Suppose a curve is defined by the equation 16(x + y) = 45. Show that if you translate the curve to the right by units and down by units, then the new curve satisfies the equation a. 8x +8y-12x +24y = 0 O b. 8x? +8y- 12x-24y 0 O. 8x? - 8y - 12x+24y 0 d. 8x+8y+12x+24y = 0

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Suppose a curve is defined by the equation 16(x² + y²) = 45. Show that if you translate the curve to the right by units and down by units, then the new curve satisfies the equation O a. 8x2 + 8y² – 12x + 24y = 0 O b. 8x +8y² – 12x – 24y = 0 O c. 8x - 8y²-12x+24y = 0 O d. 8x2 + 8y?+ 12x + 24y = 0 MocBook Air SO esc c & 5 6 8. 1 2€ 3 # 4 Y Q E G H J K A S D C V B option command option command >