Answer:
A 4,300 units
B 4,300 units
C 3,213 units
D 2,300 units
Explanation:
We should consuder the minutes available to calcualte the strain resource contribution per product:
![\left[\begin{array}{ccccc}&A&B&D&C\\sales&76.4&93.8&87.7&104.5\\Variable&41.4&42.7&51.7&57\\CM&35&51.1&36&47.5\\Constrain resource&4.1&5.6&4.6&3.7\\CM per constrain&8.54&9.125&7.83&12.84\\\end{array}\right]](https://tex.z-dn.net/?f=%5Cleft%5B%5Cbegin%7Barray%7D%7Bccccc%7D%26A%26B%26D%26C%5C%5Csales%2676.4%2693.8%2687.7%26104.5%5C%5CVariable%2641.4%2642.7%2651.7%2657%5C%5CCM%2635%2651.1%2636%2647.5%5C%5CConstrain%20resource%264.1%265.6%264.6%263.7%5C%5CCM%20per%20constrain%268.54%269.125%267.83%2612.84%5C%5C%5Cend%7Barray%7D%5Cright%5D)
We first do C, then B, then A and the remainder on C
A B C D
Constrain 4.10 5.60 4.60 3.70
units 4,300 4,300 3,300 2,300
subtotal 17,630.00 24,080.00 15,180.00 8,510.00
we got 65,000 min so we subtracrt in the proposed order:
65,000- 8,510 - 24,080 - 17,630 = 14,780
now we divide by the use in minute of C to know how many units to produce:
14,780 / 4.6 = 3,213