Future Population at End of 3 Decades in Geometrical Increase Method Solution

STEP 0: Pre-Calculation Summary
Formula Used
Forecasted Population = Last Known Population*(1+(Average % Growth Rate/100))^3
Pn = Po*(1+(r/100))^3
This formula uses 3 Variables
Variables Used
Forecasted Population - Forecasted Population is the population forested usually after n decade or after n years.
Last Known Population - Last Known Population is the population of any area of the previous year or decade.
Average % Growth Rate - Average % Growth Rate in the geometric increase method is usually found by the arithmetic mean or geometric mean which is the maximum.
STEP 1: Convert Input(s) to Base Unit
Last Known Population: 275000 --> No Conversion Required
Average % Growth Rate: 12.82 --> No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
Pn = Po*(1+(r/100))^3 --> 275000*(1+(12.82/100))^3
Evaluating ... ...
Pn = 394903.4973862
STEP 3: Convert Result to Output's Unit
394903.4973862 --> No Conversion Required
FINAL ANSWER
394903.4973862 394903.5 <-- Forecasted Population
(Calculation completed in 00.020 seconds)

Credits

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Created by Suraj Kumar
Birsa Institute of Technology (BIT), Sindri
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Verified by Ishita Goyal
Meerut Institute of Engineering and Technology (MIET), Meerut
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Geometric Increase Method Calculators

Average Percentage Increase given Future Population from Geometrical Increase Method
​ LaTeX ​ Go Average % Growth Rate = ((Forecasted Population/Last Known Population)^(1/Number of Decades)-1)*100
Present Population given Future Population from Geometrical Increase Method
​ LaTeX ​ Go Last Known Population = Forecasted Population/(1+(Average % Growth Rate/100))^Number of Decades
Future Population at End of n Decades in Geometrical Increase Method
​ LaTeX ​ Go Forecasted Population = Last Known Population*(1+(Average % Growth Rate/100))^Number of Decades
Future Population at End of 2 Decades in Geometrical Increase Method
​ LaTeX ​ Go Forecasted Population = Last Known Population*(1+(Average % Growth Rate/100))^2

Future Population at End of 3 Decades in Geometrical Increase Method Formula

​LaTeX ​Go
Forecasted Population = Last Known Population*(1+(Average % Growth Rate/100))^3
Pn = Po*(1+(r/100))^3

What is Population Forecasting and Methods Involved?

Population forecasting is defined as the method of determining the expected population for a particular design period of a water supply system with the help of the study and analysis of future events and available records.
Methods are
1. Arithmetic Increase Method
2. Geometric Increase Method
3. Incremental Increase Method
4. Decrease Growth Rate Method
5. Logistic Curve Method
6. Demographic Method
7. Simple Graphical Method
8. Comparative Graphical Method
9. Master Plan Method
10. Ratio Method

What is Geometric Increase Method?

In this method, the per-decade percentage increase or percentage growth rate (r) is assumed to be constant, and the increase is compounded over the existing population every decade.
It is also known as the uniform increase method.

How to Calculate Future Population at End of 3 Decades in Geometrical Increase Method?

Future Population at End of 3 Decades in Geometrical Increase Method calculator uses Forecasted Population = Last Known Population*(1+(Average % Growth Rate/100))^3 to calculate the Forecasted Population, The Future Population at End of 3 Decades in Geometrical Increase Method formula is defined as the future population at the end of 3 decades when we have prior information of other parameters used. Forecasted Population is denoted by Pn symbol.

How to calculate Future Population at End of 3 Decades in Geometrical Increase Method using this online calculator? To use this online calculator for Future Population at End of 3 Decades in Geometrical Increase Method, enter Last Known Population (Po) & Average % Growth Rate (r) and hit the calculate button. Here is how the Future Population at End of 3 Decades in Geometrical Increase Method calculation can be explained with given input values -> 394903.5 = 275000*(1+(12.82/100))^3.

FAQ

What is Future Population at End of 3 Decades in Geometrical Increase Method?
The Future Population at End of 3 Decades in Geometrical Increase Method formula is defined as the future population at the end of 3 decades when we have prior information of other parameters used and is represented as Pn = Po*(1+(r/100))^3 or Forecasted Population = Last Known Population*(1+(Average % Growth Rate/100))^3. Last Known Population is the population of any area of the previous year or decade & Average % Growth Rate in the geometric increase method is usually found by the arithmetic mean or geometric mean which is the maximum.
How to calculate Future Population at End of 3 Decades in Geometrical Increase Method?
The Future Population at End of 3 Decades in Geometrical Increase Method formula is defined as the future population at the end of 3 decades when we have prior information of other parameters used is calculated using Forecasted Population = Last Known Population*(1+(Average % Growth Rate/100))^3. To calculate Future Population at End of 3 Decades in Geometrical Increase Method, you need Last Known Population (Po) & Average % Growth Rate (r). With our tool, you need to enter the respective value for Last Known Population & Average % Growth Rate and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.
How many ways are there to calculate Forecasted Population?
In this formula, Forecasted Population uses Last Known Population & Average % Growth Rate. We can use 2 other way(s) to calculate the same, which is/are as follows -
  • Forecasted Population = Last Known Population*(1+(Average % Growth Rate/100))^Number of Decades
  • Forecasted Population = Last Known Population*(1+(Average % Growth Rate/100))^2
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