If person( 1 ) can VERB RATE NOUNs per TIME_UNIT, how many TIME_UNITs will it take him( 1 ) to VERB a PROJECT1?
\text{amount} = \text{rate} \times \text{time}
AMOUNT\text{ NOUNs} = RATE\dfrac{\text{ NOUNs}}{\text{TIME_UNIT}} \times \text{ time in TIME_UNITs}
\text{time in TIME_UNITs} = \dfrac{AMOUNT\text{ NOUNs}}{RATE\dfrac{\text{NOUNs}}{\text{TIME_UNIT}}}
\hphantom{\text{time in TIME_UNITs}} = \dfrac{AMOUNT}{RATE}\text{ TIME_UNITs}
\hphantom{\text{time in TIME_UNITs}} = TIME\text{ TIME_UNITs}
If person( 1 ) can VERB RATE NOUNs per TIME_UNIT and it took him( 1 ) TIME TIME_UNITs to VERB his( 1 ) PROJECT2, how many NOUNs did the PROJECT3 have?
\text{amount} = \text{rate} \times \text{time}
\text{number of NOUNs} = RATE\dfrac{\text{NOUNs}}{\text{TIME_UNIT}} \times TIME\text{ TIME_UNITs}
\hphantom{\text{number of NOUNs}} = RATE \times TIME\text{ NOUNs}
\hphantom{\text{number of NOUNs}} = AMOUNT\text{ NOUNs}
If person( 1 ) can VERB a PROJECT1 in TIME TIME_UNITs, how many NOUNs per TIME_UNIT can he( 1 ) VERB?
\text{amount} = \text{rate} \times \text{time}
AMOUNT\text{ NOUNs} = \text{rate in NOUNs per TIME_UNIT} \times TIME\text{ TIME_UNITs}
\text{rate in NOUNs per TIME_UNIT} = \dfrac{AMOUNT\text{ NOUNs}}{TIME\text{ TIME_UNITs}}
\hphantom{\text{rate in NOUNs per TIME_UNIT}} = \dfrac{AMOUNT}{TIME}\text{NOUNs per TIME_UNIT}
\hphantom{\text{rate in NOUNs per TIME_UNIT}} = RATE\text{ NOUNs per TIME_UNIT}