To solve the inequality (1/3)n + 4.6 ≤ 39.1, we will first subtract 4.6 from both sides of the inequality:
(1/3)n ≤ 34.5
Next, we will multiply both sides of the inequality by 3 to get rid of the fraction:
3 * (1/3)n ≤ 3 * 34.5
n ≤ 103.5
So, the solution to the inequality is n ≤ 103.5. Therefore, the possible values of the number are n less than or equal to 103.5.
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 1/3n+4.6≤39.1 , where n equals the number, to help solve this problem. Solve his inequality.(1 point) Responses 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 less than or equal to 131.1 n≤11.5
1 answer