Math

posted by .

What are three differences between an inconsistent system and a consistent and independent system? Explain.

Respond to this Question

First Name
School Subject
Your Answer

Similar Questions

  1. Algebra II

    Describe the system 6x-2y=10 and 9x-3y=8 as consistent and independent, consistent and dependent, or inconsistent. Explain. I don't know how to do this one
  2. Algebra

    Describe the system 6x-2y=10 and 9x-3y=8 as consistent and independent, consistent and dependent, or inconsistent. Explain. When you multiply the second equation by 2/3, both equations become equal. Therefore there are many solutions. …
  3. Math

    Describe the system 6x-2y=10 and 9x-3y=8 as consistent and independent, consistent and dependent, or inconsistent. Explain. Answer: When you multiply the second equation by 2/3, both equations become equal. Therefore there are many …
  4. Algerbra II

    Classify the system , and determine the number of solutions. The system is consistent and dependent and has infinitely many solutions. The system is inconsistent and independent and has no solutions. The system is inconsistent and …
  5. Algebra

    A system of equations representing two different vertical lines is: a) consistent independent b) consistent dependent c) inconsistent d) inconsistent independent Could someone explain this to me?
  6. Algebra-Multiple choice

    Hello, I have some practice math I'm working through and I'm unsure about the answer. I will also put what I got. Thanks for the help. 1. Solve using any method and identify the system as consistent, inconsistent, or dependent. -2x+y=8 …
  7. Intermediate Algebra

    Solve the system of equations by graphing. Then classify the system. f(x)=x+1 g(x)=-8x+10 What is the solution of the system?
  8. Intermediate Algebra

    Solve the system of equations by graphing. Then classify the system. y=-x-13 5x-4y=-20 What is the solution of the system?
  9. Algebra 1

    How many solutions does this system have?
  10. Math

    Which best describes a system of equations that has infinitely many solutions?

More Similar Questions