What Is The Solution To This System Of Linear Equations?$\[ \begin{array}{l} 7x - 2y = -6 \\ 8x + Y = 3 \end{array} \\]A. \[$(-6, 3)\$\]B. \[$(0, 3)\$\]C. \[$(1, -5)\$\]D. \[$(15, -1)\$\]

by ADMIN 188 views

Introduction to Systems of Linear Equations

Systems of linear equations are a fundamental concept in mathematics, particularly in algebra and geometry. They consist of two or more linear equations that involve the same set of variables. In this article, we will focus on solving a system of two linear equations with two variables. We will use the method of substitution and elimination to find the solution to the given system.

The Given System of Linear Equations

The given system of linear equations is:

{ \begin{array}{l} 7x - 2y = -6 \\ 8x + y = 3 \end{array} \}

Step 1: Write Down the Given Equations

We have two linear equations:

  1. 7x−2y=−67x - 2y = -6
  2. 8x+y=38x + y = 3

Step 2: Solve One of the Equations for One Variable

We can solve the second equation for yy:

y=3−8xy = 3 - 8x

Step 3: Substitute the Expression for yy into the First Equation

Substitute the expression for yy into the first equation:

7x−2(3−8x)=−67x - 2(3 - 8x) = -6

Step 4: Simplify the Equation

Expand and simplify the equation:

7x−6+16x=−67x - 6 + 16x = -6

Combine like terms:

23x−6=−623x - 6 = -6

Step 5: Solve for xx

Add 6 to both sides of the equation:

23x=023x = 0

Divide both sides by 23:

x=0x = 0

Step 6: Find the Value of yy

Now that we have the value of xx, substitute it into the expression for yy:

y=3−8(0)y = 3 - 8(0)

y=3y = 3

Step 7: Write Down the Solution

The solution to the system of linear equations is:

(x,y)=(0,3)(x, y) = (0, 3)

Conclusion

In this article, we solved a system of two linear equations with two variables using the method of substitution and elimination. We found that the solution to the system is (0,3)(0, 3). This is the correct answer among the given options.

Final Answer

The final answer is (0,3)\boxed{(0, 3)}.

Discussion

This problem is a classic example of a system of linear equations with two variables. The method of substitution and elimination is a powerful tool for solving such systems. By following the steps outlined in this article, we can find the solution to the system and verify that it is correct.

Related Topics

  • Systems of linear equations with three variables
  • Non-linear systems of equations
  • Matrix operations
  • Determinants

References

  • [1] "Systems of Linear Equations" by Khan Academy
  • [2] "Linear Algebra and Its Applications" by Gilbert Strang
  • [3] "Introduction to Linear Algebra" by Gilbert Strang

Further Reading

  • For more information on systems of linear equations, see the Khan Academy article "Systems of Linear Equations".
  • For a comprehensive introduction to linear algebra, see the book "Linear Algebra and Its Applications" by Gilbert Strang.
  • For a more in-depth treatment of linear algebra, see the book "Introduction to Linear Algebra" by Gilbert Strang.

Introduction

Systems of linear equations are a fundamental concept in mathematics, particularly in algebra and geometry. In this article, we will answer some frequently asked questions about systems of linear equations.

Q: What is a system of linear equations?

A: A system of linear equations is a set of two or more linear equations that involve the same set of variables. Each equation is a linear combination of the variables, and the system is a collection of these equations.

Q: How do I solve a system of linear equations?

A: There are several methods to solve a system of linear equations, including the method of substitution, elimination, and matrix operations. The method of substitution involves solving one equation for one variable and substituting that expression into the other equation. The method of elimination involves adding or subtracting the equations to eliminate one variable.

Q: What is the difference between a system of linear equations and a non-linear system of equations?

A: A system of linear equations consists of linear equations, which are equations that can be written in the form ax + by = c, where a, b, and c are constants and x and y are variables. A non-linear system of equations, on the other hand, consists of non-linear equations, which are equations that cannot be written in the form ax + by = c.

Q: How do I determine if a system of linear equations has a unique solution, no solution, or infinitely many solutions?

A: To determine the number of solutions to a system of linear equations, we can use the following criteria:

  • If the system has a unique solution, the equations are consistent and the number of equations is equal to the number of variables.
  • If the system has no solution, the equations are inconsistent and the number of equations is equal to the number of variables.
  • If the system has infinitely many solutions, the equations are consistent and the number of equations is less than the number of variables.

Q: What is the role of determinants in solving systems of linear equations?

A: Determinants are used to determine the number of solutions to a system of linear equations. If the determinant of the coefficient matrix is non-zero, the system has a unique solution. If the determinant is zero, the system has either no solution or infinitely many solutions.

Q: Can I use matrix operations to solve a system of linear equations?

A: Yes, matrix operations can be used to solve a system of linear equations. The coefficient matrix and the constant matrix can be used to find the solution to the system.

Q: What are some common mistakes to avoid when solving systems of linear equations?

A: Some common mistakes to avoid when solving systems of linear equations include:

  • Not checking for consistency and independence of the equations
  • Not using the correct method for solving the system
  • Not checking for the number of solutions to the system
  • Not using determinants to determine the number of solutions

Conclusion

In this article, we have answered some frequently asked questions about systems of linear equations. We have discussed the definition of a system of linear equations, the methods for solving such systems, and the role of determinants in solving systems of linear equations. We have also discussed some common mistakes to avoid when solving systems of linear equations.

Final Answer

The final answer is that systems of linear equations are a fundamental concept in mathematics, and solving such systems requires a clear understanding of the methods and techniques involved.

Discussion

This article has provided a comprehensive overview of systems of linear equations and the methods for solving such systems. We hope that this article has been helpful in answering some of the frequently asked questions about systems of linear equations.

Related Topics

  • Systems of linear equations with three variables
  • Non-linear systems of equations
  • Matrix operations
  • Determinants

References

  • [1] "Systems of Linear Equations" by Khan Academy
  • [2] "Linear Algebra and Its Applications" by Gilbert Strang
  • [3] "Introduction to Linear Algebra" by Gilbert Strang

Further Reading

  • For more information on systems of linear equations, see the Khan Academy article "Systems of Linear Equations".
  • For a comprehensive introduction to linear algebra, see the book "Linear Algebra and Its Applications" by Gilbert Strang.
  • For a more in-depth treatment of linear algebra, see the book "Introduction to Linear Algebra" by Gilbert Strang.