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Josiah is cooking a piece of lamb. Before he puts it in the oven, the internal temperature of the lamb is 41^(@)C below the final temperature it needs to reach. The outside of the lamb heats up faster than the inside. Josiah takes the lamb out of the oven when the internal temperature is still 6^(@)C below the final temperature it needs to reach, so the inside and outside can balance out to the right final temperature. Josiah wonders how much the internal temperature had changed when he removed the lamb from the oven. Which of the following equations matches the situation above? Choose 1 answer: (A) 41+6= ? (B) -41+?=-6 (c) 41+?=6

Josiah is cooking a piece of lamb. Before he puts it in the oven, the internal temperature of the lamb is 41C 41^{\circ} \mathrm{C} below the final temperature it needs to reach. The outside of the lamb heats up faster than the inside. Josiah takes the lamb out of the oven when the internal temperature is still 6C 6^{\circ} \mathrm{C} below the final temperature it needs to reach, so the inside and outside can balance out to the right final temperature.\newlineJosiah wonders how much the internal temperature had changed when he removed the lamb from the oven.\newlineWhich of the following equations matches the situation above?\newlineChoose 11 answer:\newline(A) 41+6= 41+6= ?\newline(B) 41+?=6 -41+?=-6 \newline(C) 41+?=6 41+?=6

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Q. Josiah is cooking a piece of lamb. Before he puts it in the oven, the internal temperature of the lamb is 41C 41^{\circ} \mathrm{C} below the final temperature it needs to reach. The outside of the lamb heats up faster than the inside. Josiah takes the lamb out of the oven when the internal temperature is still 6C 6^{\circ} \mathrm{C} below the final temperature it needs to reach, so the inside and outside can balance out to the right final temperature.\newlineJosiah wonders how much the internal temperature had changed when he removed the lamb from the oven.\newlineWhich of the following equations matches the situation above?\newlineChoose 11 answer:\newline(A) 41+6= 41+6= ?\newline(B) 41+?=6 -41+?=-6 \newline(C) 41+?=6 41+?=6
  1. Initial Temperature Comparison: We need to find the change in internal temperature from when the lamb was first put in the oven to when it was taken out. Initially, the lamb is 41C41^\circ\text{C} below the final temperature, and when taken out, it is 6C6^\circ\text{C} below the final temperature.
  2. Calculate Temperature Change: The change in temperature is the difference between the initial and final temperature differences from the target temperature. This can be calculated by subtracting the final temperature difference (6C6^\circ\text{C} below final) from the initial temperature difference (41C41^\circ\text{C} below final).
  3. Subtraction Calculation: Perform the subtraction: 416=3541 - 6 = 35. This calculation gives us the change in internal temperature of the lamb.
  4. Correct Equation: The correct equation that matches the situation is (A) 416=?41 - 6 = ?, as it represents the initial temperature difference minus the final temperature difference to find the change in temperature.

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