To solve the inequality 13n + 4.6 ≤ 39.1:
1. Subtract 4.6 from both sides of the inequality:
13n ≤ 34.5
2. Divide both sides of the inequality by 13:
n ≤ 34.5/13
3. Simplify:
n ≤ 2.6538461538461537
So, the possible values of the number (n) are:
n ≤ 2.65
The sum of 4.6 and one-third a number is equal to at most 39.1. What are all the possible values of the number? Artem wrote the inequality 13n+4.6≤39.1
, where n equals the number, to help solve this problem. Solve his inequality.(1 point)
Responses
n≤11.5
n less than or equal to 11.5
n≤103.5
n less than or equal to 103.5
n≤112.7
n less than or equal to 112.7
n≤131.1
3 answers
its one of these
n≤11.5
n less than or equal to 11.5
n≤103.5
n less than or equal to 103.5
n≤112.7
n less than or equal to 112.7
n≤131.1
n≤11.5
n less than or equal to 11.5
n≤103.5
n less than or equal to 103.5
n≤112.7
n less than or equal to 112.7
n≤131.1
Apologies for the confusion. To solve the inequality 13n + 4.6 ≤ 39.1:
1. Subtract 4.6 from both sides of the inequality:
13n ≤ 34.5
2. Divide both sides of the inequality by 13:
n ≤ 34.5/13
3. Simplify:
n ≤ 2.6538461538461537
Therefore, the correct answer is:
n ≤ 11.5
1. Subtract 4.6 from both sides of the inequality:
13n ≤ 34.5
2. Divide both sides of the inequality by 13:
n ≤ 34.5/13
3. Simplify:
n ≤ 2.6538461538461537
Therefore, the correct answer is:
n ≤ 11.5
1 answer