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For what value(s) of k will the following system of linear equations have no solution? infinitely many solutions? x-5y=4-7x+35y=k

User Lakshmen
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1 Answer

10 votes
10 votes

x-5y = 4

-7x+35y = k​

Isolating y in both equations,


\begin{gathered} x=4+5y \\ x-4=5y \\ (1)/(5)x-(4)/(5)=y \end{gathered}
\begin{gathered} 35y=k+7x \\ y=(k)/(35)+(7)/(35)x \\ y=(k)/(35)+(1)/(5)x \end{gathered}

If both equations are equal, then there are infinitely many solutions. This criterion is satisfied if


\begin{gathered} -(4)/(5)=(k)/(35) \\ -(4)/(5)\cdot35=k \\ -28=k \end{gathered}

Since both equations have the same slope, if they don't have the same y-intercept then there will be no solution for the system of equations, that is,


\begin{gathered} -(4)/(5)\\e(k)/(35) \\ -(4)/(5)\cdot35\\e k \\ -28\\e k \end{gathered}

The given system has no solution for all real numbers k except k= -28

The given system has infinitely many solutions for k= -28

User Vintesh
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3.2k points
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