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StartLayout Enlarged left-brace 1st row negative 10 x squared minus 10 y squared = negative 300 2nd row 5 x squared + 5 y squared = 150 EndLayout Which statement describes why the system has infinite solutions?

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  1. Today, 16:14
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    Answer: The two system of equations has infinite number of solution because both equations are the same and can be represented by just one equation with 2 variables. When there is only a presence of one equation with 2 variables, the equation will produce infinite number of solutions.

    Step-by-step explanation:

    Given the simultaneous equation,

    -10x² - 10y² = - 300 ... (1)

    5x² + 5y² = 150

    Dividing equation 1 by - 10 and equation 2 by 5 we have;

    x² + y² = 30 ... (3)

    x² + y² = 30 ... (4)

    Adding both equations 3 and 4we have;

    2x² + 2y² = 60

    x² + y² = 30 ... (5)

    As you can clearly see that addition of both equation 3 and 4 gave us back one of the equations we added (equation 5). This scenario shows that the x and y variable cannot have a single solution but infinite number of solution.

    Condition for a system of equation to have infinite number of solution is when after reducing the simultaneous equation, we generate just one equation with 2 variables.
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