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Senior High School Math Hub

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$Mathematics Hub$

Mathematics Hub

Senior High School Math Hub

Home
About
Learning Materials
General Mathematics
Contact

Lesson 15 : Representing Real-life Situations Using Exponential Functions

Slide 1

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Welcome to General Mathematics

This page will guide you through important lessons in General Mathematics. Follow the lessons step by step to build a strong understanding and learn how to apply concepts in real-life situations.

Representation of Exponential Functions

2. Read the Module

3. Solve the LAS

4. Growth Mindset Focus

“You don’t have to understand everything today — you just have to improve a little more than yesterday.”

5. Take a Quiz

Test you knowledge and apply what you’ve learned through interactive quizzes and practice activities related to module 1.

Representations of Exponential Functions

1 / 8

The exponential function f(x) = 2(10)^𝑥 is an example of _________.

a. decay

b. progress

c. growth

d. stagnant

2 / 8

A new car costs ₱150.000.00. This value subsides by 5% each year. How much will the car be worth after 6 years?

a. ₱116,067.14

b. ₱110,263.78

c. ₱122,175.94

d. ₱104,750.59

3 / 8

The annual sales at a company are ₱100,000.00 in the year 2020 and increasing at the rate of 4% per year. What is its total amount after 10 years?

a. ₱136,856.91

b. ₱153,945.41

c. ₱148,024.43

d. ₱142,331.18

4 / 8

In exponential function, when the exponent is equal to zero the function has a value equal to _____.

a. 0

b. 1

c. -1

d. imaginary number

5 / 8

One of the properties of the base in the exponential function is that it cannot be ___.

a. equal to 1

b. greater than 0

c. greater than 0 but less than 1

d. greater than 1

6 / 8

Which of the following is an application of exponential function?

a. monthly salary

b. shooting a cannon

c. radioactive decay

d. distance travelled

7 / 8

In the function, f(x) = 2^x, 2 is called ________.

a. constant

b. variable

c. coefficient power

d. base

8 / 8

In the function, f(x) = 2^x, 2 is called ________.

a. constant

b. variable

c. coefficient power

d. base

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Representing Real-life Situations Using Exponential Functions

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LAS - The Inverse of One-to-one Functions

11. General Mathematics Q1 - The Inverse of One-to-one Functions

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