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How many solutions does the system of equations below have?\newliney=3x+8y = 3x + 8\newliney=3x+8y = 3x + 8\newlineChoices:\newline(A)no solution\newline(B)one solution\newline(C)infinitely many solutions

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Q. How many solutions does the system of equations below have?\newliney=3x+8y = 3x + 8\newliney=3x+8y = 3x + 8\newlineChoices:\newline(A)no solution\newline(B)one solution\newline(C)infinitely many solutions
  1. Analyze Equations: Analyze the given system of equations:\newliney=3x+8y = 3x + 8\newliney=3x+8y = 3x + 8\newlineAre the slopes of the two equations the same or different?\newlineSlope of the first equation: 33\newlineSlope of the second equation: 33\newlineSince both slopes are equal, we can say that the slopes of the equations are the same.
  2. Compare Y-Intercepts: Compare the y-intercepts of the two equations:\newliney=3x+8y = 3x + 8\newliney=3x+8y = 3x + 8\newliney-intercept of the first equation: 88\newliney-intercept of the second equation: 88\newlineSince both y-intercepts are equal, we can say that the y-intercepts of the equations are the same.
  3. Determine Solutions: Determine the number of solutions to the system of equations:\newlineSince the system of equations has the same slope and the same yy-intercept, the lines represented by these equations are coincident. This means that every point on the line y=3x+8y = 3x + 8 is a solution to both equations. Therefore, the system of equations has infinitely many solutions.

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