In Bangladesh, medial colleges are usually located at the centre of town. Do you think the location is appropriate? Justify your answer.
Justify the statement 'A good layout always ensure minimum material handling'.
A contractor in Chattogram has six jobs awaiting processing. Processing time and due dates are given in Table 3(c). Set the processing sequence according to i) SPT ii) Slack iii) Critical ratio iv) EDD and evaluate, which sequencing rule the contractor should follow?
Table 3(c)
Usually steam power plants are located beside a river. Do you thing, the location is appropriate? Justify your answer.
In a product layout, space for in-process inventory is always kept narrow. How could you over the limitation using process layout?
Two office manager for the Metro Life Insurance Company orders letterhead stationary from an office products firm in boxes of 500 sheets. The company uses 6500 boxes per year. Annual carrying costs are 3perbox,andorderingcostsare3 per box, and ordering costs are3perbox,andorderingcostsare28. The following discount price schedule is provided by the office supply company:
What is the best purchase quantity?
What is ergonomics? Why is ergonomics important?
"Steam power plants are located beside the river". Do you think the location is appropriate? Justify your answer.
Write down the effect of bad layout in any industry.
Consider the following linear programming formation: $minimize cost=minimize \ cost =minimize cost=1X_1 + 2X22X_22X2$ Subject to: X1+3X2≥90X_1 + 3X_2 \geq 90X1+3X2≥90 8X1+2X2≥1608X_1 + 2X_2 \geq 1608X1+2X2≥160 3X1+2X2≥1203X_1 + 2X_2 \geq 1203X1+2X2≥120 X2≤70X_2 \leq 70X2≤70 What is the optimum solution?
Distinguish between Re-engineering and Reverse Engineering with example.
Explain the meaning and significance of plant location. How will you decide the location of a mini steel plant in Sirajgonj?
Circumstances dictate that a processor of dairy foods determine for a given day what his output of two different products will be. The following are the existing constraints: X≥0 Y≥0 2X+8Y≥80 4X+2Y≥56 3X+3Y≥75X \ge 0 \ Y \ge 0 \ 2X + 8Y \ge 80 \ 4X + 2Y \ge 56 \ 3X + 3Y \ge 75X≥0 Y≥0 2X+8Y≥80 4X+2Y≥56 3X+3Y≥75 and the objective function, which is to be minimized, is as follows: $C=C =C=30X + 10Y10Y10Y$ (X, Y = hundreds of pounds to be processed)