Suppose a curve is defined by the equation 16(x² + y²) = 45. Show that if you translate 3 the curve to the right by units and down by 3 4 2 units, then the new curve satisfies the equation а. 8x? + 8y² + 12x + 24y = 0 O b. 8x? + 8y² – 12x + 24y = 0 Ос. 8х? — 8у? - 12х + 24у %3D0 = ) d. 8x² + 8y² – 12x – 24y = 0 Clear my choice

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Suppose a curve is defined by the equation 16(x2 + y) = 45. Show that if you translate 3 3 the curve to the right by units and down by 4 units, then the new curve satisfies the equation Оа. 8х? + 8у? + 12х + 24у —D0 O b. 8x² + 8y² – 12x + 24y = 0 Ос. 8х? — 8у? — 12х + 24у %3D 0 o d. 8x² + 8y² – 12x – 24y = 0 O C. 12x + 24y = 0 - Clear my choice