Question:

Which of the following speeds is maximum?

Updated On: May 11, 2025
  • \(7.3 \frac{m}{s}\)
  • \(28.4 \frac{km}{h}\)
  • \(6.5 \frac{m}{min}\)
  • \(0.0073 \frac{km}{s}\)
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The Correct Option is B

Solution and Explanation

To determine which speed is the maximum, we must convert all given speeds to the same unit for comparison. We will convert each speed to meters per second (m/s), taking note of each step.
  • \(7.3 \frac{m}{s}\): This speed is already in meters per second.
  • \(28.4 \frac{km}{h}\): To convert from kilometers per hour to meters per second, use the formula: \(1 \frac{km}{h} = \frac{1000}{3600} \frac{m}{s}\) or approximately \(0.2778 \frac{m}{s}\). Therefore, \(28.4 \frac{km}{h} \times 0.2778 \approx 7.89 \frac{m}{s}\).
  • \(6.5 \frac{m}{min}\): To convert from meters per minute to meters per second, divide by 60: \(6.5 \div 60 \approx 0.1083 \frac{m}{s}\).
  • \(0.0073 \frac{km}{s}\): To convert from kilometers per second to meters per second, multiply by 1000: \(0.0073 \times 1000 = 7.3 \frac{m}{s}\).
Now, compare the converted speeds:
Original SpeedConverted Speed (m/s)
\(7.3 \frac{m}{s}\)7.3
\(28.4 \frac{km}{h}\)7.89
\(6.5 \frac{m}{min}\)0.1083
\(0.0073 \frac{km}{s}\)7.3
The maximum speed is \(28.4 \frac{km}{h}\) when converted as shown, with a result of \(7.89 \frac{m}{s}\).
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