. To use the Rational Root Theorem, first list out all the possible rational solutions. Then, plug each possible rational solution into the equation and see if it is a solution. If there are any solutions, then the equation has imaginary solutions. If not, then there are no imaginary solutions.

That depends on the equation.

The coordinates of every point on the graph, and no other points, are solutions of the equation.

The roots of the equation

If the equation is an identity.

Related questions

An identity equation has infinite solutions.

An equation with a degree of three typically has three solutions. However, it is possible for one or more of those solutions to be repeated or complex.

If the discriminant of a quadratic equation is less then 0 then it will have no real solutions.

To determine whether a polynomial equation has imaginary solutions, you must first identify what type of equation it is. If it is a quadratic equation, you can use the quadratic formula to solve for the solutions. If the equation is a cubic or higher order polynomial, you can use the Rational Root Theorem to determine if there are any imaginary solutions. The Rational Root Theorem states that if a polynomial equation has rational solutions, they must be a factor of the constant term divided by a factor of the leading coefficient. If there are no rational solutions, then the equation has imaginary solutions. To use the Rational Root Theorem, first list out all the possible rational solutions. Then, plug each possible rational solution into the equation and see if it is a solution. If there are any solutions, then the equation has imaginary solutions. If not, then there are no imaginary solutions.

It will depend on the equation.

That depends on the equation.

The coordinates of every point on the graph, and no other points, are solutions of the equation.

The quadratic equation will have two solutions.

The roots of the equation

It has the following solutions.

Simultaneous equations have the same solutions.

It has 2 equal solutions