Math  /  Algebra

QuestionSolve the inequality and graph the solution on the real number line. (x4)21(x-4)^{2} \geq 1

Studdy Solution

STEP 1

What is this asking? Find all the xx values that make (x4)2(x-4)^2 greater than or equal to 1, and then show those values on a number line. Watch out! Don't forget to consider both the positive and negative square roots when solving inequalities involving squares.

STEP 2

1. Rewrite the inequality.
2. Solve for *x*.
3. Graph the solution.

STEP 3

We're dealing with a **squared expression** greater than or equal to a number.
This is like saying the **distance** between xx and 4, squared, is at least 1.
Let's **rewrite** the inequality to make it easier to solve.
We can think of this as the difference of squares!

STEP 4

(x4)210(x-4)^2 - 1 \geq 0 We **subtracted** 1 from both sides.
Why? Because this sets us up to use the **difference of squares**!

STEP 5

((x4)1)((x4)+1)0((x-4) - 1)((x-4) + 1) \geq 0 Here, we used the **difference of squares** factorization: a2b2=(ab)(a+b)a^2 - b^2 = (a-b)(a+b).
This makes things much easier to handle!

STEP 6

(x5)(x3)0(x-5)(x-3) \geq 0 We **simplified** the factors.
Now we have a much cleaner inequality!

STEP 7

Now, we need to figure out when (x5)(x3)(x-5)(x-3) is greater than or equal to zero.
This happens when both factors are **positive**, or both factors are **negative**, or when one of the factors is **zero**.

STEP 8

*Case 1: Both factors are positive* x50x - 5 \geq 0 and x30x - 3 \geq 0.
This means x5x \geq 5 and x3x \geq 3.
Since *x* has to be greater than or equal to *both* 5 *and* 3, we take the larger value.
So, x5x \geq 5.

STEP 9

*Case 2: Both factors are negative* x50x - 5 \leq 0 and x30x - 3 \leq 0.
This means x5x \leq 5 and x3x \leq 3.
Since *x* has to be less than or equal to *both* 5 *and* 3, we take the smaller value.
So, x3x \leq 3.

STEP 10

*Case 3: One factor is zero* If x5=0x - 5 = 0, then x=5x = 5.
If x3=0x - 3 = 0, then x=3x = 3.

STEP 11

Combining all cases, our solution is x3x \leq 3 or x5x \geq 5.

STEP 12

On a number line, we'll represent the solution.
We'll use **filled-in circles** at x=3x=3 and x=5x=5 because the inequality includes "equal to." Then, we shade the line to the **left** of 3 and to the **right** of 5.

STEP 13

The solution to the inequality (x4)21(x-4)^2 \geq 1 is x3x \leq 3 or x5x \geq 5.
This is represented on the number line with closed circles at 3 and 5, and shaded regions extending to the left of 3 and to the right of 5.

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