Andre is making paper cranes to decorate for a party. He plans to make one large paper crane and several small paper cranes. It takes Andre 10 minutes to make the large crane and 3 minutes to

make each small crane. He has 30 minutes to make all of the cranes. How many small cranes can Andre make in 30 minutes? Use the inequality 3 c + 10 ≤ 30, where c represents the number of small cranes, to solve. Explain your solution.

Andre can make 6 small paper cranes in 30 minutes.

Step-by-step explanation:

Given data-

Time taken by Andre to build small cranes - 3minutes

Time taken to build large crane - 10 minutes

Total time allotted to him = 30 min

His preferences - Building one large crane and several small cranes.

The Inequality equation is 3 c + 10 ≤ 30

Since his preference is to build atleast one large crane which takes 10 minutes, he is left with 30-10 = 20 minutes to build other small cranes.

For one crane he needs, 3 minutes

Hence, he can build 6 cranes in 18 minutes. Following this, he is left with 20-18 = 2 minutes. Since he needs at least 3 min to build a small crane, he cannot build a small crane in the remaining 2 min.

he builds 6 small cranes in 30 minutes

Alternatively,

3 c + 10 ≤ 30

Subtracting 10 from both sides

3c ≤ 20

The maximum value of c for which this equation remains valid is 6.

Thus, he builds a total of 6 cranes (small) in 30 minutes.