## What does 10 to the 5th power look like?

Answer and Explanation: 10 to the 5th power is 100,000. 10 to the 5th power is equal to 105. It can be expanded as 10 x 10 x 10 x 10 x 10 = 100,000.

## What is standard form in math exponents?

If a quantity is written as the product of a power of 10 and a number that is greater than or equal to 1 and less than 10, then the quantity is said to be expressed in standard form (or scientific notation). It is also known as exponential form. Note that we have expressed 65 as a product of 6.5 and a power of 10.

## What is the standard form of exponential function?

The standard form of an exponential function is y=abx+q.

## How do you write an exponential equation in standard form?

3:41Suggested clip · 116 secondsStandard Form of Exponential Function – YouTubeYouTubeStart of suggested clipEnd of suggested clip

## What is an exponential function example?

Exponential functions have the form f(x) = bx, where b > 0 and b ≠ 1. An example of an exponential function is the growth of bacteria. Some bacteria double every hour. If you start with 1 bacterium and it doubles every hour, you will have 2x bacteria after x hours.

## How do you set up an exponential function?

The form for an exponential equation is f(t)=P0(1+r)t/h where P0 is the initial value, t is the time variable, r is the rate and h is the number needed to ensure the units of t match up with the rate. Plug in the initial value for P and the rate for r. You will have f(t)=1,000(1.03)t/h. Find h.

## How do you identify an exponential function?

2:34Suggested clip · 109 secondsIdentify the Exponential Function – YouTubeYouTubeStart of suggested clipEnd of suggested clip

## How do you know if a graph is an exponential function?

How To Find Exponential FunctionsStep 1: Solve for “a” Step 2: Solve for “b” Step 3: Write the Final Equation. Step 1: Find “k” from the Graph. Step 2: Solve for “a” Step 3: Solve for “b” Step 4: Write the Final Equation.

## What is an example of exponential growth?

For example, if a population of mice doubles every year starting with two in the first year, the population would be four in the second year, 16 in the third year, 256 in the fourth year, and so on. The population is growing to the power of 2 each year in this case (i.e., exponentially).