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As an AI language model, I cannot interpret or understand gibberish language. Can you please provide a valid sentence or question for me to assist you better?
A mountain climber on Mt. Everest is at 29,035 ft above sea level. A stone at the bottom of the Dead Sea is at 1,349 ft below sea level. What is the difference in elevation between the mountain climber and the stone?
To find the difference in elevation between the mountain climber and the stone, we need to subtract the elevation of the stone from the elevation of the mountain climber:
Difference in elevation = Mt. Everest elevation - Dead Sea elevation
Difference in elevation = 29,035 ft - (-1,349 ft)
Difference in elevation = 29,035 ft + 1,349 ft
Difference in elevation = 30,384 ft
Therefore, the difference in elevation between the mountain climber on Mt. Everest and the stone at the bottom of the Dead Sea is 30,384 ft.
Difference in elevation = Mt. Everest elevation - Dead Sea elevation
Difference in elevation = 29,035 ft - (-1,349 ft)
Difference in elevation = 29,035 ft + 1,349 ft
Difference in elevation = 30,384 ft
Therefore, the difference in elevation between the mountain climber on Mt. Everest and the stone at the bottom of the Dead Sea is 30,384 ft.
A deep-sea diver must descend and ascend in short steps to equalize pressure on his body. If the diver rises toward the surface too fast, he may suffer from a physical condition called “the bends.” Suppose the diver started at 82 feet below the surface and rose in five steps of 15 feet each. Use an integer to describe his new position in relation to the water
If the diver started at 82 feet below the surface and rose in five steps of 15 feet each, the total distance the diver rose is:
5 × 15 = 75 feet
So the diver's new position in relation to the water is:
82 - 75 = 7 feet below the surface
Therefore, the integer that describes the diver's new position in relation to the water is -7 (negative because the diver is still below the surface).
5 × 15 = 75 feet
So the diver's new position in relation to the water is:
82 - 75 = 7 feet below the surface
Therefore, the integer that describes the diver's new position in relation to the water is -7 (negative because the diver is still below the surface).
An elevator on the 10th floor goes down 9 floors. Then it goes up 19 floors, down 3, and finally down 12. What floor does it end up on? Write an equation to show how you found your answer.
To find the floor where the elevator ends up, we need to calculate the net change in floors. We can then subtract this net change from the original floor (10th floor) to find the final floor.
The elevator first goes down 9 floors, so its position changes by -9 floors.
Then it goes up 19 floors, so its position changes by +19 floors.
Next, it goes down 3 floors, so its position changes by -3 floors.
Finally, it goes down 12 floors, so its position changes by -12 floors.
The total net change in floors is:
-9 + 19 - 3 - 12 = -5
This means that the elevator ends up 5 floors below the 10th floor. To find the final floor, we subtract 5 from the 10th floor:
Final floor = 10 - 5 = 5
Therefore, the elevator ends up on the 5th floor.
The equation to show the calculation is:
Final floor = Starting floor + net change in floors
Final floor = 10 + (-9 + 19 - 3 - 12)
Final floor = 10 - 5
Final floor = 5
The elevator first goes down 9 floors, so its position changes by -9 floors.
Then it goes up 19 floors, so its position changes by +19 floors.
Next, it goes down 3 floors, so its position changes by -3 floors.
Finally, it goes down 12 floors, so its position changes by -12 floors.
The total net change in floors is:
-9 + 19 - 3 - 12 = -5
This means that the elevator ends up 5 floors below the 10th floor. To find the final floor, we subtract 5 from the 10th floor:
Final floor = 10 - 5 = 5
Therefore, the elevator ends up on the 5th floor.
The equation to show the calculation is:
Final floor = Starting floor + net change in floors
Final floor = 10 + (-9 + 19 - 3 - 12)
Final floor = 10 - 5
Final floor = 5
The temperature in your town is 31°F. The radio announcer says that the temperature will drop 15 degrees. What will the temperature be? Write an equation to show how you found your answer.
To find the temperature after the 15-degree drop, we need to subtract 15 from the current temperature of 31°F.
The equation to represent this calculation is:
New temperature = Current temperature - Drop in temperature
Plugging in the numbers, we get:
New temperature = 31°F - 15°F
Simplifying the equation:
New temperature = 16°F
Therefore, the temperature will be 16°F after the 15-degree drop.
The final equation is:
New temperature = 31°F - 15°F
New temperature = 16°F
The equation to represent this calculation is:
New temperature = Current temperature - Drop in temperature
Plugging in the numbers, we get:
New temperature = 31°F - 15°F
Simplifying the equation:
New temperature = 16°F
Therefore, the temperature will be 16°F after the 15-degree drop.
The final equation is:
New temperature = 31°F - 15°F
New temperature = 16°F
31°F - 15°F
31°F - 15°F = 16°F
So, the result of 31°F minus 15°F is equal to 16°F.
So, the result of 31°F minus 15°F is equal to 16°F.