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Question 1
Mark and Anson each have a video game collection.

The number of video games in Mark's collection can be represented by g.
The number of video games in Anson's collection is 5 times the number in Mark's collection.
The total number of Mark and Anson's video games combined is no more than 72.
Which inequality should be used to determine the number of video games (g) in Mark’s collection?

(1 point)
Responses

6g ≤ 72
6g ≤ 72

6g > 72
6g > 72

6g < 72
6g < 72

6g ≥ 72
6g ≥ 72
Question 2
(1 point)
Mark has
at most
at least
less than
greater than
exactly
12 games in his collection.
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1 answer

For Question 1, let's break it down:

  1. Let \( g \) be the number of video games Mark has.
  2. Anson has 5 times the number of games that Mark has, which is \( 5g \).
  3. The total number of games they both have together is \( g + 5g = 6g \).
  4. We know this total is no more than 72, which can be expressed with the inequality:

\[ 6g \leq 72. \]

So, the correct choice for Question 1 is:

  • 6g ≤ 72.

For Question 2, since Mark has "at most" 12 games in his collection, we can conclude that:

  • The maximum number of games Mark can have is 12.

So the appropriate choice is:

  • at most (12 games).

If you have any more questions or need further assistance, feel free to ask!