The greatest common divisor of 95, 160, and 70 is 5. Thus, 5 complete bags of seeds can be created.
To determine the number of complete bags of seeds that can be created, we need to find the common factor or greatest common divisor (GCD) of the number of packets for each seed type. Since each bag contains 20 seed packets, we are essentially looking for a number that divides each of the given numbers evenly.
The number of packets for each seed type are as follows:
Aster: 95 packets
Daisy: 160 packets
Pansy: 70 packets
Sunflower: Not provided
Wildflower: Not provided
First, find the GCD of 95, 160, and 70. The GCD represents the largest number that divides each of these numbers evenly. Once you find the GCD, you can determine how many complete bags of seeds can be created by dividing the GCD by 20 (since each bag contains 20 packets).
If the number of packets for Sunflower and Wildflower is provided, include them in the GCD calculation.
For example, if the GCD is 5, then you can create
complete bags for each seed type.
It's important to note that the answer may vary based on the specific numbers provided for Sunflower and Wildflower. Ensure you include all relevant information in the GCD calculation to get an accurate result.
Question:The table shows the number of each type of seed packet a
garden center had remaining at the end of summer. Bags were
created with 20 random seed packets in each bag. How many
complete bags of seeds can be created?
Seed Type
Aster
Daisy
Pansy
Sunflower
Wildflower
Number of Packets
95
160
70