The formula to calculate the Allowable Area Increase (Aa) is:
\[ A_{a} = A_{b} \times \left(1 + \frac{P}{100}\right) \]
Where:
Let's say the base area (Ab) is 100 square units and the increase percentage (P) is 20%. Using the formula:
\[ A_{a} = 100 \times \left(1 + \frac{20}{100}\right) = 120 \]
So, the Allowable Area (Aa) is 120 square units.
Definition: The allowable area is the maximum area permitted for a building or structure based on zoning regulations.
Formula: \( \text{Allowable Area} = \text{Base Area} \times \text{Multiplier} \)
Example: \( \text{Allowable Area} = 1000 \times 1.5 \)
Definition: The maximum allowable construction area is the largest area that can be constructed based on regulations.
Formula: \( \text{Max Construction Area} = \text{Lot Area} \times \text{FAR} \)
Example: \( \text{Max Construction Area} = 500 \times 2 \)
Definition: The percentage increase in area measures the change in area as a percentage of the original area.
Formula: \( \text{Percentage Increase} = \frac{\text{New Area} - \text{Original Area}}{\text{Original Area}} \times 100 \)
Example: \( \text{Percentage Increase} = \frac{1200 - 1000}{1000} \times 100 \)
Definition: This calculator determines the amount of increase in area.
Formula: \( \text{Amount of Increase} = \text{New Area} - \text{Original Area} \)
Example: \( \text{Amount of Increase} = 1500 - 1000 \)
Definition: This calculator determines the maximum possible area based on given dimensions.
Formula: \( \text{Max Area} = \text{Length} \times \text{Width} \)
Example: \( \text{Max Area} = 20 \times 30 \)
Definition: This calculator determines the rate of change of an area over time.
Formula: \( \text{Rate of Change} = \frac{\Delta A}{\Delta t} \)
Example: \( \text{Rate of Change} = \frac{200}{5} \)
