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McGraw Hill Integrated II, 2012

MH

McGraw Hill Integrated II, 2012 View details

6. Analyzing Functions with Successive Differences

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Exercise 24 Page 143

How do the consecutive terms relate to each other?

Type of Function: Quadratic
Function: y=4.2x^2

Practice makes perfect

Finding the Model

We want to tell whether the table of values represents a linear, exponential, or quadratic function. To do so, we will analyze how the consecutive terms are related to each other.

x	0	1	2	3	4
y	0	4.2	16.8	37.8	67.2

Let's begin with calculating the first differences.

The first differences are not all equal. Therefore, the table of values does not represent a linear function. Let's find the second differences and compare them.

Since the second values are all equal, the table of values represents a quadratic function.

Finding the Equation

Let's recall the general form of this type of function. y=ax^2 We will use one ordered pair given in the table to find the values of a. For simplicity, let's use (1,4.2). We will start by substituting 1 and 4.2 for x and y respectively.

y=a x^2

y= 4.2, x= 1

4.2=a( 1)^2

▼

Solve for a

Identity Property of Multiplication

4.2=a

Rearrange equation

a=4.2

Now we can write the equation of the function represented by the table. y=4.2x^2

Subchapter links

Exercises p.143-145