Name: SAT Math Prep: Review Exponential Decay Function - Country's Declining GCP
Uploaded: 2024-10-08T21:56:28.290Z
Channel: Mathispower4u
Description: The video tutorial explains how the GDP of a country is shrinking by 1.9% per year, starting from 750 billion dollars in 2020. It introduces the concept of exponential decay, which is used to model the GDP over time. The function a(T) = 750 * (1 - 0.019)^T is derived to represent the GDP in billions of dollars T years after 2020, with 0.019 being the decimal form of the 1.9% decay rate.

Understanding GDP Shrinkage and Exponential Decay

Interactive Video

•

Mathematics, Business

•

9th - 12th Grade

•

Hard

Olivia Brooks

FREE Resource

The video tutorial explains how the GDP of a country is shrinking by 1.9% per year, starting from 750 billion dollars in 2020. It introduces the concept of exponential decay, which is used to model the GDP over time. The function a(T) = 750 * (1 - 0.019)^T is derived to represent the GDP in billions of dollars T years after 2020, with 0.019 being the decimal form of the 1.9% decay rate.

5 questions

Show all answers

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What is the initial GDP of the country in 2020?

900 billion dollars

1 trillion dollars

750 billion dollars

500 billion dollars

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What does it mean when a quantity is shrinking by a constant percentage?

It is undergoing linear decay.

It is undergoing exponential decay.

It is undergoing exponential growth.

It is undergoing linear growth.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

Which of the following best describes exponential decay?

A constant percentage is subtracted each year.

A constant amount is added each year.

A constant percentage is added each year.

A constant amount is subtracted each year.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What is the decay rate expressed as a decimal for a 1.9% decrease?

0.019

0.19

1.9

0.0019

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

Which of the following is the correct formula for the GDP model described?

a(T) = 750 * (1 + 0.019)^T

a(T) = 750 * (1 - 0.019)^T

a(T) = 750 * (1 + 0.19)^T

a(T) = 750 * (1 - 0.19)^T

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