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How many solutions does the system of equations below have?\newliney=109x+4y = \frac{10}{9}x + 4\newliney=15x+15y = \frac{1}{5}x + \frac{1}{5}\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=109x+4y = \frac{10}{9}x + 4\newliney=15x+15y = \frac{1}{5}x + \frac{1}{5}\newlineChoices:\newline(A)no solution\newline(B)one solution\newline(C)infinitely many solutions
  1. Slope Comparison: System of equations:\newliney=109x+4y = \frac{10}{9}x + 4\newliney=15x+15y = \frac{1}{5}x + \frac{1}{5}\newlineAre the slopes same or different?\newlineSlope of first equation: 109\frac{10}{9}\newlineSlope of second equation: 15\frac{1}{5}\newlineSlopes of the equations are different.
  2. Y-Intercept Comparison: System of equations:\newliney=109x+4y = \frac{10}{9}x + 4\newliney=15x+15y = \frac{1}{5}x + \frac{1}{5}\newlineAre the y-intercepts same or different?\newliney-intercept of first equation: 44\newliney-intercept of second equation: 15\frac{1}{5}\newliney-intercepts of the equations are different.
  3. Number of Solutions: System of equations:\newliney=109x+4y = \frac{10}{9}x + 4\newliney=15x+15y = \frac{1}{5}x + \frac{1}{5}\newlineDetermine the number of solutions to the system of equations.\newlineSince the slopes of the equations are different, the lines are not parallel and will intersect at exactly one point.\newlineThe system of equations has 11 solution.

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