Consistent Inconsistent Dependent Independent Calculator

Calculator Input

System size

Decimal precision

Zero tolerance

a11 coefficient of x

a12 coefficient of y

a13 coefficient of z

b1 constant

a21 coefficient of x

a22 coefficient of y

a23 coefficient of z

b2 constant

a31 coefficient of x

a32 coefficient of y

a33 coefficient of z

b3 constant

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Example Data Table

Example	Equations	rank(A)	rank([A\|b])	Classification
Unique solution	x + y = 5, x - y = 1	2	2	Consistent independent
No solution	x + y = 3, 2x + 2y = 8	1	2	Inconsistent
Infinite solutions	x + y = 3, 2x + 2y = 6	1	1	Consistent dependent

Formula Used

The calculator uses the coefficient matrix A and the augmented matrix [A|b]. It compares their ranks with the number of variables n.

Inconsistent: rank(A) < rank([A|b]). The system has no solution.
Consistent independent: rank(A) = rank([A|b]) = n. The system has one unique solution.
Consistent dependent: rank(A) = rank([A|b]) < n. The system has infinitely many solutions.
Determinant check: For a square system, det(A) not equal to zero confirms one unique solution.

For a 2 variable system, the determinant is a11a22 - a12a21. For a 3 variable system, the standard 3 by 3 determinant expansion is used.

How to Use This Calculator

Select whether your system has two or three variables.
Enter each coefficient from the left side of the equations.
Enter each constant from the right side of the equations.
Choose the decimal precision for the displayed output.
Adjust tolerance only when working with rounded decimal data.
Press Calculate to classify the system.
Use CSV or PDF export to save the report.

Understanding System Classification

A linear system can behave in three main ways. It may have one solution. It may have no solution. It may have endlessly many solutions. This calculator separates those cases by using ranks and determinants. That makes the decision more reliable than visual guessing.

What Consistent Means

A system is consistent when at least one solution exists. The equations can meet at one point, along one line, or across a shared plane. When the equations agree enough to produce answers, the augmented matrix rank matches the coefficient matrix rank.

What Inconsistent Means

A system is inconsistent when the equations contradict each other. In two variables, this often means parallel lines. In three variables, it can mean planes that never share a common point. Algebraically, the augmented matrix has a larger rank than the coefficient matrix.

Dependent and Independent Results

A consistent independent system has exactly one solution. For a square system, this usually appears when the determinant is not zero. A consistent dependent system has infinitely many solutions. Some equations repeat information already provided by other equations. The rank is lower than the number of variables.

Why Rank Is Helpful

Rank counts the useful, independent equations inside a matrix. Gaussian elimination reveals that count by reducing rows. Zero rows show repeated or missing information. Contradictory rows show impossible statements. Because of this, rank works for two variable and three variable systems.

Practical Uses

Students can use the tool to check homework steps. Teachers can create examples quickly. Engineers and analysts can inspect small equation models before using larger software. The result panel shows the classification, determinant, ranks, and solution values when a unique solution exists.

Best Practice

Enter coefficients carefully. Use negative signs when needed. Choose a tolerance that matches your data. A smaller tolerance is stricter. A larger tolerance helps with rounded decimal entries. Always review the formula section after calculating. It explains why the calculator called the system consistent, inconsistent, dependent, or independent.

Reading the Output

The rank comparison is the main decision. The determinant is a shortcut for square systems. The solution row appears only when one answer exists. Export the report when you need a saved record for review, tutoring, grading, or study.

FAQs

What is a consistent system?

A consistent system has at least one solution. It may have one exact solution or infinitely many solutions. The rank of the coefficient matrix equals the rank of the augmented matrix.

What is an inconsistent system?

An inconsistent system has no solution. The equations conflict. In rank form, the augmented matrix has a larger rank than the coefficient matrix.

What does dependent mean?

Dependent means the system has repeated or connected equations. It is consistent, but the rank is smaller than the number of variables. The result is infinitely many solutions.

What does independent mean?

Independent means each equation adds useful information. For a consistent square system, this gives one unique solution. The rank equals the number of variables.

Why does the calculator use rank?

Rank works for both two variable and three variable systems. It detects contradictions, repeated equations, and unique solution cases more generally than simple ratio checks.

When is determinant useful?

The determinant is useful for square systems. If det(A) is not zero, the system is consistent independent and has exactly one solution.

What tolerance should I use?

The default tolerance suits most entries. Use a larger tolerance for rounded decimal data. Use a smaller tolerance when exact values matter.

Can I export my result?

Yes. After calculating, use the CSV button for spreadsheet data. Use the PDF button for a simple printable report.