Respuesta :
Answer:
The provided system of equation is consistent and the equations are dependent.
Step-by-step explanation:
Consider the provided system of equations.
[tex]2x-8y=10[/tex]......(1)
[tex]3x-12y=15[/tex]......(2)
Solve the above equations by elimination method.
Multiply the first equation by 3 and second equation by 2.
[tex]6x-24y=30[/tex]
[tex]6x-24y=30[/tex]
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[tex]0=0[/tex]
Which is true,
This means that the solution to the system of equation is all real numbers. Therefore, the equation have an infinite number of solutions.
If a system of the equation has one or infinite solution then it is known as a consistent system otherwise it is known as inconsistent.
The above equation has an infinite number of solutions, so the provided equations are consistent.
If a consistent system of the equation has only 1 solution, then it is known as an independent . If a consistent system of the equation has infinitely many solutions, then it is known as a dependent .
As the provided system of the equation has infinitely many solutions, so it is a dependent equation.
Hence, the provided system of equation is consistent and the equations are dependent.
