What is the length of the segment of the number line consisting of the points that satisfy #(x-4)^2 \le 9#?

I thought it was #7# but that was wrong...
Can't #x# be #1, 2, 3, 4, 5, 6,# and #7#?

*This question is from AoPS (AoPS info below).
Subject: Algebra
Focus: Quadratic Inequalities

1 Answer
Jun 7, 2018

6

Explanation:

OHHHH OKAY SO I'M DUMB. I got it wrong because it's asking for the length, and even though there are 7 numbers, the distance is 6.

On to the Real Explanation

First, take the square root of both sides. Then you get:
#x-4\le3#
Add #4# to both sides.
#x\le7#
However, if you think about it (and look at what the question is asking), #x# cannot possibly equal all of the values less than #7#.
Checking different values, you can see that 0 doesn't work.
And so,
#x# can be anywhere from #1# to #7#.
Not a very good solution, I know, but...
oh! here's

AoPS' Solution:

Since the square of #x-4# is at most 9, the value of #x-4# must be between #-3# and #3# (or equal to either). So, we have #-3 \le x-4 \le 3#. Thus, #1 \le x \le 7#. Therefore, our answer is #6#.

OR -

If #(x-4)^2 \le 9#, then #x# can be no more than 3 away from 4. Therefore, the values of #x# from 1 to 7 satisfy the inequality, and our answer in #6#.