Question


Applications of Subtracting Rational Numbers Quick Check
5 of 55 of 5 Items
Question
A parasail is 120 of a meter above the water. Then, after 10 minutes, the parasail is 150 of a meter above the water. What is the change in height?(1 point)
Answer

Applications of Subtracting Rational Numbers Quick Check
5 of 55 of 5 Items
Question
A parasail is 120 of a meter above the water. Then, after 10 minutes, the parasail is 150 of a meter above the water. What is the change in height?(1 point)
Responses

150 meter
Start Fraction 1 over 50 End Fraction meter

3100 meter
Start Fraction 3 over 100 End Fraction meter

120 meter
Start Fraction 1 over 20 End Fraction meter

7100 meter
Answer

Applications of Subtracting Rational Numbers Quick Check
5 of 55 of 5 Items
Question
A parasail is 120 of a meter above the water. Then, after 10 minutes, the parasail is 150 of a meter above the water. What is the change in height?(1 point)
Responses

1/50 meter

3/100 meter

1/20 meter

71/00 meter
Answer
could u do the problem in fractions
Answer
A parasail is 1/20 of a meter above the water. Then, after 10 minutes, the parasail is 1/50 of a meter above the water. What is the change in height?(1 point)
Responses

1/50 meter

3/100 meter

1/20 meter

7/100 meter

Answer
A parasail is 1/20 of a meter above the water. Then, after 10 minutes, the parasail is 1/50 of a meter above the water. What is the change in height?(1 point)
Responses

2. 1/50 meter

3. 3/100 meter

4. 1/20 meter

5. 7/100 meter

Answer
wrong
Answer
so its 3/100?
Answered by GPT 3.5
To determine the change in height, you need to subtract the initial height from the final height.

Final height - Initial height = Change in height

150/1 - 120/1 = 30/1 = 30

Therefore, the change in height is 30 meters.
Answered by GPT 3.5
To find the change in height, you need to subtract the initial height from the final height.

Final Height - Initial Height = Change in Height

150 meters - 120 meters = 30 meters

Therefore, the change in height is 30 meters.
Answered by GPT 3.5
To find the change in height, you need to subtract the initial height (120 meters) from the final height (150 meters).

Final height - Initial height = Change in height

150 meters - 120 meters = 30 meters

Therefore, the change in height is 30 meters.
Answered by GPT 3.5
Certainly! Let's solve the problem using fractions.

The initial height is 120 meters, which can be written as 120/1 meters.
The final height is 150 meters, which can be written as 150/1 meters.

To find the change in height, we need to subtract the initial height from the final height:

150/1 - 120/1 = 30/1

Therefore, the change in height is 30/1 meters, which can also be simplified to 30 meters.
Answered by GPT 3.5
To find the change in height, you need to subtract the initial height (1/20 meter) from the final height (1/50 meter).

Final height - Initial height = Change in height

1/50 - 1/20 = (1/50) - (2/100) = (1/50) - (1/50) = 0

Therefore, the change in height is 0.
Answered by GPT 3.5
To find the change in height, you need to subtract the initial height (1/20 meter) from the final height (1/50 meter).

Final height - Initial height = Change in height

(1/50) - (1/20) = (1/50) - (2/100) = (1/50) - (1/50) = 0.

Therefore, the change in height is 0.
Answered by GPT 3.5
Apologies for the error. Let's try solving it again:

To find the change in height, we need to subtract the initial height (1/20 meter) from the final height (1/50 meter).

Final height - Initial height = Change in height

1/50 - 1/20

To subtract fractions, we need a common denominator, which in this case is 100.

(1/50) - (1/20) = (2/100) - (5/100) = (-3/100)

Therefore, the change in height is -3/100 meter.
Answered by GPT 3.5
I apologize for the confusion in my previous response. You are correct.

The change in height is indeed 3/100 meter.