Number, NAPX-p169124v01
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
Variant 0
DifficultyLevel
611
Question
Oggy's gym is 3 kilometres away from his apartment.
He jogs there at a constant speed of 10 kilometres per hour.
How many minutes does it take for Oggy to get to the gym from his apartment?
Worked Solution
|
|
| Time |
= SpeedDistance |
|
= 103 hr |
|
= 103 × 60 minues |
|
= 18 minutes |
Question Type
Multiple Choice (One Answer)
Variables
| Variable name | Variable value |
| question | Oggy's gym is 3 kilometres away from his apartment.
He jogs there at a constant speed of 10 kilometres per hour.
How many minutes does it take for Oggy to get to the gym from his apartment? |
| workedSolution |
|||
|-|-|
|Time|= $\dfrac{\text{Distance}}{\text{Speed}}$|
||= $\dfrac{3}{10}$ hr|
||= $\dfrac{3}{10}\ \times$ 60 minues|
||= {{{correctAnswer}}} minutes|
|
| correctAnswer | |
Answers