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Intermediate Algebra Videos 25 videos

ACT Math 3.1 Intermediate Algebra
1955 Views

ACT Math: Intermediate Algebra: Drill 3, Problem 1. Find the fifth number in the series.

ACT Math 1.1 Intermediate Algebra
320 Views

ACT Math Intermediate Algebra Drill 1, Problem 1. What is the product of (a – 3)2?

ACT Math 1.2 Intermediate Algebra
695 Views

ACT Math Intermediate Algebra Drill 1, Problem 2. Find the product of (2a + 6)2.

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ACT Math 2.4 Intermediate Algebra 384 Views


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Description:

ACT Math Intermediate Algebra: Drill 2, Problem 4. Solve for x.

Language:
English Language

Transcript

00:02

Here's your shmoop du jour...

00:05

Solve for x: the absolute value of 4x plus

00:08

2... minus 3... is greater than or equal to 15.

00:14

And here are the potential answers...

00:18

OK so what is this question asking?

00:20

It's a pretty vanilla absolute value question.

00:24

We can ignore the vertical lines for a moment...so we have 4x plus 2 minus 3 is greater than

00:30

or equal to 15... or 4x minus 1 is greater than or equal to 15.

00:36

Then... 4x is greater than or equal to 16... so x is greater than or equal to 4.

00:44

Again, that's only if we ignore the absolute value lines.

00:49

So now let's max out what we can do if we color... inside the lines.

00:53

We're going to worry about the absolute value of 4x plus 2 being greater than or equal to 18...

01:00

...so... think about what x value could make 4x plus 2 NEGATIVE 18; we'll then take the

01:07

absolute value of that to make it GREATER than 18.

01:10

That is, what NEGATIVE values of x would do this for us?

01:14

Well, negative 1, 2 and 3 and 4 don't help us much, but negative 5 gets us there because

01:20

we have 4 times negative 5, which is negative 20...

01:24

... then add 2, and we have negative 18, but when we take the absolute value of it we're there.

01:35

So the range that x can take to satisfy this equation is that it lives somewhere between

01:39

negative 5 and positive 4...

01:41

...Answer: A.

01:43

And that's why you always have to be careful to... stay inside the lines.

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