if the following amounts of lumber need to be delivered to 2 different staging areas at 4 different job sites, how many total boards of each size will you need?

1. 65:2x4s

2.45:2x8s

3. 25:2x10s

What math do I need to do

How do you CALCULATE the problem??!...Not just give me the answer!

What are you confused about?

What am I confused about...LOL...LOL?

dgbdbgg

So you have 65 2x4s is one delivery you have a total of 8 delivery spots

2 staging areas and 4 different job sites so 65 x8 equals you can figure the res I'm sure

To calculate the total number of 2x4s needed for both staging areas and all job sites, you would first multiply the number of 2x4s needed for one delivery by the total number of deliveries, which is 8:

65 * 8 = 520 2x4s

You can use the same method to calculate the total number of 2x8s and 2x10s needed:

45 * 8 = 360 2x8s
25 * 8 = 200 2x10s

To determine the total number of boards needed for each size, you can follow these steps:

1. For 2x4s, multiply the given amount (65) by the number of job sites (4) to get the total number of 2x4 boards required. Multiply this number by 2 (since there are two staging areas) to account for the different staging areas. Therefore, the total number of 2x4 boards needed is: 65 x 4 x 2 = 520.

2. For 2x8s, follow the same process. Multiply the given amount (45) by the number of job sites (4) to get the total number of 2x8 boards required. Multiply this number by 2 (since there are two staging areas) to account for the different staging areas. Therefore, the total number of 2x8 boards needed is: 45 x 4 x 2 = 360.

3. For 2x10s, multiply the given amount (25) by the number of job sites (4) to get the total number of 2x10 boards required. Multiply this number by 2 (since there are two staging areas) to account for the different staging areas. Therefore, the total number of 2x10 boards needed is: 25 x 4 x 2 = 200.

In summary, you will need a total of 520 2x4 boards, 360 2x8 boards, and 200 2x10 boards for the given amounts and staging areas.

260 2X4s

180 2X8s
100 2X10s