To determine the maximum rise in temperature, we need to find the difference between the initial and final temperatures in each option. The option with the highest positive difference represents the maximum rise in temperature.
Let's calculate the differences:
A. 0°C to 10°C: \(10°C - 0°C = 10°C\)
B. -4°C to 8°C: \(8°C - (-4°C) = 12°C\)
C. -15°C to -8°C: \((-8°C) - (-15°C) = 7°C\)
D. -7°C to 0°C: \(0°C - (-7°C) = 7°C\)
The maximum rise in temperature is in option (B) from -4°C to 8°C, with a difference of 12°C.
Answers & Comments
Answer:
To determine the maximum rise in temperature, we need to find the difference between the initial and final temperatures in each option. The option with the highest positive difference represents the maximum rise in temperature.
Let's calculate the differences:
A. 0°C to 10°C: \(10°C - 0°C = 10°C\)
B. -4°C to 8°C: \(8°C - (-4°C) = 12°C\)
C. -15°C to -8°C: \((-8°C) - (-15°C) = 7°C\)
D. -7°C to 0°C: \(0°C - (-7°C) = 7°C\)
The maximum rise in temperature is in option (B) from -4°C to 8°C, with a difference of 12°C.
Step-by-step explanation:
Answer:
The maximum rise in temperature can be determined by finding the largest difference between the initial and final temperatures.
Let's calculate the temperature changes for each option:
(A) 0°C to 10°C = 10°C rise
(B) -4°C to 8°C = 12°C rise
(C) -15°C to -8°C = 7°C rise
(D) -7°C to 0°C = 7°C rise
Therefore, among the given options, option (B) (-4°C to 8°C) shows the maximum rise in temperature, with a 12°C increase.