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Quadratic Equations Videos 11 videos

SAT Math 4.1 Algebra and Functions
1196 Views

SAT Math 4.1 Algebra and Functions

Using the Discriminant
9116 Views

The discriminant is part of the quadratic formula, but that doesn't mean it isn't important in its own right; in fact, once it even guest-hosted Th...

Solving Quadratic Equations Using the Quadratic Formula
4710 Views

To solve using the quadratic equation, you need to find your a, b, and c values. Once you have that, just plug them into the formula, simplify, and...

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SAT Math 9.5 Algebra and Functions 213 Views


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SAT Math 9.5 Algebra and Functions

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English Language

Transcript

00:02

Here's a question that's part of a balanced Shmoopy breakfast.

00:06

If f (x) = x squared – 6x + 9, and  f (x + 1) = 1, what is one possible value of x?

00:16

Well, it wants us to find one possible value of x, which just means… solve for x.

00:21

The requirements for a value of x are: f of x is equal to x squared - 6x + 9, and f of x + 1 = 1.

00:31

We’ll need to put together the two requirements to find x.

00:37

Let’s take a closer look at the second requirement.

00:40

This just means that if we plugged the value (x + 1) into the function,

00:44

which we’re given in the first requirement, we can solve for x.

00:47

To solve this equation, we’re first going to have to turn it back into a polynomial.

00:51

So, we expand (x + 1) squared first.

00:55

By applying foil, we turn (x + 1) squared into x squared + 2x + 1.

01:03

Then, we distribute -6 into the second parentheses. We get -6x - 6.

01:10

Now we can combine like terms. There’s only one x squared term, so that stays by itself.

01:15

However, we have both 2x and -6x, so we can combine those to -4x.

01:20

Then, all of the constants add to +3. Great, we have a polynomial!

01:24

To be more specific… it's a quadratic.

01:27

We can just stick this puppy into the quadratic formula and come out with the answer.

01:31

Plugging in our values, we get that x is equal to 4 plus or minus the square root of 16 – 12 over 2.

01:40

This simplifies to 4 plus or minus 2 over 2. The possibilities are 1 or 3.

01:47

That's our answer either 1 or 3.

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